Mercurial > hg > mpdl-xml-content
view texts/XML/archimedes/el/heron_pneum_092_el_1899.xml @ 6:22d6a63640c6
moved texts from SVN https://it-dev.mpiwg-berlin.mpg.de/svn/mpdl-project-content/trunk/texts/eXist/
| author | casties |
|---|---|
| date | Fri, 07 Dec 2012 17:05:22 +0100 |
| parents | |
| children |
line wrap: on
line source
<?xml version="1.0"?> <archimedes xmlns:xlink="http://www.w3.org/1999/xlink" > <info> <author>Heron Alexandrinus</author> <title>Pneumatica</title> <date>1899</date> <place>Leipzig</place> <translator></translator> <lang>el</lang> <cvs_file>heron_pneum_092_el_1899.xml</cvs_file> <locator>092.xml</locator> </info> <text> <front></front> <body> <chap n="proem"> <p type="head"> <s id="id.000001"><pb n="2"></pb>ΗΡΩΝΟΣ ΑΛΕΧΑΝΔΡΕΩΣ <lb n="proem,1t"></lb>ΠΝΕΥΜΑΤΙΚΩΝ <lb n="proem,2t"></lb>ΠΡΩΤΟΝ<lb n="proem,3t"></lb></s></p> <p n="1" type="main"> <s id="id.000001a">Τῆς πνευματικῆς πραγματείας σπουδῆς ἠξιωμένης <lb n="proem,1"></lb>πρὸς τῶν παλαιῶν φιλοσόφων τε καὶ μηχανικῶν, τῶν <lb n="proem,2"></lb>μὲν λογικῶς τὴν δύναμιν αὐτῆς ἀποδεδωκότων, τῶν <lb n="proem,3"></lb>δὲ καὶ δι' αὐτῆς τῆς τῶν αἰσθητῶν ἐνεργείας, ἀναγ<lb n="proem,4"></lb>καῖον ὑπάρχειν νομίζομεν καὶ αὐτοὶ τὰ παραδοθέντα <lb n="proem,5"></lb>ὑπὸ τῶν ἀρχαίων εἰς τάξιν ἀγαγεῖν, καὶ ἃ ἡμεῖς δὲ <lb n="proem,6"></lb>προσευρήκαμεν εἰσθέσθαι· οὕτως γὰρ τοὺς μετὰ ταῦτα <lb n="proem,7"></lb>ἐν τοῖς μαθήμασιν ἀναστρέφεσθαι βουλομένους ὠφε<lb n="proem,8"></lb>λεῖσθαι συμβήσεται. </s> <s id="id.000002">ἀκόλουθον δὲ εἶναι νομίσαντες <lb n="proem,9"></lb>τῇ τῶν ὑδρίων ὡροσκοπείων ἕξει, ἥτις ἡμῖν ἐν τέσσαρσι <lb n="proem,10"></lb>βιβλίοις προαναγέγραπται, ταύτην συνεχῆ ὑπάρχειν <lb n="proem,11"></lb>γράφομεν καὶ περὶ αὐτῆς, ὡς προείρηται· διὰ γὰρ συμ<lb n="proem,12"></lb>πλοκῆς ἀέρος καὶ πυρὸς καὶ ὕδατος καὶ γῆς καὶ τῶν <lb n="proem,13"></lb>τριῶν στοιχείων ἢ καὶ τῶν τεσσάρων συμπλεκομένων <lb n="proem,14"></lb>ποικίλαι διαθέσεις ἐνεργοῦνται, αἱ μὲν ἀναγκαιοτάτας <lb n="proem,15"></lb>τῷ βίῳ τούτῳ χρείας παρέχουσαι, αἱ δὲ ἐκπληκτικόν <lb n="proem,16"></lb>τινα θαυμασμὸν ἐπιδεικνύμεναι. <lb n="proem,17"></lb><pb pagenum="4"></pb></s></p> <p n="2"> <s id="id.000003">Πρὸ δὲ τῶν λέγεσθαι μελλόντων πρῶτον περὶ κενοῦ <lb n="proem,18"></lb>διαληπτέον. </s> <s id="id.000004">οἱ μὲν γὰρ τὸ καθόλου μηδὲν εἶναι κενὸν <lb n="proem,19"></lb>[2διατείνονται]2, οἱ δὲ ἄθρουν μὲν κατὰ φύσιν μηδὲν <lb n="proem,20"></lb>εἶναι κενόν, παρεσπαρμένον δὲ κατὰ μικρὰ μόρια τῷ <lb n="proem,21"></lb>ἀέρι καὶ τῷ ὑγρῷ καὶ [2τῷ]2 πυρὶ καὶ τοῖς ἄλλοις σώμα<lb n="proem,22"></lb>σιν· οἷς μάλιστα συμφέρεσθαι προσήκει· ἐκ γὰρ τῶν <lb n="proem,23"></lb>φαινομένων καὶ ὑπὸ τὴν αἴσθησιν πιπτόντων ἐν τοῖς <lb n="proem,24"></lb>ἑξῆς δείκνυται τοῦτο συμβαῖνον· %ἐν τῷ μέντοι τὰ <lb n="proem,25"></lb>ἀγγεῖα τὰ δοκοῦντα εἶναι τοῖς πολλοῖς κενὰ οὐκ ἔστιν, ὡς <lb n="proem,26"></lb>ὑπολαμβάνουσι, κενά, ἀέρος δὲ πλήρη. </s> <s id="id.000005">ὁ δὲ ἀήρ ἐστιν, <lb n="proem,27"></lb>ὡς τοῖς περὶ φύσεως πραγματευσαμένοις ἀρέσκει, ἐκ <lb n="proem,28"></lb>λεπτῶν καὶ μικρομερῶν σωμάτων συνεστηκὼς ἀφανῶν <lb n="proem,29"></lb>ἡμῖν ὄντων ὡς ἐπὶ [2τὸ]2 πολύ. </s> <s id="id.000006">ἐὰν γοῦν εἰς τὸ δοκοῦν <lb n="proem,30"></lb>ἀγγεῖον κενὸν ὑπάρχειν ἐγχέῃ τις ὕδωρ, καθ' ὅσον ἂν <lb n="proem,31"></lb>πλῆθος τοῦ ὕδατος εἰς τὸ ἀγγεῖον ἐμπίπτῃ, κατὰ τοσοῦ<lb n="proem,32"></lb>τον πλῆθος ἀὴρ ἐκχωρήσει. </s> <s id="id.000007">κατανοήσειε δ' ἄν τις τὸ <lb n="proem,33"></lb>λεγόμενον ἐκ τοῦ τοιούτου· ἐὰν γὰρ εἰς ὕδωρ κατα<lb n="proem,34"></lb>στρέψας ἀγγεῖον τὸ δοκοῦν εἶναι κενὸν πιέζῃς εἰς τὸ <lb n="proem,35"></lb>κάτω ἀκλινὲς διαφυλάσσων, οὐκ εἰσελεύσεται τὸ ὕδωρ <lb n="proem,36"></lb>εἰς αὐτό, κἂν ὅλον αὐτὸ κρύψῃς· ὥστε δῆλον εἶναι, <lb n="proem,37"></lb>ὅτι σῶμα ὑπάρχων ὁ ἀὴρ οὐκ ἐᾷ παρεισελθεῖν τὸ ὕδωρ <lb n="proem,38"></lb>διὰ τὸ πεπληρωκέναι πάντα τὸν ἐν τῷ ἀγγείῳ τόπον. <lb n="proem,39"></lb></s> <s id="id.000008">ἐὰν γοῦν τρυπήσῃ τις τὸν πυθμένα τοῦ ἀγγείου, τὸ <lb n="proem,40"></lb>μὲν ὕδωρ διὰ τοῦ στόματος εἰς αὐτὸ εἰσελεύσεται, ὁ <lb n="proem,41"></lb>δὲ ἀὴρ διὰ τοῦ τρυπήματος ἐξελεύσεται. </s> <s id="id.000009">πάλιν δὲ <pb pagenum="6"></pb><lb n="proem,42"></lb>πρὸ τοῦ τρυπῆσαι τὸν πυθμένα ἐάν τις ὀρθὸν ἐκ τοῦ <lb n="proem,43"></lb>ὕδατος τὸ ἀγγεῖον ἐπάρῃ, ἀνατρέψας ὄψεται πᾶσαν <lb n="proem,44"></lb>τὴν ἐντὸς τοῦ ἀγγείου ἐπιφάνειαν καθαρὰν ἀπὸ τοῦ <lb n="proem,45"></lb>ὑγροῦ, καθάπερ ἦν καὶ πρὸ τοῦ τεθῆναι. </s> <s id="id.000010">διὸ δὴ ὑπο<lb n="proem,46"></lb>ληπτέον εἶναι σῶμα τὸν ἀέρα. </s> <s id="id.000011">γίνεται δὲ πνεῦμα <lb n="proem,47"></lb>κινηθείς· οὐδὲν γὰρ ἕτερόν ἐστι τὸ πνεῦμα ἢ κινού<lb n="proem,48"></lb>μενος ἀήρ. </s> <s id="id.000012">ἐὰν γοῦν τετρυπημένου τοῦ ἀγγείου κατὰ <lb n="proem,49"></lb>τὸν πυθμένα καὶ εἰσπίπτοντος τοῦ ὕδατος παραθῇ τις <lb n="proem,50"></lb>τῷ τρυπήματι τὴν χεῖρα, αἰσθήσεται τὸ πνεῦμα ἐκπῖ<lb n="proem,51"></lb>πτον ἐκ τοῦ ἀγγείου· τοῦτο δὲ οὐκ ἄλλο τί ἐστιν ἢ ὁ <lb n="proem,52"></lb>ἐκκρουόμενος ὑπὸ τοῦ ὕδατος ἀήρ. </s> <s id="id.000013">οὐχ ὑποληπτέον <lb n="proem,53"></lb>οὖν ἐν τοῖς οὖσι κενοῦ τινα φύσιν ἀθρόαν αὐτὴν καθ' <lb n="proem,54"></lb>ἑαυτὴν ὑπάρχειν, παρεσπαρμένην δὲ κατὰ μικρὰ μόρια <lb n="proem,55"></lb>τῷ τε ἀέρι καὶ τῷ ὑγρῷ καὶ τοῖς ἄλλοις σώμασιν, εἰ <lb n="proem,56"></lb>μὴ ἄρα τὸν ἀδάμαντα μόνον μὴ κοινωνεῖν [2εἴποι τισ]2 <lb n="proem,57"></lb>τῇ τοῦ κενοῦ φύσει διὰ τὸ μήτε πύρωσιν ἐπιδέχεσθαι <lb n="proem,58"></lb>μήτε διακόπτεσθαι, τυπτόμενον δὲ εἰς τοὺς ἄκμονας <lb n="proem,59"></lb>καὶ τὰς σφύρας ὅλον ἐνδύεσθαι. </s> <s id="id.000014">τοῦτο δὲ αὐτῷ παρα<lb n="proem,60"></lb>κολουθεῖ διὰ τὴν συνεχῆ πυκνότητα· τὰ γὰρ τοῦ πυρὸς <lb n="proem,61"></lb>σώματα παχυμερέστερα ὄντα τῶν ἐν τῷ λίθῳ κενῶν <lb n="proem,62"></lb>οὐ παρεισέρχεται, ἀλλὰ μόνον ἐπιψαύει τῆς ἐκτὸς ἐπι<lb n="proem,63"></lb>φανείας· διόπερ μὴ προκατεισδύνοντα ἐντὸς καθάπερ <lb n="proem,64"></lb>ἐπὶ τῶν ἄλλων σωμάτων οὐδὲ δέχεται θερμότητα. </s> <s id="id.000015">τὰ δὲ <lb n="proem,65"></lb>τοῦ ἀέρος σώματα συνερείδει μὲν πρὸς ἄλληλα, οὐ <lb n="proem,66"></lb>κατὰ πᾶν δὲ μέρος ἐφαρμόζει, ἀλλ' ἔχει τινὰ διαστή<lb n="proem,67"></lb>ματα μεταξὺ κενὰ καθάπερ ἡ ἐν τοῖς αἰγιαλοῖς ψάμμος. <lb n="proem,68"></lb></s> <s id="id.000016">τὰ μὲν οὖν τῆς ψάμμου μόρια τοῖς τοῦ ἀέρος σώμασιν <pb pagenum="8"></pb><lb n="proem,69"></lb>ἀποικειοῦσθαι ὑποληπτέον, τὸν δὲ ἀέρα τὸν μεταξὺ <lb n="proem,70"></lb>τῶν τῆς ψάμμου μορίων τοῖς μεταξὺ τοῦ ἀέρος κενοῖς· <lb n="proem,71"></lb>διὸ καὶ πιλεῖσθαι τὸν ἀέρα συμβαίνει ἐκ βίας τινὸς <lb n="proem,72"></lb>προσελθούσης καὶ συνιζάνειν εἰς τὰς τῶν κενῶν χώρας, <lb n="proem,73"></lb>παρὰ φύσιν τῶν σωμάτων πρὸς ἄλληλα θλιβομένων· <lb n="proem,74"></lb>ἀνέσεως δὲ γενομένης πάλιν εἰς τὴν αὐτὴν τάξιν ἀπο<lb n="proem,75"></lb>καθίσταται τῇ τῶν σωμάτων εὐτονίᾳ, καθάπερ καὶ τοῖς <lb n="proem,76"></lb>τῶν κεράτων συμβαίνει ξέσμασι καὶ τοῖς ξηροῖς σπόγ<lb n="proem,77"></lb>γοις, ὅταν συμπιληθέντα ἀνεθῇ, πάλιν ἐπὶ τὴν αὐτὴν <lb n="proem,78"></lb>χώραν ἀποκαθίστασθαι καὶ τὸν αὐτὸν ὄγκον ἀποδιδόναι, <lb n="proem,79"></lb>ὁμοίως δὲ καὶ ἐάν τινος βίας γενομένης ἀπ' ἀλλήλων <lb n="proem,80"></lb>διαστῇ τὰ τοῦ ἀέρος σώματα καὶ μείζων κενὸς παρὰ <lb n="proem,81"></lb>φύσιν γένηται τόπος, πάλιν πρὸς ἄλληλα συντρέχειν· <lb n="proem,82"></lb>διὰ γὰρ τοῦ κενοῦ ταχεῖαν γίνεσθαι τὴν φορὰν τοῖς <lb n="proem,83"></lb>σώμασι [2συμβαίνει]2, μηδενὸς ἀνθισταμένου μηδὲ ἀντι<lb n="proem,84"></lb>κρούοντος, ἕως ἂν ἀλλήλοις προσερείσῃ τὰ σώματα. <lb n="proem,85"></lb></s> <s id="id.000017">ἐὰν οὖν ἀγγεῖον λαβών τις κουφότατον καὶ σύστομον, <lb n="proem,86"></lb>προσθεὶς τῷ στόματι ἐκμυζήσῃ τὸν ἀέρα καὶ ἀφῇ, ἐκ<lb n="proem,87"></lb>κρεμασθήσεται ἐκ τῶν χειλέων τὸ ἀγγεῖον, ἐπισπωμένου <lb n="proem,88"></lb>τοῦ κενοῦ τὴν σάρκα πρὸς τὸ ἀναπληρωθῆναι τὸν <lb n="proem,89"></lb>κενωθέντα τόπον· ὥστε ἐκ τούτου φανερὸν γενέσθαι, <lb n="proem,90"></lb>ὅτι ἄθρους κενὸς ὑπῆρξεν ἐν τῷ ἀγγείῳ τόπος. </s> <s id="id.000018">καὶ <lb n="proem,91"></lb>ἄλλως δὲ τοῦτο φανερόν· τὰ γὰρ ἰατρικὰ ᾠὰ ὑέλινα <lb n="proem,92"></lb>ὄντα καὶ σύστομα, ὅταν βούλωνται πληρῶσαι ὑγροῦ, <lb n="proem,93"></lb>ἐκμυζήσαντες τῷ στόματι τὸν ἐν αὐτοῖς ἀέρα καὶ κατα<lb n="proem,94"></lb>λαβόντες τὸ στόμιον αὐτῶν τῷ δακτύλῳ καταστρέφου<pb pagenum="10"></pb><lb n="proem,95"></lb>σιν εἰς τὸ ὑγρόν, καὶ ἀνεθέντος τοῦ δακτύλου ἀνα<lb n="proem,96"></lb>σπᾶται εἰς τὸν κενωθέντα τόπον τὸ ὕδωρ, καίτοι παρὰ <lb n="proem,97"></lb>φύσιν τῆς φορᾶς ἄνω γενομένης τῷ ὑγρῷ. </s> <s id="id.000019">καὶ τὸ <lb n="proem,98"></lb>περὶ τὴν σικύαν δὲ συμβαῖνον οὐκ ἀλλότριον τῶν <lb n="proem,99"></lb>προειρημένων ὑπάρχει· προστιθέμεναι γὰρ αὗται τῷ <lb n="proem,100"></lb>σώματι οὐ μόνον οὐκ ἀποπίπτουσιν ἱκανὸν ἔχουσαι <lb n="proem,101"></lb>βάρος, ἀλλὰ καὶ προσεπισπῶνται τὴν παρακειμένην ὕλην <lb n="proem,102"></lb>διὰ τῶν τοῦ σώματος ἀραιωμάτων δι' αἰτίαν τοιαύτην· <lb n="proem,103"></lb>ἐμβληθὲν γὰρ ἐν αὐταῖς τὸ πῦρ φθείρει καὶ λεπτύνει <lb n="proem,104"></lb>τὸν ἀπειλημμένον ἐν αὐταῖς ἀέρα, καθάπερ καὶ τὰ <lb n="proem,105"></lb>ἄλλα σώματα ὑπὸ τοῦ πυρὸς φθείρεταί τε καὶ μετα<lb n="proem,106"></lb>βάλλει εἰς λεπτοτέρας οὐσίας, λέγω δὴ ὕδωρ καὶ ἀέρα <lb n="proem,107"></lb>καὶ γῆν. </s> <s id="id.000020">ὅτι μὲν γὰρ φθείρεται, δῆλον ἐκ τῶν περι<lb n="proem,108"></lb>λειπομένων ἀνθράκων· οὗτοι γὰρ τὸν αὐτὸν ὄγκον <lb n="proem,109"></lb>διαφυλάττοντες τῷ ἐξ ἀρχῆς πρὸ τοῦ τὴν καῦσιν ἐπι<lb n="proem,110"></lb>δέξασθαι ἢ ὀλίγῳ ἐλάσσονα, παρὰ πολὺ τῷ βάρει <lb n="proem,111"></lb>διαλλάσσουσι τοῦ ἐξ ἀρχῆς. </s> <s id="id.000021">χωρεῖ δὲ τὰ διεφθαρμένα <lb n="proem,112"></lb>τῶν σωμάτων διὰ τῶν καπνῶν εἴς τε πυρώδη οὐσίαν <lb n="proem,113"></lb>καὶ ἀερώδη καὶ γεώδη· τὰ μὲν γὰρ λεπτότερα τῆς <lb n="proem,114"></lb>φθορᾶς εἰς τὸν ἀνωτάτω χωρεῖ τόπον, ἔνθαπερ καὶ τὸ <lb n="proem,115"></lb>πῦρ· τὰ δὲ τούτων μικρῷ παχυμερέστερα εἰς τὸν ἀέρα· <lb n="proem,116"></lb>τὰ δὲ ἔτι τούτων παχύτερα ἐπὶ ποσὸν συνανενεχθέντα <lb n="proem,117"></lb>τοῖς εἰρημένοις διὰ τὴν συνεχῆ φορὰν πάλιν εἰς τὸν <lb n="proem,118"></lb>κάτω χωρήσαντα τόπον τοῖς γεώδεσι συνάπτει. </s> <s id="id.000022">μετα<lb n="proem,119"></lb>βάλλει δὲ καὶ τὸ ὕδωρ εἰς ἀέρα φθειρόμενον ὑπὸ τοῦ <lb n="proem,120"></lb>πυρός· οἱ γὰρ ἐκ τῶν ὑποκαιομένων λεβήτων ἀτμοὶ <lb n="proem,121"></lb>οὐκ ἄλλο τί εἰσιν ἢ αἱ τοῦ ὑγροῦ λεπτύνσεις εἰς ἀέρα <lb n="proem,122"></lb>χωροῦσαι. </s> <s id="id.000023">ὅτι μὲν οὖν τὸ πῦρ διαλύει τὰ παχύτερα <pb pagenum="12"></pb><lb n="proem,123"></lb>αὐτοῦ πάντα καὶ μεταβάλλει, ἐκ τούτων δῆλον. </s> <s id="id.000024">καὶ ἐκ <lb n="proem,124"></lb>τῶν ἀναθυμιάσεων δὲ τῶν ἀπὸ τῆς γῆς γινομένων <lb n="proem,125"></lb>μεταβάλλει τὰ παχύτερα τῶν σωμάτων εἰς λεπτομερε<lb n="proem,126"></lb>στέρας οὐσίας· αἱ γὰρ δρόσοι οὐκ ἄλλως ἀναφέρονται <lb n="proem,127"></lb>ἢ λεπτυνομένου τοῦ ἐν τῇ γῇ ὕδατος ὑπὸ τῆς ἀνα<lb n="proem,128"></lb>θυμιάσεως· αὕτη δὲ ὑπὸ πυρώδους τινὸς οὐσίας γίνεται, <lb n="proem,129"></lb>τοῦ ἡλίου ὑπὸ γῆν ὄντος καὶ θερμαίνοντος τὸν κατ' <lb n="proem,130"></lb>ἐκεῖνο τόπον, καὶ μᾶλλον ἤτοι θειώδη ἢ ἀσφαλτώδη <lb n="proem,131"></lb>ὄντα, ὃς θερμαινόμενος ἐπὶ πλεῖον τὴν ἀναθυμίασιν <lb n="proem,132"></lb>ποιεῖ· καὶ τὰ θερμὰ δὲ τῶν ὑδάτων τὰ ἐν τῇ γῇ εὑρι<lb n="proem,133"></lb>σκόμενα ἐκ τῆς αὐτῆς αἰτίας γίνεται. </s> <s id="id.000025">τῶν οὖν δρόσων <lb n="proem,134"></lb>τὰ μὲν λεπτότερα εἰς ἀέρα μεταβάλλει, τὰ δὲ παχύτερα <lb n="proem,135"></lb>ἐπὶ ποσὸν συνανενεχθέντα διὰ τὴν τῆς ἀναθυμιάσεως <lb n="proem,136"></lb>βίαν, ταύτης ἀποψυχείσης κατὰ τὴν τοῦ ἡλίου μετα<lb n="proem,137"></lb>τροπὴν πάλιν εἰς τὸν κάτω φέρεται τόπον. </s> <s id="id.000026">καὶ τὰ <lb n="proem,138"></lb>πνεύματα δὲ ἐκ σφοδρᾶς ἀναθυμιάσεως γίνεται, τοῦ <lb n="proem,139"></lb>ἀέρος ἐξωθουμένου καὶ λεπτυνομένου καὶ ἀεὶ τὸν ἑξῆς <lb n="proem,140"></lb>καὶ συνεχῆ αὐτῷ κινοῦντος· ἡ μέντοι κίνησις τοῦ <lb n="proem,141"></lb>ἀέρος οὐ κατὰ πάντα τόπον ἰσοταχὴς γίνεται, ἀλλὰ <lb n="proem,142"></lb>σφοδροτέρα μὲν παρ' αὐτὴν τὴν ἀναθυμίασιν, ἀμαυρο<lb n="proem,143"></lb>τέρα δὲ μακρυνθεῖσα τοῦ τόπου, καθ' ὃν κεκίνηται, <lb n="proem,144"></lb>καθάπερ καὶ ἐπὶ τῶν ἄνω φερομένων βαρῶν. </s> <s id="id.000027">φέρεται γὰρ <lb n="proem,145"></lb>καὶ ταῦτα τάχιον μὲν κατὰ τὸν συνεγγίζοντα τῷ κάτω <lb n="proem,146"></lb>τόπον, πρὸς ὅν ἐστι καὶ ἡ ἀποστέλλουσα αὐτὰ δύναμις, <pb pagenum="14"></pb><lb n="proem,147"></lb>βράδιον δὲ κατὰ τὸν ἄνω· τὸ παράπαν δὲ μηκέτι <lb n="proem,148"></lb>παρεπομένης αὐτοῖς τῆς ἐξαποστελλούσης βίας, πάλιν <lb n="proem,149"></lb>εἰς τὸν κατὰ φύσιν φέρεται τόπον, λέγω δὴ εἰς <lb n="proem,150"></lb>τὸν κάτω· εἰ δὲ ἰσοταχῆ αὐτὰ παρέπεμπεν ἡ ἐξαπο<lb n="proem,151"></lb>στέλλουσα βία, οὐκ ἄν ποτε ἔληξε. </s> <s id="id.000028">νυνὶ δὲ κατὰ βραχὺ <lb n="proem,152"></lb>ἀποληγούσης αὐτῆς καὶ ὥσπερ δαπανωμένης, καὶ τὸ <lb n="proem,153"></lb>τάχος λήγει τῆς φορᾶς. </s> <s id="id.000029">καὶ τὸ ὕδωρ δὲ μεταβάλλει εἰς <lb n="proem,154"></lb>γεώδη οὐσίαν· ὅταν γὰρ εἴς τινα γεώδη καὶ κοῖλον <lb n="proem,155"></lb>τόπον ἐκχέωμεν ὕδωρ, μετ' οὐ πολὺν χρόνον ἀφανὲς <lb n="proem,156"></lb>γίνεται ἀναποθὲν ὑπὸ τῆς γεώδους οὐσίας, ὥστε συνανα<lb n="proem,157"></lb>κίρναται καὶ γίνεται καὶ αὐτὸ γῆ. </s> <s id="id.000030">εἰ δὲ λέγοι τις, ὅτι <lb n="proem,158"></lb>οὐ παραπλάσσεται οὐδὲ ἀναπίνεται ὑπὸ τῆς γῆς, ἀλλ' <lb n="proem,159"></lb>ἐξικμάζεται ἀναπινόμενον ὑπὸ θερμότητος ἤτοι τοῦ <lb n="proem,160"></lb>ἡλίου ἢ ἑτέρου τινός, ψεῦδος λέγων ἀποδειχθήσεται· <lb n="proem,161"></lb>τὸ γὰρ αὐτὸ ὕδωρ ἐμβληθὲν εἴς τι ἀγγεῖον ἤτοι <lb n="proem,162"></lb>ὑάλινον ἢ χαλκοῦν ἢ ἐξ ἄλλης πυκνῆς ὕλης καὶ τεθὲν <lb n="proem,163"></lb>ἐν ἡλίῳ πολὺν χρόνον οὐκ ἐλαττοῦται, εἰ μὴ παρὰ <lb n="proem,164"></lb>μικρὸν μόριον παντάπασιν αὐτοῦ· ὥστε μεταβάλλει <lb n="proem,165"></lb>καὶ τὸ ὕδωρ εἰς γεώδη οὐσίαν. </s> <s id="id.000031">αἱ γοῦν ἰλύες καὶ οἱ <lb n="proem,166"></lb>βόρβοροι τοῦ ὕδατός εἰσιν εἰς γεώδη οὐσίαν μετα<lb n="proem,167"></lb>βολαί. </s> <s id="id.000032">μεταβάλλει δὲ καὶ ἡ λεπτοτέρα οὐσία εἰς παχυ<lb n="proem,168"></lb>τέραν, καθάπερ ὁρῶμεν καὶ τὴν φλόγα ἐπὶ τῶν ἀπο<lb n="proem,169"></lb>σβεννυμένων λύχνων, ὅταν ἐλλιπεῖς ἐλαίου γένωνται, <lb n="proem,170"></lb>ἐπὶ ποσὸν μὲν ἄνω φερομένην καὶ ὥσπερ ἐπειγομένην <lb n="proem,171"></lb>εἰς τὸν ἴδιον χωρῆσαι τόπον, λέγω δὲ τὸν ἀνώτατον <lb n="proem,172"></lb>καὶ ὄντα ὑπὲρ τὸν ἀέρα, [2κατα]2κρατηθεῖσαν δὲ ὑπὸ <lb n="proem,173"></lb>τοῦ πολλοῦ ἀέρος τοῦ μεταξὺ μηκέτι ἐπὶ τὸν συνεχῆ <pb pagenum="16"></pb><lb n="proem,174"></lb>φερομένην, ἀλλ' ὥσπερ κερασθεῖσαν καὶ παραπλεχθεῖσαν <lb n="proem,175"></lb>τοῖς τοῦ ἀέρος σώμασι καὶ αὐτὴν ἀέρα γενέσθαι. </s> <s id="id.000033">τὸ <lb n="proem,176"></lb>δὲ ὅμοιον ἐπινοεῖν δεῖ καὶ ἐπὶ τοῦ ἀέρος· ὅταν γὰρ <lb n="proem,177"></lb>οὗτος εἴς τι ἀγγεῖον οὐ μέγα ὑπάρχον καὶ ἐστεγνω<lb n="proem,178"></lb>μένον εἰς ὕδωρ σὺν τῷ ἀγγείῳ κατατεθῇ, εἶτα ἀνα<lb n="proem,179"></lb>στομωθέντος τοῦ ἀγγείου καὶ τὸ στόμιον εἰς τὸ ἄνω <lb n="proem,180"></lb>ἔχοντος τὸ ὕδωρ ἐμπέσῃ, ὁ μὲν ἀὴρ ἐκχωρεῖ ἐκ τοῦ <lb n="proem,181"></lb>ἀγγείου, κατακρατηθεὶς δὲ ἐκ τοῦ πολλοῦ ὕδατος πάλιν <lb n="proem,182"></lb>κεράννυται καὶ παραπλάσσεται, ὥστε ὕδωρ γενέσθαι. <lb n="proem,183"></lb></s> <s id="id.000034">οὕτως οὖν καὶ τοῦ ἐν τῇ σικύᾳ ἀέρος φθειρομένου <lb n="proem,184"></lb>καὶ λεπτυνομένου ὑπὸ τοῦ πυρὸς καὶ διεκπίπτοντος διὰ <lb n="proem,185"></lb>τῶν τοῦ τεύχους ἀραιωμάτων κενούμενος ὁ ἐντὸς <lb n="proem,186"></lb>τόπος ἐπισπᾶται τὴν παρακειμένην ὕλην, οἵα τις ἐὰν <lb n="proem,187"></lb>τυγχάνῃ· παραπνευσάσης δὲ τῆς σικύας ὁ μὲν ἀὴρ εἰς <lb n="proem,188"></lb>τὸν κενούμενον τόπον εἰσπίπτει, τῆς δὲ ὕλης οὐκέτι <lb n="proem,189"></lb>οὐδὲν ἐπισπάσεται. </s> <s id="id.000035">τοῖς οὖν φαμένοις τὸ καθόλου <lb n="proem,190"></lb>μηδὲν εἶναι κενὸν ἐκποιεῖ πρὸς ταῦτα πολλὰ εὑρίσκειν <lb n="proem,191"></lb>ἐπιχειρήματα καὶ τάχα φαίνεσθαι τῷ λόγῳ πιθανω<lb n="proem,192"></lb>τέρους μηδεμιᾶς παρακειμένης αἰσθητικῆς ἀποδείξεως· <lb n="proem,193"></lb>ἐὰν μέντοι δειχθῇ ἐπὶ τῶν φαινομένων καὶ ὑπὸ τὴν <lb n="proem,194"></lb>αἴσθησιν πιπτόντων, ὅτι κενὸν ἄθρουν ἐστὶν παρὰ <lb n="proem,195"></lb>φύσιν μέντοι γινόμενον, καὶ κατὰ φύσιν μὲν κενόν, <lb n="proem,196"></lb>κατὰ λεπτὰ δὲ παρεσπαρμένον, καὶ ὅτι κατὰ πίλησιν <lb n="proem,197"></lb>τὰ σώματα ἀναπληροῖ τὰ παρεσπαρμένα κενά, οὐδε<lb n="proem,198"></lb>μίαν οὐκέτι παρείσδυσιν ἕξουσιν οἱ τοὺς πιθανοὺς <lb n="proem,199"></lb>τῶν λόγων περὶ τούτων προφερόμενοι. </s> <s id="id.000036">κατασκευάζεται <lb n="proem,200"></lb>γὰρ σφαῖρα πάχος ἔχουσα τοῦ ἐλάσματος, ὥστε μὴ <pb pagenum="18"></pb><lb n="proem,201"></lb>εὔθλαστος εἶναι, χωροῦσα ὅσον κοτύλας η#. </s> <s id="id.000037">στεγνῆς δὲ <lb n="proem,202"></lb>οὔσης αὐτῆς πάντοθεν τρυπήσαντα δεῖ σίφωνα καθεῖναι <lb n="proem,203"></lb>χαλκοῦν, τουτέστι σωλῆνα λεπτόν, μὴ ψαύοντα τοῦ <lb n="proem,204"></lb>κατὰ διάμετρον τόπου τοῦ τετρυπημένου σημείου, <lb n="proem,205"></lb>ὅπως ὕδατι διάρρυσις ὑπάρχῃ, τὸ δὲ ἄλλο μέρος αὐτοῦ <lb n="proem,206"></lb>ἐκτὸς ὑπερέχειν τῆς σφαίρας ὅσον δακτύλους τρεῖς· <lb n="proem,207"></lb>τὴν δὲ τοῦ τρυπήματος περιοχήν, δι' οὗ καθίεται ὁ <lb n="proem,208"></lb>σίφων, στεγνοῦν δεῖ κασσιτέρῳ προσλαμβάνοντα πρός τε <lb n="proem,209"></lb>τὸν σίφωνα καὶ τὴν ἐκτὸς τῆς σφαίρας ἐπιφάνειαν, <lb n="proem,210"></lb>ὥστε ὅταν βουλώμεθα τῷ στόματι διὰ τοῦ σίφωνος <lb n="proem,211"></lb>ἐμφυσᾶν, κατὰ μηδένα τρόπον τὸ πνεῦμα τῆς σφαίρας <lb n="proem,212"></lb>διεκπίπτειν. </s> <s id="id.000038">σκοπῶμεν δὴ τὰ συμβαίνοντα· ὑπάρχοντος <lb n="proem,213"></lb>γὰρ ἀέρος ἐν αὐτῇ, καθάπερ καὶ ἐν τοῖς ἄλλοις ἀγ<lb n="proem,214"></lb>γείοις πᾶσι τοῖς λεγομένοις κενοῖς, τοῦ δὲ ἀέρος <lb n="proem,215"></lb>πεπληρωκότος πάντα τὸν ἐν αὐτῇ τόπον καὶ προσ<lb n="proem,216"></lb>ερηρεισμένου κατὰ συνέχειαν πρὸς τὴν τοῦ τεύχους <lb n="proem,217"></lb>περιοχὴν καὶ μηδενὸς κενοῦ, καθάπερ οἴονται, τὸ <lb n="proem,218"></lb>παράπαν ὑπάρχοντος τόπου, οὔτ' ἂν ὕδωρ εἰσκρῖναι <lb n="proem,219"></lb>δυνηθείημεν οὔτε ἄλλον ἀέρα, μὴ ὑποχωρήσαντος <lb n="proem,220"></lb>τοῦ πρότερον ἐν αὐτῇ ὑπάρχοντος ἀέρος. </s> <s id="id.000039">καὶ ἐὰν μετὰ <lb n="proem,221"></lb>πολλῆς βίας τὴν εἴσκρισιν ποιώμεθα, πρότερον διαρρα<lb n="proem,222"></lb>γήσεται τὸ τεῦχος ἢ ἐπιδέξεταί τι πλῆρες ὑπάρχον· <lb n="proem,223"></lb>οὔτε γὰρ τὰ σώματα τοῦ ἀέρος δύναται συσταλῆναι <lb n="proem,224"></lb>εἰς ἔλασσον μέγεθος· δεήσει γὰρ ἐν αὐτοῖς ἔχειν τινὰ <lb n="proem,225"></lb>διαστήματα, εἰς ἃ συμπιλούμενα ἐλάσσων αὐτοῖς ὄγκος <lb n="proem,226"></lb>ἔσται· τοῦτο δὲ οὐ πιθανὸν γίνεται μὴ ὄντος καθόλου <lb n="proem,227"></lb>κενοῦ· οὔτε συνερηρεισμένων κατὰ πάσας τὰς ἐπι<lb n="proem,228"></lb>φανείας τῶν σωμάτων πρὸς ἄλληλα καὶ ὁμοίως πρὸς <pb pagenum="20"></pb><lb n="proem,229"></lb>τὴν τοῦ τεύχους περιοχὴν δύναιτο ἂν διωσθέντα τόπον <lb n="proem,230"></lb>που ποιῆσαι, μὴ ὑπάρχοντος κενοῦ τινος· ὥστε κατὰ <lb n="proem,231"></lb>μηδένα τρόπον προσεισκριθῆναί τι τῶν ἐκτὸς εἰς τὴν <lb n="proem,232"></lb>σφαῖραν, ἐὰν μὴ ἐκχωρήσῃ τι μέρος τοῦ ἐν αὐτῇ ὑπάρ<lb n="proem,233"></lb>χοντος πρότερον ἀέρος, εἴπερ ἐστὶ πεπυκνωμένος καὶ <lb n="proem,234"></lb>συνεχὴς πᾶς ὁ τόπος, ὡς οἴονται. </s> <s id="id.000040">καὶ μὴν ἐάν τις <lb n="proem,235"></lb>ἐθέλῃ τὸν σίφωνα βαλὼν εἰς τὸ στόμα ἐμφυσᾶν εἰς τὴν <lb n="proem,236"></lb>σφαῖραν, πολὺ προσεισκρινεῖ πνεῦμα, μὴ ὑποχωρήσαν<lb n="proem,237"></lb>τος τοῦ προϋπάρχοντος ἐν αὐτῇ ἀέρος· τούτου δὲ ἀεὶ <lb n="proem,238"></lb>συμβαίνοντος, σαφῶς δείκνυται συστολὴ γινομένη τῶν <lb n="proem,239"></lb>ὑπαρχόντων ἐν τῇ σφαίρᾳ σωμάτων εἰς τὰ παρεμπεπλεγ<lb n="proem,240"></lb>μένα κενά. </s> <s id="id.000041">παρὰ φύσιν δὲ ἡ συστολὴ γίνεται διὰ <lb n="proem,241"></lb>τὴν τῆς εἰσκρίσεως βίαν. </s> <s id="id.000042">ἐάν τις οὖν ἐμφυσήσας καὶ <lb n="proem,242"></lb>παρ' αὐτὸ τὸ στόμα προσαγαγὼν τὴν χεῖρα συντόμως <lb n="proem,243"></lb>ἐπιπωμάσῃ τῷ δακτύλῳ τὸν σίφωνα, μενεῖ πάντα τὸν <lb n="proem,244"></lb>χρόνον συνεσφιγμένος ὁ ἀὴρ ἐν τῇ σφαίρᾳ· ἐὰν δέ τις <lb n="proem,245"></lb>ἀναπωμάσῃ, πάλιν ἐκτὸς ὁρμήσει μετά τε ψόφου καὶ <lb n="proem,246"></lb>βοῆς πολλῆς ὁ προσεισκριθεὶς ἀὴρ διὰ τὸ ἐκκρούεσθαι, <lb n="proem,247"></lb>καθάπερ προεθέμεθα, κατὰ τὴν τοῦ προϋπάρχοντος <lb n="proem,248"></lb>ἀέρος διαστολὴν τὴν κατὰ τὴν εὐτονίαν γινομένην. <lb n="proem,249"></lb></s> <s id="id.000043">πάλιν οὖν ἐάν τις βούληται τὸν ὑπάρχοντα ἀέρα ἐν <lb n="proem,250"></lb>τῇ σφαίρᾳ ἐξέλκειν τῷ στόματι διὰ τοῦ σίφωνος, πολὺ <lb n="proem,251"></lb>πλῆθος ἐπακολουθήσει, μηδεμιᾶς ἄλλης οὐσίας εἰς <lb n="proem,252"></lb>τὴν σφαῖραν ἀντικαταλλασσομένης, καθάπερ ἐπὶ τοῦ <lb n="proem,253"></lb>ᾠοῦ προείρηται· ὥστε διὰ τοῦ τοιούτου τελείως δεί<lb n="proem,254"></lb>κνυσθαι μεγάλην ἄθροισιν κενοῦ γινομένην ἐν τῇ <pb pagenum="22"></pb><lb n="proem,255"></lb>σφαίρᾳ· οὐ γὰρ μείζονα δυνατὸν γενέσθαι τὰ ὑπο<lb n="proem,256"></lb>λειπόμενα τοῦ ἀέρος σώματα κατὰ τὸν καιρὸν τοῦτον, <lb n="proem,257"></lb>ὥστε συναναπληρῶσαι τὸν τῶν ἐκκρουσθέντων σωμάτων <lb n="proem,258"></lb>τόπον· εἰ γὰρ αὐξηθήσεται, μηδεμιᾶς αὐτοῖς οὐσίας <lb n="proem,259"></lb>δυναμένης ἔξωθεν προσεισκριθῆναι, πιθανὸν τὴν αὔξη<lb n="proem,260"></lb>σιν γενέσθαι κατὰ ἀραίωσιν. </s> <s id="id.000044">αὕτη δὲ ἔσται ἡ κατὰ <lb n="proem,261"></lb>κένωσιν παρεμπλοκή· κενὸν δὲ οὐδέν φασιν ὑπάρχειν· <lb n="proem,262"></lb>οὐδὲ ἄρα αὐξηθήσεται τὰ σώματα· ἄλλην γὰρ αὔξησιν <lb n="proem,263"></lb>οὐδεμίαν αὐτοῖς ἐσομένην ἐπινοῆσαι δυνατόν ἐστι. <lb n="proem,264"></lb></s> <s id="id.000045">φανερὸν οὖν ἐκ τῶν εἰρημένων, ὅτι τοῖς μὲν τοῦ ἀέρος <lb n="proem,265"></lb>σώμασι παρέσπαρταί τινα μεταξὺ κενά, βίας δέ τινος <lb n="proem,266"></lb>προσελθούσης συνίζησιν πάσχει παρὰ φύσιν εἰς τὰ <lb n="proem,267"></lb>κενά. </s> <s id="id.000046">ὁ δὲ ἐν τῷ ἀγγείῳ τῷ κατεστραμμένῳ εἰς τὸ <lb n="proem,268"></lb>ὕδωρ ἐνὼν ἀὴρ οὐ πάνυ λαμβάνει πίλησιν· τὸ γὰρ <lb n="proem,269"></lb>βιαζόμενον οὐκ ἔστιν ἀξιόχρεων διὰ τὸ τὸ ὕδωρ φυσι<lb n="proem,270"></lb>κῶς αὐτὸ ἐν ἑαυτῷ μήτε βάρος μήτε ἔκθλιψιν σφοδρὰν <lb n="proem,271"></lb>ἔχειν· ὅθεν συμβαίνει τῶν κατακολυμβώντων εἰς τὸν <lb n="proem,272"></lb>βυθὸν τῆς θαλάσσης μετρητὰς ἀπείρους ἐχόντων κατὰ <lb n="proem,273"></lb>τῶν νώτων τὰς ἀναπνοὰς μὴ βιάζεσθαι ὑπὸ τοῦ <lb n="proem,274"></lb>ὕδατος, ὀλίγου παντελῶς ἐν τοῖς μυκτῆρσιν ἀέρος <lb n="proem,275"></lb>ἀπειλημμένου. </s> <s id="id.000047">τίς δὲ ἔστιν ἡ αἰτία, δι' ἥν, ὡς εἴρηται, <lb n="proem,276"></lb>οἱ ἐν τῷ βυθῷ κολυμβῶντες ἄπειρον βάρος ἔχοντες <lb n="proem,277"></lb>ὕδατος κατὰ τῶν νώτων οὐ θλίβονται, ἄξιον ἐπιστῆσαι. <lb n="proem,278"></lb></s> <s id="id.000048">λέγουσι δή τινες· "1διότι τὸ ὕδωρ ἰσοβαρὲς αὐτὸ καθ' <lb n="proem,279"></lb>αὑτό ἐστιν"2. </s> <s id="id.000049">οὗτοι δὲ οὐδὲν ἀποφαίνονται, διότι οἱ <pb pagenum="24"></pb><lb n="proem,280"></lb>κάτω κολυμβῶντες οὐ θλίβονται ὑπὸ τοῦ ὑπεράνω <lb n="proem,281"></lb>ὕδατος. </s> <s id="id.000050">ὑπολάβωμεν% τὸ ὑπεράνω <lb n="proem,282"></lb>ὑγρὸν ἀπὸ τῆς τοῦ θλιβομένου ἐπιφανείας, καθ' ἣν <lb n="proem,283"></lb>ἐπίκειται αὐτῷ τὸ ὕδωρ, σῶμά τι ἰσοβαρὲς ὂν τῷ <lb n="proem,284"></lb>ὑγρῷ τὸ αὐτὸ σχῆμα ἔχειν τῷ ὑπεράνω ὑγρῷ· τοῦτο <lb n="proem,285"></lb>δὲ ἐμβεβλῆσθαι εἰς τὸ ὑγρόν, ὥστε τὴν κάτω ἐπιφάνειαν <lb n="proem,286"></lb>αὐτοῦ ἁρμόζειν τῷ θλιβομένῳ, καὶ ὥσπερ% αὐτὸ εἶναι <lb n="proem,287"></lb>καὶ ὁμοίως ἐπικεῖσθαι τῷ πρότερον ἐπικειμένῳ ὑγρῷ. <lb n="proem,288"></lb></s> <s id="id.000051">φανερὸν οὖν ὅτι τοῦτο τὸ σῶμα οὔτε ὑπερέχει τι τοῦ <lb n="proem,289"></lb>ὑγροῦ ἀφεθὲν οὔτε καταδύσεται ὑπὸ τὴν τοῦ ἄνω <lb n="proem,290"></lb>ὑγροῦ ἐπιφάνειαν. </s> <s id="id.000052">ἀπεδείχθη γὰρ Ἀρχιμήδει ἐν τοῖς <lb n="proem,291"></lb>Ὀχουμένοις, ὅτι τὰ ἰσοβαρῆ τῷ ὑγρῷ σώματα ἀφεθέντα <lb n="proem,292"></lb>εἰς τὸ ὑγρὸν οὔτε ὑπερέξει τοῦ ὑγροῦ οὔτε καταδύ<lb n="proem,293"></lb>σεται, οὐδ' ἄρα θλίψει τὰ ὑποκείμενα. </s> <s id="id.000053">ἀφαιρεθέντων <lb n="proem,294"></lb>οὖν τῶν ἄνωθεν θλιβόντων, μενεῖ τὸ σῶμα ἐν τῷ <lb n="proem,295"></lb>αὐτῷ τόπῳ· πῶς οὖν θλίψει τὸ σῶμα τὸ μὴ ἔχον ὄρεξιν <lb n="proem,296"></lb>εἰς τὸ κάτω; τὸν αὐτὸν δὲ τρόπον καὶ τὸ ὑγρόν, ἔνθα <lb n="proem,297"></lb>ἦν τὸ σῶμα, οὐ θλίψει τὰ ὑποκείμενα· ἕνεκα γὰρ <lb n="proem,298"></lb>μονῆς τε καὶ κινήσεως διαφέρει τὸ εἰρημένον σῶμα τοῦ <lb n="proem,299"></lb>τὸν αὐτὸν τόπον ἐπέχοντος ὑγροῦ. </s> <s id="id.000054">ὅτι δὲ ἔστι κενά, <lb n="proem,300"></lb>καὶ ἐκ τούτων ἄν τις καταλάβοι. </s> <s id="id.000055">μὴ γὰρ ὄντων αὐτῶν, <lb n="proem,301"></lb>οὐτ' ἂν διὰ τοῦ ὕδατος οὔτε διὰ τοῦ ἀέρος οὔτε δι' <lb n="proem,302"></lb>ἄλλου σώματος οὐδενὸς ἠδύνατο ἂν διεκπίπτειν τὸ <lb n="proem,303"></lb>φῶς οὐδὲ ἡ θερμότης οὐδ' ἄλλη δύναμις οὐδεμία σω<pb pagenum="26"></pb><lb n="proem,304"></lb>ματική. </s> <s id="id.000056">ἐπεὶ πῶς ἂν αἱ τοῦ ἡλίου ἀκτῖνες διὰ τοῦ <lb n="proem,305"></lb>ὕδατος διεξέπιπτον εἰς τὸν τοῦ ἀγγείου πυθμένα; εἰ <lb n="proem,306"></lb>γὰρ τὸ ὑγρὸν μὴ εἶχε πόρους, ἀλλὰ βίᾳ διέστελλον αἱ <lb n="proem,307"></lb>αὐγαὶ τὸ ὕδωρ, συνέβαινεν ἂν ὑπερεκχεῖσθαι τὰ πλήρη <lb n="proem,308"></lb>τῶν ἀγγείων· ὅπερ οὐ φαίνεται γινόμενον. </s> <s id="id.000057">ἔτι δὲ καὶ <lb n="proem,309"></lb>ταύτῃ φανερόν· εἰ γὰρ βίᾳ τὸ ὕδωρ διέστελλον, οὐκ <lb n="proem,310"></lb>ἂν τῶν ἀκτίνων αἱ μὲν ἀνεκλῶντο πρὸς τὸν ἄνω <lb n="proem,311"></lb>τόπον, αἱ δὲ καὶ κάτω διεξέπιπτον. </s> <s id="id.000058">νυνὶ δὲ ὅσαι μὲν <lb n="proem,312"></lb>προσκόπτουσιν αὐγαὶ τοῖς τοῦ ὕδατος μορίοις, ὥσπερ <lb n="proem,313"></lb>ἀνακρουόμεναι ἀνακλῶνται πρὸς τὸν ἄνω τόπον· ὅσαι <lb n="proem,314"></lb>δὲ εἰς τὰ κενὰ τοῦ ὕδατος ἐμπίπτουσιν, ὀλίγοις προσ<lb n="proem,315"></lb>πίπτουσαι μορίοις αὗται διεκπίπτουσιν εἰς τὸ τοῦ <lb n="proem,316"></lb>ἀγγείου ἔδαφος. </s> <s id="id.000059">ἔτι δὲ καὶ ταύτῃ φανερόν, ὡς ἐν τῷ <lb n="proem,317"></lb>ὕδατι ὑπάρχει κενά, τῷ τὸν ἐμβαλλόμενον οἶνον εἰς <lb n="proem,318"></lb>τὸ ὕδωρ ὁρᾶσθαι κατὰ χύσιν εἰς πάντα τόπον τοῦ <lb n="proem,319"></lb>ὕδατος χωροῦντα. </s> <s id="id.000060">τοῦτο δὲ οὐκ ἂν ἐγίνετο, μὴ ὄντων <lb n="proem,320"></lb>ἐν τῷ ὕδατι κενῶν. </s> <s id="id.000061">φέρεται δὲ καὶ τὸ φῶς τὸ ἕτερον <lb n="proem,321"></lb>διὰ τοῦ ἑτέρου· ὅταν γάρ τις πλείους ἅψῃ λύχνους, <lb n="proem,322"></lb>ἅπαντα φωτίζεται μᾶλλον, τῶν αὐγῶν πάντῃ φερο<lb n="proem,323"></lb>μένων δι' ἀλλήλων. </s> <s id="id.000062">ἀλλὰ μὴν καὶ διὰ χαλκοῦ καὶ <lb n="proem,324"></lb>σιδήρου καὶ τῶν ἄλλων ἁπάντων διεκπίπτει σωμάτων, <lb n="proem,325"></lb>καθάπερ καὶ τὸ ἐπὶ τῆς νάρκης τῆς θαλασσίας γινό<lb n="proem,326"></lb>μενον. </s> <s id="id.000063">ὅτι δὲ καὶ ἄθρουν κενὸν γίνεται παρὰ φύσιν, <lb n="proem,327"></lb>δέδεικται διά τε τοῦ προσφερομένου τῷ στόματι κούφου <lb n="proem,328"></lb>ἀγγείου καὶ διὰ τοῦ ἰατρικοῦ ᾠοῦ. </s> <s id="id.000064">περὶ μὲν οὖν τῆς <lb n="proem,329"></lb>τοῦ κενοῦ φύσεως καὶ ἄλλων πολλῶν οὐσῶν ἀποδείξεων, <lb n="proem,330"></lb>ἱκανὰς εἶναι καὶ τὰς εἰρημένας νομίζομεν· καὶ γὰρ δι' <lb n="proem,331"></lb>αὐτῶν τῶν αἰσθητῶν τὰς ἀποδείξεις ἐποιησάμεθα. </s> <s id="id.000065">ἐπὶ <pb pagenum="28"></pb><lb n="proem,332"></lb>πάντων τοίνυν ἔστιν εἰπεῖν, ὅτι πᾶν μὲν σῶμα ἐκ <lb n="proem,333"></lb>λεπτομερῶν συνέστηκεν σωμάτων, ὧν μεταξύ ἐστι <lb n="proem,334"></lb>παρεσπαρμένα κενὰ ἐλάττονα τῶν μορίων· διὸ καὶ <lb n="proem,335"></lb>καταχρηστικῶς μηδὲν εἶναι κενὸν [2ἄθρουν]2 λέγομεν, <lb n="proem,336"></lb>βίας τινὸς μὴ παρεισελθούσης, ἀλλὰ πάντα πλήρη εἶναι <lb n="proem,337"></lb>ἤτοι ἀέρος ἢ ὑγροῦ ἢ ἄλλης τινὸς οὐσίας· καθ' ὁπό<lb n="proem,338"></lb>σον δ' ἄν τι τούτων ἐκχωρῇ, κατὰ τοσοῦτον ἕτερον <lb n="proem,339"></lb>ἐπακολουθοῦν τὸν κενούμενον ἀναπληροῖ τόπον· καὶ <lb n="proem,340"></lb>ὅτι κενὸν μὲν ἄθρουν οὐκ ἔστι κατὰ φύσιν βίας τινὸς <lb n="proem,341"></lb>μὴ παρεισελθούσης, καὶ πάλιν ὅτι οὐκ ἔστι ποτὲ τὸ <lb n="proem,342"></lb>παράπαν κενόν, παρὰ φύσιν δὲ γενόμενον. </s> <s id="id.000066">τούτων δὴ <lb n="proem,343"></lb>διασεσαφηνισμένων ἑξῆς τὰ διὰ τῆς συμπλοκῆς τῶν <lb n="proem,344"></lb>εἰρημένων στοιχείων ἐπιτελούμενα θεωρήματα γράψο<lb n="proem,345"></lb>μεν. </s> <s id="id.000067">ἔστι γὰρ δι' αὐτῶν εὑρίσκειν πάνυ ποικίλας καὶ <lb n="proem,346"></lb>θαυμασίας κινήσεις. <lb n="proem,347"></lb></s> </p> </chap> <chap n="1"> <p n="1"> <s id="id.000068">Τούτων δὴ προτεθεωρημένων στοιχείου ἕνεκα γρά<lb n="1,1"></lb>φομεν καὶ περὶ τῶν καμπύλων σιφώνων· εἰς πολλὰ <lb n="1,2"></lb>γὰρ τῶν πνευματικῶν εὔχρηστοι τυγχάνουσιν. <lb n="1,3"></lb></s> <s id="id.000069">Ἔστω γὰρ καμπύλος σίφων, τουτέστι σωλήν, ὁ <lb n="1,4"></lb>ΑΒΓ, οὗ τὸ μὲν ΑΒ σκέλος ἔστω ἐν ἀγγείῳ τῷ ΔΕ <lb n="1,5"></lb>πλήρει ὄντι ὕδατος. </s> <s id="id.000070">ἔστω δὲ ἡ τοῦ ὕδατος ἐπιφάνεια <pb pagenum="30"></pb><lb n="1,6"></lb>κατὰ τὴν εὐθεῖαν, ἐφ' ἧς ἐστιν ἡ ΖΗ, καὶ τὸ τοῦ <lb n="1,7"></lb>καμπύλου σίφωνος σκέλος τὸ ΑΒ πληρωθήσεται ὕδατος <lb n="1,8"></lb>ἄχρι τῆς ΖΗ εὐθείας, τουτέστι τὸ ΑΘ μέρος αὐτοῦ· <lb n="1,9"></lb>τὸ δὲ ΘΒΓ πλῆρες ἔσται ἀέρος. </s> <s id="id.000071">ἐὰν οὖν διὰ τοῦ Γ <lb n="1,10"></lb>στομίου ἐπισπασώμεθα τῷ στόματι τὸν εἰρημένον <lb n="1,11"></lb>ἀέρα, συνεπακολουθήσει καὶ τὸ ὑγρὸν διὰ τὸ μὴ δύ<lb n="1,12"></lb>νασθαι, ὡς προείρηται, κενὸν ἄθρουν ὑπάρξαι τόπον. <lb n="1,13"></lb></s> <s id="id.000072">καὶ εἰ μὲν τὸ Γ στόμιον τοῦ σίφωνος ἐπ' εὐθείας <lb n="1,14"></lb>ἐστὶ τῇ ΖΗ, πληρωθεὶς τοῦ ὕδατος οὐκέτι ῥεύσει ὁ <lb n="1,15"></lb>σίφων, ἀλλὰ μενεῖ πλήρης· ὥστε τὸ ΑΒΓ μέρος αὐτοῦ <lb n="1,16"></lb>πεπληρῶσθαι ὕδατος, καίτοι παρὰ φύσιν οὔσης τῆς <lb n="1,17"></lb>εἰς τὸ ἄνω μέρος αὐτῷ φορᾶς· ἀλλ' ὥσπερ ζυγοῦ <lb n="1,18"></lb>τινος ἰσορρόπησιν ἔχον τὸ ὕδωρ μενεῖ ἄνω τε με<lb n="1,19"></lb>τεωρισθὲν κατὰ τὸ ΘΒ μέρος καὶ κάτω κρεμάμενον <lb n="1,20"></lb>κατὰ τὸ ΒΓ. </s> <s id="id.000073">ἐὰν δὲ τὸ ἐκτὸς στόμιον τοῦ σίφωνος <lb n="1,21"></lb>κατώτερον ᾖ τῆς ΖΗ εὐθείας, ὥσπερ τὸ Κ, ῥέει τὸ <lb n="1,22"></lb>ὕδωρ, ἐπειδήπερ τὸ ἐν τῷ ΚΒ μέρει βαρύτερον ὂν <lb n="1,23"></lb>τοῦ [2ἐν τῷ]2 ΒΘ κατακρατεῖ καὶ ἐπισπᾶται· ἐπὶ τοσοῦ<lb n="1,24"></lb>τον μέντοι ῥέει, ἕως ἂν τὸ Κ στόμιον ἐπ' εὐθείας <lb n="1,25"></lb>γένηται τῇ τοῦ ὕδατος ἐπιφανείᾳ· καὶ πάλιν διὰ τὴν <lb n="1,26"></lb>αὐτὴν αἰτίαν οὐκέτι ῥεύσει. </s> <s id="id.000074">ἐὰν δὲ τὸ ἐκτὸς στόμιον <lb n="1,27"></lb>τοῦ σωλῆνος κατωτέρω ᾖ τοῦ Α, ὥσπερ τὸ Λ, ῥέει, <lb n="1,28"></lb>ἄχρις ἂν ἡ τοῦ ὕδατος ἐπιφάνεια γένηται πρὸς τῷ Α <lb n="1,29"></lb>στομίῳ. </s> <s id="id.000075">ἐὰν οὖν βουλώμεθα πᾶν κενωθῆναι τὸ ἐν τῷ <lb n="1,30"></lb>ἀγγείῳ ὕδωρ, καθήσομεν τὸν σίφωνα, ὥστε τὸ Α στό<lb n="1,31"></lb>μιον ψαύειν τοῦ πυθμένος τοῦ ἀγγείου ἀπέχον τοσοῦτον <lb n="1,32"></lb>ὅσον ὕδατος διάρρυσιν. <lb n="1,33"></lb><pb pagenum="32"></pb></s> </p> <p n="2"> <s id="id.000076">Τὴν μὲν οὖν εἰρημένην ἐπὶ τοῦ σίφωνος αἰτίαν <lb n="2,1"></lb>τινὲς ἀποδεδώκασι λέγοντες, διότι τὸ μεῖζον σκέλος <lb n="2,2"></lb>πλέον ὕδωρ ἔχον ἐπισπᾶται τὸ ἔλαττον. </s> <s id="id.000077">ὅτι δὲ ψευδής <lb n="2,3"></lb>ἐστιν ἡ τοιαύτη αἰτία καὶ ὁ ταύτῃ πιστεύσας μεγάλως <lb n="2,4"></lb>[2ἂν]2 ἀγνοήσειεν ἐπιχειρήσας ἀπὸ ταπεινοῦ ὕδωρ ἀγα<lb n="2,5"></lb>γεῖν, οὕτως ἀποδείξομεν· γεγονέτω γὰρ σίφων ἔχων <lb n="2,6"></lb>τὸ ἐντὸς σκέλος μακρότερόν τε καὶ στενόν, τὸ δὲ ἐκτὸς <lb n="2,7"></lb>εὐρύτερόν τε καὶ ἔλαττον πολλῷ κατὰ μῆκος, ὥστε δέ<lb n="2,8"></lb>χεσθαι πλέον ὕδωρ αὐτὸ τοῦ μακροτέρου σκέλους. </s> <s id="id.000078">καὶ <lb n="2,9"></lb>οὕτως πεπληρώσθω ὕδατος· τὸ δὲ μεῖζον αὐτοῦ σκέλος <lb n="2,10"></lb>ἐμβεβλήσθω εἰς ὕδατος ἀγγεῖον ἢ καὶ εἴς τι φρέαρ. <lb n="2,11"></lb></s> <s id="id.000079">οὐκοῦν ἐὰν ἀφῶμεν ῥεῖν τὸ ἐκτὸς σκέλος, πλέον ὕδωρ <lb n="2,12"></lb>ἔχον τοῦ ἐντὸς ἐπισπάσεται τὸ ἐκ τοῦ μείζονος, ὃ δὴ <lb n="2,13"></lb>καὶ συνεπισπάσεται τὸ ἐν τῷ φρέατι· καὶ ἀρξάμενον <lb n="2,14"></lb>ῥέειν πᾶν κενώσει ἢ ἀεὶ ῥεύσει, ἐπειδήπερ τὸ ἐκτὸς <lb n="2,15"></lb>ὑγρὸν πλεῖόν ἐστι τοῦ ἐν τῷ ἐντὸς σκέλει. </s> <s id="id.000080">ἀλλ' οὐ <lb n="2,16"></lb>φαίνεται τοῦτο γινόμενον· οὐκ ἄρα ἀληθής ἐστιν ἡ <lb n="2,17"></lb>εἰρημένη αἰτία. </s> <s id="id.000081">ἴδωμεν δὴ τὴν κατὰ φύσιν αἰτίαν. <lb n="2,18"></lb></s> <s id="id.000082">ἐπειδὴ γὰρ πᾶν συνεχὲς ὑγρὸν ἠρεμῆσαν σφαιρικὴν <pb pagenum="34"></pb><lb n="2,19"></lb>ἐπιφάνειαν λαμβάνει κέντρον ἔχουσαν τὸ αὐτὸ τῇ γῇ, <lb n="2,20"></lb>μὴ ἠρεμοῦν δὲ ῥέει, ἕως οὗ, ὡς εἴρηται, ἐν μιᾷ ἐπι<lb n="2,21"></lb>φανείᾳ σφαιρικῇ γένηται. </s> <s id="id.000083">ἐὰν ἄρα δύο ἀγγεῖα λαβόντες <lb n="2,22"></lb>ἐμβάλωμεν εἰς ἑκάτερον ὑγρὸν καὶ πληρώσαντες τὸν <lb n="2,23"></lb>σίφωνα καταλαβόμενοί [2τε]2 αὐτοῦ τὰ στόμια τοῖς δα<lb n="2,24"></lb>κτύλοις ἐμ<lb n="2,25"></lb>βάλωμεν τὸ <lb n="2,26"></lb>ἕτερον σκέ<lb n="2,27"></lb>λος αὐτοῦ <lb n="2,28"></lb>ἐν ἑνὶ τῶν <lb n="2,29"></lb>ἀγγείων βα<lb n="2,30"></lb>πτιζόμενον <lb n="2,31"></lb>εἰς τὸ ὕδωρ, <lb n="2,32"></lb>τὸ δὲ λοιπὸν <lb n="2,33"></lb>ἐν τῷ ἑτέρῳ <lb n="2,34"></lb>ἀγγείῳ, γί<lb n="2,35"></lb>νεται συνε<lb n="2,36"></lb>χὲς τὸ πᾶν <lb n="2,37"></lb>ὕδωρ· ἑκά<lb n="2,38"></lb>τερον γὰρ τῶν ἐν τοῖς ἀγγείοις ὑγρῶν συνάπτει τῷ ἐν <lb n="2,39"></lb>τῷ σίφωνι ὑγρῷ, ὥστε πᾶν ἐγένετο συνεχές. </s> <s id="id.000084">εἰ μὲν <lb n="2,40"></lb>οὖν αἱ πρότερον ἐν τοῖς ἀγγείοις τῶν ὑγρῶν ἐπι<lb n="2,41"></lb>φάνειαι ἐν μιᾷ ἦσαν ἐπιφανείᾳ, ἠρεμήσει καὶ οὕτως <lb n="2,42"></lb>ἑκατέρα αὐτῶν τοῦ σίφωνος ἐμβληθέντος· εἰ δὲ οὔ, <lb n="2,43"></lb>ἐπεὶ συνεχὲς ἐγένετο τὸ ὕδωρ, ἀνάγκη πᾶσα ῥεῖν αὐτὸ <lb n="2,44"></lb>ἐπὶ τὸ ταπεινότερον διὰ τὴν συνέχειαν, ἕως οὗ ἤτοι <lb n="2,45"></lb>ἐν μιᾷ γένηται ἐπιφανείᾳ τὸ ἐν τοῖς ἀγγείοις πᾶν <lb n="2,46"></lb>ὕδωρ ἢ τὸ ἕτερον τῶν ἀγγείων κενωθῇ. </s> <s id="id.000085">γεγονέτω οὖν, <lb n="2,47"></lb>ὡς εἴρηται, ἐν μιᾷ ἐπιφανείᾳ τὰ ἐν τοῖς ἀγγείοις <lb n="2,48"></lb>ὑγρά· ἠρεμήσει ἄρα, ὥστε καὶ τὸ ἐν τῷ σίφωνι συνηρε<lb n="2,49"></lb>μήσει αὐτοῖς· ἐὰν ἄρα νοήσῃ τις ἀποτετμημένον τὸν <pb pagenum="36"></pb><lb n="2,50"></lb>σίφωνα κατὰ τὰς ἐν τοῖς ἀγγείοις τῶν ὑγρῶν ἐπι<lb n="2,51"></lb>φανείας, καὶ οὕτως ἠρεμήσει τὸ ὑγρὸν τὸ ἐν τῷ σίφωνι· <lb n="2,52"></lb>καὶ μετεωρισθέντος ἄρα αὐτοῦ καὶ ἐπὶ μηδέτερον <lb n="2,53"></lb>μέρος ἐγκλινομένου, πάλιν ἠρεμήσει τὸ ὑγρόν, ἐάν τε <lb n="2,54"></lb>διόλου ἴσον ἔχῃ τὸ εὖρος ἐάν τε τὸ ἕτερον σκέλος <lb n="2,55"></lb>τοῦ ἑτέρου πολλῷ μεῖζον ᾖ· οὐ γὰρ παρά γε τοῦτο ἡ <lb n="2,56"></lb>αἰτία ἐγίνετο τοῦ ἠρεμεῖν τὸ ὑγρόν, ἀλλὰ παρὰ τὸ <lb n="2,57"></lb>ἐξ ἴσου κεῖσθαι τὰ στόμια αὐτοῦ. </s> <s id="id.000086">πῶς οὖν μετεωρι<lb n="2,58"></lb>σθέντος αὐτοῦ οὐ καταφέρεται τὸ ὑγρὸν τῷ ἰδίῳ βάρει <lb n="2,59"></lb>ὑποκείμενον ἔχον κουφότερον ἀέρα; ὅτι κενὸς ἄθρους <lb n="2,60"></lb>οὐ δύναται ὑπάρξαι τόπος· εἰ γὰρ μέλλει καταφέρε<lb n="2,61"></lb>σθαι, πρότερον πληρωθῆναι δεῖ τὸν ἀνώτερον τοῦ <lb n="2,62"></lb>σίφωνος τόπον, εἰς ὃν ἀὴρ παρεισελθεῖν οὐδαμῶς δυ<lb n="2,63"></lb>νατός ἐστιν. </s> <s id="id.000087">ἐὰν οὖν τρυπήσῃ τις τὸν ἀνώτερον τόπον <lb n="2,64"></lb>τοῦ σίφωνος, εὐθέως καταρραγήσεται τὸ ὑγρὸν τοῦ <lb n="2,65"></lb>ἀέρος ἔχοντος παρείσδυσιν. </s> <s id="id.000088">πρὸ δὲ τοῦ τρυπηθῆναι <lb n="2,66"></lb>ἐπικείμενον τὸ ἐν τῷ σίφωνι ὑγρὸν τῷ ὑποκειμένῳ <lb n="2,67"></lb>ἀέρι ἐκθλίβει αὐτόν· οὗτος δὲ μὴ ἔχων, ὅπῃ χωρήσει, <lb n="2,68"></lb>οὐκ ἐᾷ παρεξελθεῖν τὸ ὑγρόν. </s> <s id="id.000089">ὅτε δὲ διὰ τοῦ τρυπή<lb n="2,69"></lb>ματος τόπον ἔσχεν ὁ ἀήρ, ὅπῃ χωρήσει, τότε μὴ ἀντέ<lb n="2,70"></lb>χων τὸ τοῦ ὕδατος βάρος ἐξεχώρησε. </s> <s id="id.000090">διὰ δὲ τὴν αὐτὴν <lb n="2,71"></lb>αἰτίαν καὶ τῷ σίφωνι τὸν οἶνον παρὰ φύσιν εἰς τὸ <lb n="2,72"></lb>ἄνω ἐπισπώμεθα τῷ στόματι· δεξάμενοι γὰρ ἐν ἑαυτοῖς <pb pagenum="38"></pb><lb n="2,73"></lb>τὸν ἐν τῷ σίφωνι ἀέρα πληρέστεροι ἢ πρότερον γινό<lb n="2,74"></lb>μεθα καὶ θλίβομεν τὸν συνημμένον [ἐν] ἑαυτοῖς ἀέρα, <lb n="2,75"></lb>οὗτος δὲ τὸν ἐξ ἀρχῆς, ἄχρις ἂν πρὸς τῇ ἐπιφανείᾳ <lb n="2,76"></lb>τοῦ οἴνου ἡ κένωσις γένηται. </s> <s id="id.000091">καὶ τότε ὁ οἶνος θλιβό<lb n="2,77"></lb>μενος εἰς τὸν κενούμενον τοῦ σίφωνος τόπον χωρήσει· <lb n="2,78"></lb>ἄλλος γὰρ τόπος οὐκ ἔστιν ὅπῃ θλιβόμενος χωρήσει· <lb n="2,79"></lb>διὰ ταύτην δὲ τὴν αἰτίαν καὶ παρὰ φύσιν αὐτῷ γί<lb n="2,80"></lb>νεται εἰς τὸ ἄνω μέρος ἡ φορά. </s> <s id="id.000092">καὶ ἄλλως δὲ <gap></gap> ἠρε<lb n="2,81"></lb>μήσει τὸ ὑγρὸν ἐν τῷ σίφωνι, ὅταν ἐν μιᾷ ᾖ σφαι<lb n="2,82"></lb>ρικῇ ἐπιφανείᾳ κέντρον ἐχούσῃ τὸ αὐτὸ τῇ γῇ· ἐπει<lb n="2,83"></lb>δήπερ ἐὰν ὑγροῦ τινος ἡ ἐπιφάνεια σφαιρικὴ ᾖ κέντρον <lb n="2,84"></lb>ἔχουσα τὸ αὐτὸ τῇ γῇ, ἠρεμεῖ· εἰ γὰρ δυνατόν, μὴ <lb n="2,85"></lb>ἠρεμείτω· κινηθεῖσα ἄρα ἠρεμήσει· ἠρεμείτω οὖν. </s> <s id="id.000093">αὕτη <lb n="2,86"></lb>ἄρα ἔσται σφαιρικὴ ἐπιφάνεια κέντρον ἔχουσα τὸ αὐτὸ <lb n="2,87"></lb>τῇ γῇ, καὶ τέμνει τὴν προτέραν ἐπιφάνειαν· τὸ γὰρ <lb n="2,88"></lb>αὐτὸ ὑγρὸν ἀπὸ κοινοῦ τινος ἕτερον καὶ ἕτερον ἐπέσχε <lb n="2,89"></lb>τόπον. </s> <s id="id.000094">ἀμφότεραι οὖν τετμήσθωσαν διὰ τοῦ κέντρου <lb n="2,90"></lb>τῆς γῆς ἐπιπέδῳ τινὶ καὶ ποιείτωσαν γραμμὰς ἐν ταῖς <lb n="2,91"></lb>ἐπιφανείαις κύκλων περιφερείας τὸ αὐτὸ κέντρον ἐχού<lb n="2,92"></lb>σας τῇ γῇ· ποιείτωσαν τὰς ΑΒΓ, ΖΒΔ· καὶ διήχθω <lb n="2,93"></lb>ἡ ΒΗ· ἴση ἄρα ἡ ΒΗ ἑκατέρᾳ τῶν ΗΖ, ΗΑ, ὅπερ <lb n="2,94"></lb>ἄτοπον· ἠρεμήσει ἄρα. <lb n="2,95"></lb><pb pagenum="40"></pb></s> </p> <p n="3"> <s id="id.000095">Ἔστι δὲ καὶ ἄλλος καλούμενος μέσος πνικτὸς <lb n="3,1"></lb>διαβήτης τὴν αὐτὴν ἐνέργειαν ἔχων τῷ καμπύλῳ <lb n="3,2"></lb>σίφωνι. <lb n="3,3"></lb></s> <s id="id.000096">Ἔστω γὰρ ἀγγεῖον ὁμοίως πλῆρες ὕδατος τὸ ΑΒ· <lb n="3,4"></lb>διὰ δὲ τοῦ πυθμένος αὐτοῦ διώσθω σωλὴν ὁ ΓΔ <lb n="3,5"></lb>συνεστεγνωμένος τῷ πυθμένι καὶ ὑπερέχων εἰς τὸ <lb n="3,6"></lb>κάτω μέρος· τὸ δὲ Γ στόμιον αὐτοῦ μὴ συνεγγιζέτω τῷ <lb n="3,7"></lb>στόματι τοῦ ΑΒ ἀγγείου. </s> <s id="id.000097">ἕτερος δὲ σωλὴν περικείσθω <lb n="3,8"></lb>τῷ ΓΔ ὁ ΕΖ ἀπέχων ἀπ' αὐτοῦ πάντοθεν τὸ ἴσον· <lb n="3,9"></lb>καὶ τὸ μὲν ἄνω στόμιον αὐτοῦ ἐπιπεφράχθω λεπιδίῳ <lb n="3,10"></lb>τῷ ΕΗ ἀπέχοντι ἀπὸ τοῦ Γ στομίου βραχύ· τὸ δὲ <lb n="3,11"></lb>κάτω στόμιον τοῦ ΕΖ σωλῆνος ἀπεχέτω ἀπὸ τοῦ <lb n="3,12"></lb>πυθμένος τοῦ ΑΒ ἀγγείου ὅσον ὕδατι διάρρυσιν. <lb n="3,13"></lb></s> <s id="id.000098">τούτων δὲ οὕτως ἐχόντων ἐὰν ἐπισπασώμεθα ὁμοίως <lb n="3,14"></lb>διὰ τοῦ Δ στομίου τὸν ἐν τῷ ΓΔ σωλῆνι ἀέρα, <lb n="3,15"></lb>συνεπισπασόμεθα καὶ τὸ ἐν τῷ ΑΒ ἀγγείῳ ὕδωρ, <lb n="3,16"></lb>ὥστε ἐκρεῖν. </s> <s id="id.000099">καὶ τότε πᾶν ῥεύσεται τὸ ἐν τῷ ΑΒ ἀγ<pb pagenum="42"></pb><lb n="3,17"></lb>γείῳ ὕδωρ διὰ τῆς ἐκτὸς τοῦ σίφωνος ὑπεροχῆς· ὁ <lb n="3,18"></lb>γὰρ ἀὴρ ὁ μεταξὺ τῆς ἐπιφανείας τοῦ ὑγροῦ καὶ τοῦ <lb n="3,19"></lb>ΕΖ ὀλίγος ὢν δύναται χωρῆσαι εἰς τὸν ΓΔ σωλῆνα <lb n="3,20"></lb>καὶ συνεπισπάσασθαι τὸ ὑγρόν· οὐ στήσεται δὲ ἡ <lb n="3,21"></lb>ῥύσις διὰ τὴν ἐκτὸς ὑπεροχὴν [1μὴ γὰρ ὄντος τοῦ ΕΖ <lb n="3,22"></lb>παύσεται ῥέον, ὅταν ἡ ἐπιφάνεια τοῦ ὑγροῦ κατὰ τὸ <lb n="3,23"></lb>Γ γένηται, τῆς ὑπεροχῆς μενούσησ]1, ἀλλὰ τῷ μὴ <lb n="3,24"></lb>ἀντεισκρίνεσθαι ἀέρα, τοῦ ΕΖ ὅλου καθ' ὕδατος ὄντος· <lb n="3,25"></lb>ὁ γὰρ εἰσκρινόμενος ἀὴρ χωρήσει εἰς τὸ ΑΒ ἀγγεῖον <lb n="3,26"></lb>ἀντὶ τοῦ ἐπεξιόντος ὕδατος· πᾶν γὰρ τὸ ἐκτὸς στόμιον <lb n="3,27"></lb>τοῦ σωλῆνος πρὸς τὸ ὕδωρ ἀεὶ ταπεινότερόν ἐστι τῆς <lb n="3,28"></lb>ἐν τῷ ἀγγείῳ τοῦ ὕδατος ἐπιφανείας. </s> <s id="id.000100">μηδέποτε δὲ <lb n="3,29"></lb>δυναμένης μιᾶς ἐπιφανείας γενέσθαι, πᾶν ἐκκρίνει <lb n="3,30"></lb>τὸ ὕδωρ, καὶ τῷ μείζονι βάρει ἡ ἕλξις γίνεται. </s> <s id="id.000101">ἐὰν <lb n="3,31"></lb>οὖν μὴ βουλώμεθα τῷ στόματι ἐπισπᾶσθαι τὸν ἐν τῷ <lb n="3,32"></lb>ΓΔ σωλῆνι ἀέρα, προσεπιχέομεν εἰς τὸ ΑΒ ἀγγεῖον <lb n="3,33"></lb>ὕδωρ, ἄχρις ἂν ὑπερχυθὲν διὰ τοῦ ΓΔ σωλῆνος τὴν <lb n="3,34"></lb>ἀρχὴν τῆς ῥεύσεως λάβῃ. </s> <s id="id.000102">καὶ οὕτως πάλιν πᾶν <lb n="3,35"></lb>κενωθήσεται τὸ ἐν τῷ ΑΒ ἀγγείῳ ὕδωρ. </s> <s id="id.000103">καλεῖται δέ, <lb n="3,36"></lb>ὡς εἴρηται, ὁ ΓΔΕΖ πνικτὸς σίφων ἢ πνικτὸς δια<lb n="3,37"></lb>βήτης. <lb n="3,38"></lb></s> </p> <p n="4"> <s id="id.000104">Ἐκ δὴ τῶν προδεδειγμένων φανερὸν ὅτι ἡ γινο<lb n="4,1"></lb>μένη διὰ τοῦ σίφωνος ῥύσις ἀκινήτου διαμένοντος <pb pagenum="44"></pb><lb n="4,2"></lb>ἀνώμαλος γίνεται· τὸ γὰρ αὐτὸ πάσχει τετρυπημένου <lb n="4,3"></lb>ἀγγείου παρὰ τὸν πυθμένα καὶ ῥέοντος· καὶ ἐνταῦθα <lb n="4,4"></lb>γὰρ ἡ ῥύσις ἀνώμαλος τῷ ἐν ἀρχῇ μὲν τῆς ῥύσεως <lb n="4,5"></lb>πλείονι βάρει θλίβεσθαι τὴν τοῦ ὕδατος ἔκρυσιν, <lb n="4,6"></lb>κενουμένου δὲ ἐλάττονι· καὶ ὅσῳ δ' ἂν ἡ ἐκτὸς τοῦ <lb n="4,7"></lb>σίφωνος ὑπεροχὴ μείζων ὑπάρχῃ, ταχυτέρα ἡ ῥύσις <lb n="4,8"></lb>γίνεται· πάλιν γὰρ ἡ διὰ τοῦ στομίου αὐτοῦ ἔκρυσις <lb n="4,9"></lb>πλείονι βάρει θλίβεται ἢ ὅταν ἐλάττων ᾖ ἡ ἐκτὸς <lb n="4,10"></lb>ὑπεροχή, ᾗ ὑπερέχει ἡ τοῦ ἐν τῷ ἀγγείῳ ὕδατος ἐπι<lb n="4,11"></lb>φάνεια τοῦ ἐκτὸς στομίου τοῦ σίφωνος. </s> <s id="id.000105">ἡ μὲν οὖν διὰ <lb n="4,12"></lb>τοῦ σίφωνος ἀεὶ ἀνώμαλος ῥύσις εἴρηται· δέον δέ ἐστι <lb n="4,13"></lb>ῥύσιν εὑρεῖν διὰ τοῦ σίφωνος ἀεὶ ὁμαλήν. <lb n="4,14"></lb></s> <s id="id.000106">Ἔστω τι ἀγγεῖον ὕδωρ ἔχον τὸ ΑΒ, ἐν ᾧ ἐπινη<lb n="4,15"></lb>χέσθω λεβητάριον τὸ ΓΔ ἐπιπεφραγμένον τὸ στόμα <lb n="4,16"></lb>τῷ ΓΔ ἐπιφράγματι· διὰ δὲ τοῦ ἐπιφράγματος καὶ <lb n="4,17"></lb>τοῦ πυθμένος τοῦ λεβηταρίου διώσθω τοῦ σίφωνος <lb n="4,18"></lb>τὸ ἓν σκέλος καὶ συνεστεγνώσθω τοῖς τρυπήμασι <lb n="4,19"></lb>κασσιτέρῳ· τὸ δὲ ἕτερον σκέλος ἐκτὸς ἔστω τοῦ ΑΒ <lb n="4,20"></lb>ἀγγείου ἔχον τὸ στόμιον ταπεινότερον τῆς τοῦ ἐν τῷ <pb pagenum="46"></pb><lb n="4,21"></lb>ΑΒ ἀγγείῳ ὕδατος ἐπιφανείας. </s> <s id="id.000107">ἐὰν οὖν διὰ τοῦ ἐκτὸς <lb n="4,22"></lb>στομίου τοῦ σίφωνος ἐπισπασώμεθα τὸν ἐν τῷ σίφωνι <lb n="4,23"></lb>ὄντα ἀέρα, συνακολουθήσει τὸ ὑγρὸν διὰ τὸ μὴ δύ<lb n="4,24"></lb>νασθαι κενὸν ἄθρουν τόπον ἐν τῷ σίφωνι γενέσθαι. <lb n="4,25"></lb></s> <s id="id.000108">ἀρχὴν δὲ λαβὼν ὁ σίφων τῆς ῥύσεως ῥέει, ἄχρις ἂν <lb n="4,26"></lb>πᾶν κενώσῃ τὸ ἐν τῷ ἀγγείῳ ὕδωρ· καὶ ἔσται ἡ ῥύσις <lb n="4,27"></lb>ὁμαλὴ τῷ τὴν ἐκτὸς ὑπεροχὴν τοῦ σίφωνος, ἣν ὑπερ<lb n="4,28"></lb>έχει εἰς τὸ κάτω μέρος τῆς τοῦ ὕδατος ἐπιφανείας, <lb n="4,29"></lb>ἀεὶ τὴν αὐτὴν γίνεσθαι, ἐπειδήπερ τῇ τοῦ ἀγγείου <lb n="4,30"></lb>κενώσει συγκαταβαίνει καὶ ὁ λέβης σὺν τῷ σίφωνι. <lb n="4,31"></lb></s> <s id="id.000109">ὅσῳ δ' ἂν ἡ ἐκτὸς ὑπεροχὴ μείζων ᾖ, τοσούτῳ ὀξυτέρα <lb n="4,32"></lb>τῆς πρότερον ἡ ῥύσις ἔσται, ὁμαλὴ δὲ καθ' ἑαυτήν. <lb n="4,33"></lb></s> <s id="id.000110">ἔστω δὲ ὁ εἰρημένος σίφων ὁ ΕΖΗ, ἡ δὲ τοῦ ὕδατος <lb n="4,34"></lb>ἐπιφάνεια κατὰ τὴν ΘΚ εὐθεῖαν. <lb n="4,35"></lb></s> </p> <p n="5"> <s id="id.000111">Ἡ δὲ κατὰ μέν τι ὁμαλή, κατὰ δέ τι ἀνώμαλος <lb n="5,1"></lb>γίνεται οὕτως διὰ τοῦ σίφωνος· καλῶ δὲ κατὰ μέν τι <lb n="5,2"></lb>ὁμαλήν, κατὰ δέ τι ἀνώμαλον, ὅταν ἐπί τινα χρόνον <lb n="5,3"></lb>βουλομένοις ὁμαλὴ ᾖ ἡ γινομένη ἐξ ἀρχῆς ῥύσις, ἐπὶ <lb n="5,4"></lb>δὲ ἕτερον πάλιν χρόνον προαιρουμένοις ὁμαλὴ μὲν ᾖ <lb n="5,5"></lb>καθ' ἑαυτὴν ἡ γινομένη ῥύσις, τῆς δὲ πρότερον ἤτοι <lb n="5,6"></lb>βραδυτέρα ἢ ταχυτέρα. <lb n="5,7"></lb></s> <s id="id.000112">Ἔστω γὰρ πάλιν τὸ μὲν τοῦ ὕδατος ἀγγεῖον τὸ <pb pagenum="48"></pb><lb n="5,8"></lb>ΑΒ, λέβης δὲ ὁ ΓΔ· διὰ δὲ τοῦ ἐπιφράγματος καὶ <lb n="5,9"></lb>τοῦ πυθμένος τοῦ λέβητος διώσθω σωλὴν εὐρύτερος <lb n="5,10"></lb>τοῦ ἐντὸς σκέλους <lb n="5,11"></lb>τοῦ σίφωνος· καὶ <lb n="5,12"></lb>ἔστω σίφων οὗτος <lb n="5,13"></lb>ὁ ΜΛ συνεστεγνω<lb n="5,14"></lb>μένος τῷ τε ἐπι<lb n="5,15"></lb>φράγματι καὶ τῷ <lb n="5,16"></lb>πυθμένι τοῦ λέβη<lb n="5,17"></lb>τος. </s> <s id="id.000113">ἐπὶ δὲ τοῦ ἐπι<lb n="5,18"></lb>φράγματος ἐφεστά<lb n="5,19"></lb>τω πηγμάτιον ἐκ <lb n="5,20"></lb>κανονίων πεπηγὸς <lb n="5,21"></lb>καθάπερ τὸ Π γράμ<lb n="5,22"></lb>μα· καὶ ἔστω τὸ <lb n="5,23"></lb>ΓΝΞΔ. </s> <s id="id.000114">ἐν δὲ τοῖς <lb n="5,24"></lb>ὀρθοῖς κανονίοις <lb n="5,25"></lb>τοῖς ΓΝ, ΞΔ ἐκ τοῦ <lb n="5,26"></lb>ἐντὸς μέρους ἐγ<lb n="5,27"></lb>γεγλύφθωσαν σω<lb n="5,28"></lb>λῆνες κατὰ τὸ μῆκος <lb n="5,29"></lb>τῶν κανονίων, ἐν <pb pagenum="50"></pb><lb n="5,30"></lb>οἷς διατρεχέτω ἕτερον κανόνιον τὸ ΟΠ εὐλύτως. </s> <s id="id.000115">ἔστω <lb n="5,31"></lb>δὲ καὶ κοχλίας ὁ ΡΣ ὀρθῶς βεβηκὼς ἐπὶ τοῦ ΓΔ ἐπι<lb n="5,32"></lb>φράγματος καὶ διὰ τρήματος διεληλυθὼς μένοντος ἐν <lb n="5,33"></lb>τῷ ΟΠ κανόνι. </s> <s id="id.000116">ἔστω δὲ καὶ τύλος τις συμφυὴς τῷ <lb n="5,34"></lb>ΟΠ κανονίῳ, ὥστε παρεμβαίνειν εἰς τὴν τοῦ κοχλίου <lb n="5,35"></lb>ἕλικα. </s> <s id="id.000117">ὑπερεχέτω δὲ ὁ κοχλίας ὑπὲρ τὸ ΝΞ κανόνιον· <lb n="5,36"></lb>τῇ δὲ ὑπεροχῇ συμφυὴς ἔστω χειρολαβίς, δι' ἧς ἐπι<lb n="5,37"></lb>στρέφομεν τὸν κοχλίαν, ὥστε τὸ ΟΠ κανόνιον ὁτὲ μὲν <lb n="5,38"></lb>μετέωρον γίνεσθαι, ὁτὲ δὲ ταπεινοῦσθαι. </s> <s id="id.000118">τῷ δὲ ΟΠ <lb n="5,39"></lb>κανονίῳ συμφυὲς γεγονέτω τὸ ἐντὸς σκέλος τοῦ σίφωνος <lb n="5,40"></lb>διεληλυθὸς καὶ διὰ τοῦ ΛΜ σωλῆνος, ὥστε τὸ στό<lb n="5,41"></lb>μιον αὐτοῦ βαπτίζεσθαι εἰς τὸ ἐν τῷ ἀγγείῳ ὕδωρ. <lb n="5,42"></lb></s> <s id="id.000119">καὶ ἐὰν οὖν πάλιν ἐπισπασώμεθα διὰ τοῦ ἐκτὸς στο<pb pagenum="52"></pb><lb n="5,43"></lb>μίου τὸ ὑγρόν, ῥεύσει ὁ σίφων ὁμαλῶς, ἕως ἂν πᾶν <lb n="5,44"></lb>κενωθῇ τὸ ἐν αὐτῷ ὑγρόν· ὅταν δὲ βουλώμεθα δι' <lb n="5,45"></lb>αὐτοῦ ἑτέραν ῥύσιν γίνεσθαι τῆς μὲν προειρημένης <lb n="5,46"></lb>ταχυτέραν, ὁμαλὴν δὲ καθ' αὑτήν, ἐπιστρέψομεν τὸν <lb n="5,47"></lb>κοχλίαν, ὥστε τὸ ΟΠ κανόνιον ταπεινότερον γενέσθαι· <lb n="5,48"></lb>ἔσται γὰρ ἡ ἐκτὸς ὑπεροχὴ τοῦ σίφωνος μείζων τῆς <lb n="5,49"></lb>πρότερον. </s> <s id="id.000120">καὶ διὰ τοῦτ' ἔστιν ἡ ῥύσις ὁμαλὴ μὲν καθ' <lb n="5,50"></lb>αὑτήν, τῆς δὲ πρότερον ταχυτέρα. </s> <s id="id.000121">ἐὰν δὲ ἔτι πάλιν <lb n="5,51"></lb>ταχυτέραν <gap></gap>, ἐπιστρέψομεν τὸν κοχλίαν εἰς τὸ ἔτι <lb n="5,52"></lb>ταπεινότερον γενέσθαι τὸ ΟΠ κανόνιον· ἐὰν δὲ βραδυ<lb n="5,53"></lb>τέραν βουλώμεθα, <gap></gap> τὸ ΟΠ κανόνιον μετέωρον γε<lb n="5,54"></lb>νέσθαι· καὶ οὕτως διὰ σίφωνος ἔσται ἡ ῥύσις ἡ κατὰ <lb n="5,55"></lb>μέν τι ὁμαλή, κατὰ δέ τι ἀνώμαλος. <lb n="5,56"></lb></s> <s id="id.000122">Ἵνα δὲ μὴ καὶ διὰ τοῦ στόματος αὑτῶν ἐπισπα<lb n="5,57"></lb>σώμεθα τὸ ὕδωρ̄οὐδὲ γὰρ ἐπὶ πάντων τῶν σιφώ<lb n="5,58"></lb>νων τοῦτο δυνατὸν ἔσται, ἐὰν μὴ πάνυ μικροὶ ὦσῑ, <lb n="5,59"></lb>ποιήσομεν οὕτως. <lb n="5,60"></lb><pb pagenum="54"></pb></s> </p> <p n="6"> <s id="id.000123">Ἔστω σμηρισμάτιόν τι, οὗ τὸ μὲν ἄρρεν προσ<lb n="6,1"></lb>κείσθω τῷ ἐκτὸς σκέλει τοῦ σίφωνος, ὥστε δι' αὐτοῦ <lb n="6,2"></lb>ῥεῖν· καὶ ἔστω τὸ ΤΝ, τὸ δὲ θῆλυ τὸ ΥΦ πρότερον <lb n="6,3"></lb>προσκεκολλημένα ἀγγειδίῳ τινὶ τῷ ΧΨ χωροῦντι <lb n="6,4"></lb>ὀλίγῳ τινὶ πλέον οὗ χωρεῖ ὁ σίφων ὕδατος· ἐχέτω δὲ <lb n="6,5"></lb>καὶ πρὸς τῷ πυθμένι ἔκρυσιν τὴν Ω. </s> <s id="id.000124">ὅταν οὖν βουλώ<lb n="6,6"></lb>μεθα [2ἐπισπᾶσθαι]2 διὰ τοῦ σίφωνος τὸ ἐν τῷ ΑΒ ἀγ<lb n="6,7"></lb>γείῳ ὕδωρ, ἀπολαβόμενοι τοῦ ΧΨ ἀγγείου τὴν ἔκρυ<lb n="6,8"></lb>σιν τῷ δακτύλῳ πληρώσομεν αὐτὸ ὕδατος. </s> <s id="id.000125">εἶτα προσ<lb n="6,9"></lb>θήσομεν τὸ θῆλυ σμήρισμα τῷ ἄρρενι καὶ ἀφήσομεν <lb n="6,10"></lb>τὴν Ω ἔκρυσιν. </s> <s id="id.000126">κενουμένου δὲ τοῦ ΧΨ ἀγγείου, εἰς <lb n="6,11"></lb>τὸν κενούμενον τόπον χωρήσει ὁ ἐν τῷ σίφωνι ἀήρ, <lb n="6,12"></lb>ᾧ συνακολουθήσει τὸ ἐν τῷ ΑΒ ἀγγείῳ ὑγρόν, ὥστε <lb n="6,13"></lb>πληρῶσαι τὸν σίφωνα. </s> <s id="id.000127">μετὰ ταῦτα οὖν ἀφελόντες τὸ <lb n="6,14"></lb>ΧΨ ἀγγεῖον ἐῶμεν τὸν σίφωνα ῥεῖν. <lb n="6,15"></lb><pb pagenum="56"></pb></s> <s id="id.000128">Δεῖ δὲ ὀρθὸν τὸν σίφωνα καταβαίνειν, εἰ μέλλοι <lb n="6,16"></lb>τὸ δέον ποιεῖν· τοῦτο δὲ ἔσται, ἐὰν πρὸς τῷ χείλει <lb n="6,17"></lb>τοῦ ΑΒ ἀγγείου δύο ὀρθοὺς κανόνας πήξαντες τὸ <lb n="6,18"></lb>ἐντὸς σκέλος τοῦ σίφωνος μεταξὺ τούτων τάξωμεν <lb n="6,19"></lb>ψαῦον ἑκατέρου αὐτῶν τῶν κανονίων καὶ ἐν τῷ ἐντὸς <lb n="6,20"></lb>σκέλει τοῦ σίφωνος τυλίον ἐξ ἑκατέρου μέρους συμ<lb n="6,21"></lb>φυὲς ποιήσωμεν ψαῦον ἐντὸς τῶν κανονίων· οὕτως <lb n="6,22"></lb>γὰρ οὔτε ἐπὶ τὰ πλάγια οὔτε ἐπὶ τὸ ἔμπροσθεν ὁ <lb n="6,23"></lb>σίφων ἔγκλισιν σχήσει· ὀρθῶς δὲ ἀκριβῶς καταβήσεται <lb n="6,24"></lb>προστριβόντων τῶν τυλίων τοὺς κανόνας. <lb n="6,25"></lb></s> </p> <p n="7"> <s id="id.000129">Τῶν δὲ εἰς ἐνέργειαν κατασκευαζομένων νῦν ἀρξώ<lb n="7,1"></lb>μεθα κατασκευὰς ποιεῖσθαι ἀπὸ τῶν μικροτέρων ἀρξά<lb n="7,2"></lb>μενοι στοιχείου χάριν. <lb n="7,3"></lb></s> <s id="id.000130">Ἔστι γάρ τι κατασκευασμάτιον πρὸς τὸ οἰνοχοεῖν <lb n="7,4"></lb>χρήσιμον· κατασκευάζεται γὰρ σφαιρίον κοῖλον χάλκεον, <lb n="7,5"></lb>οἷόν ἐστι τὸ ΑΒ, ἐκ μὲν τοῦ κάτω μέρους τετρυπη<lb n="7,6"></lb>μένον λεπτοῖς τρυπηματίοις συνεχέσι καθάπερ ἠθμός, <lb n="7,7"></lb>ἐκ δὲ τοῦ ἄνω μέρους σωλῆνα ἔχον τὸν ΓΔ συντετρη<lb n="7,8"></lb>μένον αὐτῷ καὶ συνεστεγνωμένον καὶ ἔχοντα τὸ ἄνω <lb n="7,9"></lb>στόμιον ἀνεῳγός. </s> <s id="id.000131">ὅταν οὖν βούληταί τις οἰνοχοεῖν, <lb n="7,10"></lb>κατασχὼν τῇ μιᾷ χειρὶ τὸν ΓΔ σωλῆνα παρὰ τὸ Γ <lb n="7,11"></lb>στόμιον καθίησι τὸ σφαιρίον εἰς τὸν οἶνον, ἄχρις ἂν <pb pagenum="58"></pb><lb n="7,12"></lb>ὅλον κρυφθῇ τὸ σφαιρίον· καὶ ὁ μὲν οἶνος διὰ τοῦ <lb n="7,13"></lb>ἠθμοῦ εἰσέρχεται, ὁ δ' ἐντὸς ἀὴρ ἐκκρούεται καὶ ἐκ<lb n="7,14"></lb>χωρεῖ διὰ τοῦ ΓΔ σωλῆνος. </s> <s id="id.000132">ὅταν οὖν τῷ μεγάλῳ <lb n="7,15"></lb>δακτύλῳ τις πιέσας τὸ Γ στόμιον τοῦ σωλῆνος ἐξάρῃ <lb n="7,16"></lb>τὸ σφαιρίον ἐκ τοῦ οἴνου, οὐ μὴ ῥυήσεται ὁ ἐν τῷ <lb n="7,17"></lb>σφαιρίῳ οἶνος διὰ τὸ μὴ δύνασθαι εἰς τὸν [2τοῦ]2 <lb n="7,18"></lb>κενοῦ τόπον ἀέρα παρεισκριθῆναι· ἡ γὰρ εἴσκρισις διὰ <lb n="7,19"></lb>τοῦ Γ στομίου ὑπάρχει, ἥτις ἐπιπέφρακται τῷ δακτύλῳ. <lb n="7,20"></lb></s> <s id="id.000133">ὅταν οὖν βουλώμεθα προέσθαι τὸν οἶνον, ἀνίεμεν τὸν <lb n="7,21"></lb>δάκτυλον, ὁ δὲ ἀὴρ ἐμπίπτων πληροῖ τὸν κενούμενον <lb n="7,22"></lb>τόπον· ἐὰν δὲ πάλιν πιέσωμεν τῷ δακτύλῳ τὴν Γ <lb n="7,23"></lb>ἀναπνοήν, οὐκ ἐκρυήσεται, ἄχρι ἂν πάλιν ἀνέσωμεν <lb n="7,24"></lb>τῷ δακτύλῳ τὴν Γ ἀναπνοήν. </s> <s id="id.000134">ἔξεστι δὲ καὶ εἰς θερ<lb n="7,25"></lb>μὸν ὕδωρ ἢ ψυχρὸν βάπτοντα πάλιν συνέχειν, εἶτα <lb n="7,26"></lb>προί̈εσθαι, ὅσον ἐὰν προαιρώμεθα, ἄχρις ἂν πᾶν τὸ <lb n="7,27"></lb>ἐν τῷ σφαιρίῳ κενωθῇ· κἂν ἐπικαμπὲς δὲ γένηται τὸ <pb pagenum="60"></pb><lb n="7,28"></lb>ἄκρον τοῦ ΓΔ σωλῆνος τὸ πρὸς τῷ Γ, οὐδὲν διοίσει· <lb n="7,29"></lb>εὔχρηστον γὰρ μᾶλλον γίνεται πρὸς τὸ εὐκόπως τῷ <lb n="7,30"></lb>δακτύλῳ καταλαμβάνεσθαι τὸ στόμιον. <lb n="7,31"></lb></s> </p> <p n="8"> <s id="id.000135">Τῷ δὲ αὐτῷ τρόπῳ ἐκ τοῦ αὐτοῦ σφαιρίου καὶ <lb n="8,1"></lb>ψυχρὸν καὶ θερμὸν προέσθαι δυνατόν ἐστιν, ὅσον <lb n="8,2"></lb>προαιρούμεθα. <lb n="8,3"></lb></s> <s id="id.000136">Κατασκευάζεται γὰρ ὁμοίως σφαιρίον τὸ ΑΒ διά<lb n="8,4"></lb>φραγμα ἔχον μέσον ὀρθὸν τὸ ΓΔ καὶ ἄνωθεν ὁμοίως <lb n="8,5"></lb>σωλῆνα τὸν ΕΖ συντετρημένον καὶ συνεστεγνωμένον <lb n="8,6"></lb>τῷ σφαιρίῳ καὶ ἔχοντα μέσον διάφραγμα τὸ ΓΗ <lb n="8,7"></lb>συνεχὲς τῷ ΓΔ διαφράγματι· ἄνωθεν δὲ ἀνακαμπὰς <lb n="8,8"></lb>ἐχέτω τὰς Θ, Κ φερούσας εἰς ἑκάτερον μέρος τῶν ἐν <lb n="8,9"></lb>τῷ ΕΖ χωρῶν. </s> <s id="id.000137">ἐφ' ἑκάτερα δὲ τοῦ ΓΔ διαφράγματος <lb n="8,10"></lb>εἰλήφθω εἰς τὸ κάτω μέρος τοῦ σφαιρίου τοῦ ΑΒ <lb n="8,11"></lb>πρὸς τῷ Δ τρυπήματα ὅμοια τῶν ἐν τοῖς τρουλλίοις <lb n="8,12"></lb>τοῖς μαγειρικοῖς γινομένων, ἠθμοειδῆ. </s> <s id="id.000138">ὅταν οὖν βου<lb n="8,13"></lb>λώμεθα θερμὸν ἀρύσασθαι, καταλαβόμενοι τοῖς δυσὶ <pb pagenum="62"></pb><lb n="8,14"></lb>δακτύλοις τὰ Θ, Κ στόμια καθίεμεν τὸ σφαιρίον εἰς <lb n="8,15"></lb>τὸ θερμὸν καὶ ἀνίεμεν μίαν τῶν ἀναπνοῶν τὴν Θ, <lb n="8,16"></lb>ὅπως ὁ μὲν ἐν τῷ ΒΓΔ ἡμισφαιρίῳ ἀὴρ ἐκκρουσθῇ <lb n="8,17"></lb>διὰ τῆς Θ ἀναπνοῆς, τὸ δὲ θερμὸν ἀπὸ τοῦ ἠθμοῦ <lb n="8,18"></lb>πληρώσῃ τὸ ΒΓΔ ἡμισφαίριον. </s> <s id="id.000139">πάλιν οὖν καταλαβό<lb n="8,19"></lb>μενοι τὴν Θ ἀναπνοὴν ἐξαιροῦμεν ἐκ τοῦ θερμοῦ τὸ <lb n="8,20"></lb>σφαιρίον, ὃ δὴ στέξει διὰ τὸ μὴ ἔχειν τὸν ἀέρα παρ<lb n="8,21"></lb>είσδυσιν. </s> <s id="id.000140">καθέντες οὖν ὁμοίως εἰς τὸ ψυχρὸν ἀνίε<lb n="8,22"></lb>μεν τὴν Κ ἀναπνοὴν καὶ πάλιν πληρωθέντος τοῦ <lb n="8,23"></lb>ΑΓΔ ἡμισφαιρίου καταλαβόμενοι τὴν Κ ἀναπνοὴν <lb n="8,24"></lb>ἐξαιροῦμεν τὸ σφαιρίον πλῆρες ὂν θερμοῦ καὶ ψυχροῦ <lb n="8,25"></lb>ὕδατος. </s> <s id="id.000141">ὅταν οὖν βουλώμεθα ὁπότερον αὐτῶν προ<lb n="8,26"></lb>έσθαι, ἀνίεμεν τὴν κατ' ἐκεῖνο ἀναπνοήν. </s> <s id="id.000142">καὶ ὅταν <lb n="8,27"></lb>μὴ βουλώμεθα ῥέειν, πάλιν ὁμοίως καταλαμβανόμεθα. <lb n="8,28"></lb></s> <s id="id.000143">ἔξεστι δὲ <pb pagenum="64"></pb><lb n="8,29"></lb>τῷ αὐτῷ τρόπῳ ἐκ τοῦ αὐτοῦ [2σφαιρίου]2 καὶ οἶνον <lb n="8,30"></lb>καὶ θερμὸν καὶ ψυχρὸν καὶ ἄλλο τι, ὃ ἐὰν προαιρώ<lb n="8,31"></lb>μεθα, ἀναλαμβάνειν τε καὶ προί̈εσθαι, ὁπόσον ἂν καὶ <lb n="8,32"></lb>ὅταν προαιρώμεθα, πλειόνων γινομένων τῶν διαφραγ<lb n="8,33"></lb>μάτων καὶ τῶν ὀπῶν, δι' ὧν εἰς ἑκάστην χώραν ὁ ἀὴρ <lb n="8,34"></lb>παρεμπίπτει καὶ πάλιν ἐξελαύνεται. </s> <s id="id.000144">δύναται δὲ ἀντὶ <lb n="8,35"></lb>τῶν ἐπικεκαμμένων στομίων τρυπήματα εἶναι περί [τε] <lb n="8,36"></lb>τὸ τεῦχος τοῦ σωλῆνος παρὰ τὸ ἄνω μέρος φέροντα εἰς <lb n="8,37"></lb>τὰς χώρας, ἃ δὴ καταλαμβανόμεθα τοῖς δακτύλοισ, ὅταν <lb n="8,38"></lb>στεγνοῦν βουλώμεθα. </s> <s id="id.000145">ἕνεκα δὲ τοῦ μὴ φαίνεσθαι τὰ <lb n="8,39"></lb>ἠθμία περιληψόμεθα ἀμφότερα ἑνὶ κρουνισματίῳ, ὥστε <lb n="8,40"></lb>οὕτως δοκεῖν ἀπὸ τοῦ αὐτοῦ κρουνοῦ ἀμφότερα ῥεῖν. <lb n="8,41"></lb></s> </p> <p n="9"> <s id="id.000146">Κατασκευάζεται δὲ καὶ προχύτης πλέον καὶ ἔλαττον <lb n="9,1"></lb>ὑγρὸν δεχόμενος καὶ προϊέμενος ὁτὲ μὲν πλέον, ὁτὲ <pb pagenum="66"></pb><lb n="9,2"></lb>δὲ ἔλασσον, ὥστε καὶ <lb n="9,3"></lb>ἐγχεομένου εἰς αὐτὸν <lb n="9,4"></lb>οἴνου τε καὶ ὕδατος <lb n="9,5"></lb>ὁτὲ μὲν καθαρὸν τὸ <lb n="9,6"></lb>ὕδωρ προί̈εσθαι, ὁτὲ <lb n="9,7"></lb>δὲ οἶνον ἄκρατον, ὁτὲ <lb n="9,8"></lb>δὲ κρᾶμα· ἔστι δὲ ἡ <lb n="9,9"></lb>κατασκευὴ τοιαύτη. <lb n="9,10"></lb></s> <s id="id.000147">Ἔστω προχύτης ὁ <lb n="9,11"></lb>ΑΒ διάφραγμα ἔχων <lb n="9,12"></lb>μέσον τὸ ΓΔ, ἐν δὲ <lb n="9,13"></lb>τῷ διαφράγματι παρὰ <lb n="9,14"></lb>τὸ κύτος τοῦ ἀγγείου <lb n="9,15"></lb>τρυπημάτια ἐν ἠθμῷ <lb n="9,16"></lb>περιφερῆ τὰ Ε· ἐκ δὲ <lb n="9,17"></lb>τοῦ κατὰ διάμετρον <lb n="9,18"></lb>τόπου ἐν τῷ διαφράγ<lb n="9,19"></lb>ματι τρυπημάτιον ἔστω <lb n="9,20"></lb>στρογγύλον τὸ Ζ, δι' οὗ σωλὴν διώσθω ὁ ΖΗΘ <lb n="9,21"></lb>συνεστεγνωμένος μὲν τῷ διαφράγματι, ἀπέχων δὲ <lb n="9,22"></lb>ἀπὸ τοῦ πυθμένος τοῦ προχύτου βραχὺ κατὰ τὸ Η· <pb pagenum="68"></pb><lb n="9,23"></lb>τὸ δὲ ἕτερον αὐτοῦ στόμιον τὸ Θ συντετρήσθω τῷ <lb n="9,24"></lb>τεύχει τοῦ προχύτου ὑπὸ τὸ ὠτίον, ᾧ συνεστεγνώσθω <lb n="9,25"></lb>τὸ ὠτίον κοῖλον ὑπάρχον καὶ ἔχον τρύπημα ἐκ τοῦ <lb n="9,26"></lb>ἐκτὸς μέρους τοῦ ὠτίου τὸ Κ, ὃ καταληψόμεθα τῷ <lb n="9,27"></lb>δακτύλῳ, ὅταν δέῃ. </s> <s id="id.000148">ἐὰν οὖν καταλαβόμενοι τὸ διαύγιον, <lb n="9,28"></lb>ὡς εἴρηται, ἐγχέωμεν εἰς τὸν προχύτην, τὸ ἐγχεόμενον <lb n="9,29"></lb>εἰς τὴν ὑπὲρ τὸ διάφραγμα χώραν μενεῖ διὰ τὸ μὴ <lb n="9,30"></lb>δύνασθαι διὰ τοῦ ἠθμοῦ εἰς τὴν ὑποκάτω χώραν <lb n="9,31"></lb>ἐνεχθῆναι· οὐ δύναται δὲ διὰ τὸ μὴ ἄλλην ἔχειν <lb n="9,32"></lb>διέξοδον ἢ τὴν διὰ τοῦ Κ διαυγίου. </s> <s id="id.000149">ὅταν οὖν ἀνέ<lb n="9,33"></lb>σωμεν τὸ διαύγιον, τότε χωρήσει τὸ ὑγρὸν εἰς τὴν <lb n="9,34"></lb>ὑποκειμένην χώραν, καὶ τότε πλέον δέξεται ὁ προχύ<lb n="9,35"></lb>της. </s> <s id="id.000150">ἐὰν οὖν προεγχέαντες τὸν οἶνον, ὥστε πληρω<lb n="9,36"></lb>θῆναι τὴν ΓΒΔ χώραν, καταλαβώμεθα τὸ διαύγιον <lb n="9,37"></lb>καὶ ἐπιχέωμεν ὕδωρ, οὐ μὴ μιγῇ, ἀλλ' ὅταν μὲν κατα<lb n="9,38"></lb>στρέψωμεν τὸν προχύτην, καθαρὸν προήσεται τὸ ὕδωρ· <lb n="9,39"></lb>ὅταν δὲ ἀνέσωμεν τὸ διαύγιον ἔτι τοῦ ὕδατος ῥέοντος, <pb pagenum="70"></pb><lb n="9,40"></lb>ἐπιρρεύσει καὶ ὁ οἶνος διὰ τὸ εἰς τὸν κενούμενον τόπον <lb n="9,41"></lb>ἀέρα ἀντικαταλλάσσεσθαι διὰ τοῦ διαυγίου, εἶτα κα<lb n="9,42"></lb>θαρὸς ὁ οἶνος ῥυήσεται. </s> <s id="id.000151">ἔξεστι δὲ καὶ προεγχέαντα <lb n="9,43"></lb>ὕδωρ καὶ προκαταλαβόντα τὸ διαύγιον οἶνον ἐπιχέειν, <lb n="9,44"></lb>ὥστε τοῖς μὲν καθαρὸν προέσθαι οἶνον, οἷς δὲ κρᾶμα, <lb n="9,45"></lb>οἷς δὲ καὶ βουλόμεθα ἐμπαίζειν, ὕδωρ. <lb n="9,46"></lb></s> </p> <p n="10"> <s id="id.000152">Κατασκευάζεται δὲ καὶ σφαῖρα κοίλη ἢ ἕτερον ἀγ<lb n="10,1"></lb>γεῖον, εἰς ὃ ἐγχυθὲν ὑγρὸν ἀναπιέζεται εἰς τὸ ὕψος <lb n="10,2"></lb>αὐτόματον καὶ μετὰ βίας πολλῆς, ὥστε πᾶν κενωθῆναι, <lb n="10,3"></lb>καίτοι τῆς φορᾶς αὐτῷ γιγνομένης παρὰ φύσιν εἰς τὸ <lb n="10,4"></lb>ἄνω μέρος· ἔστι δὲ ἡ κατασκευὴ τοιαύτη. <lb n="10,5"></lb></s> <s id="id.000153">Ἔστω σφαῖρα χωροῦσα ὡς κοτύλας ἕξ, τὸ τεῦχος <lb n="10,6"></lb>ἔχουσα τοῦ ἐλάσματος στερεόν, ὥστε ὑπομένειν τὴν <lb n="10,7"></lb>μέλλουσαν τοῦ ἀέρος πίλησιν γενέσθαι· ἔστω δὲ αὕτη <lb n="10,8"></lb>ἡ ΑΒ κειμένη ἐπί τινος ὑποσπειρίου τοῦ Γ· τρυπη<lb n="10,9"></lb>θείσης δὲ αὐτῆς κατὰ τὸ ἄνω μέρος σωλὴν διώσθω ὁ <lb n="10,10"></lb>ΔΕ ἀπέχων ἀπὸ τοῦ κατὰ διάμετρον τόπου τοῦ τρυ<pb pagenum="72"></pb><lb n="10,11"></lb>πήματος ὅσον ὕδατος διάρρυσιν, ὑπερέχων δὲ εἰς τὸ <lb n="10,12"></lb>ἄνω μέρος τῆς σφαίρας βραχὺ καὶ συνεστεγνωμένος <lb n="10,13"></lb>κατὰ τὸ τρύπημα τῷ τεύχει τῆς σφαίρας. </s> <s id="id.000154">σχιζέσθω δὲ <lb n="10,14"></lb>τὸ ἄνω στόμιον αὐτοῦ εἰς δύο σωλῆνας τοὺς ΔΗ, ΔΖ, <lb n="10,15"></lb>οἷς ἐπικολλάσθωσαν ἕτεροι σωλῆνες δύο πλάγιοι οἱ <lb n="10,16"></lb>ΗΘΚΛ, ΖΜΝΞ συντετρημένοι τοῖς ΔΗ, ΔΖ· ἕτερος <lb n="10,17"></lb>δὲ ὁ ΠΟ συνεσμηρίσθω τοῖς ΗΘΚΛ, ΖΜΝΞ τετρυ<lb n="10,18"></lb>πημένος καὶ οὗτος κατὰ τὰ ἐν τοῖς ΗΘΚΛ, ΖΜΝΞ <lb n="10,19"></lb>τρυπήματα καὶ ἔχων σωληνάριον προκείμενον ὄρθιον <lb n="10,20"></lb>τὸ ΡΣ συντετρημένον αὐτῷ καὶ εἰς μικρὸν συνηγμένον <lb n="10,21"></lb>στόμιον κατὰ τὸ Σ. </s> <s id="id.000155">ἐὰν οὖν ἐπιλαβόμενοι τοῦ ΣΡ <lb n="10,22"></lb>σωλῆνος ἐπιστρέφωμεν τὸν ΠΟ σωλῆνα, ἀποκλεισθή<lb n="10,23"></lb>σεται τὰ κατάλληλα κείμενα τρυπήματα, ὥστε τὸ μέλλον <lb n="10,24"></lb>ἀναπιέζεσθαι ὑγρὸν μηκέτι ἔχειν διέξοδον. </s> <s id="id.000156">καθείσθω <pb pagenum="74"></pb><lb n="10,25"></lb>δὲ καὶ ἕτερος σωλὴν ἐν τῇ σφαίρᾳ ὁ ΤΥΦ διά τινος <lb n="10,26"></lb>τρυπήματος ἐπιπεφραγμένος τὸ κάτω στόμιον τὸ Φ, <lb n="10,27"></lb>ἐκ δὲ τῶν πλαγίων τρύπημα ἔχων στρογγύλον τὸ Χ <lb n="10,28"></lb>παρὰ τὸν πυθμένα, ᾧ προσκείσθω κλειδίον τὸ καλού<lb n="10,29"></lb>μενον παρὰ Ῥωμαίοις ἀσσάριον, οὗ τὴν κατασκευὴν <lb n="10,30"></lb>ἑξῆς ἐροῦμεν· ἕτερος δὲ σωλὴν ὁ ΨΩ καθείσθω συν<lb n="10,31"></lb>εσμηρισμένος τῷ ΥΦΤ. </s> <s id="id.000157">ἐὰν οὖν ἀνασπάσαντες τὸν <lb n="10,32"></lb>ΨΩ σωλῆνα ἐγχέωμεν εἰς τὸν ΤΥΦ σωλῆνα ὑγρόν, <lb n="10,33"></lb>εἰσελεύσεται εἰς τὸ τεῦχος τῆς σφαίρας διὰ τοῦ Χ <lb n="10,34"></lb>τρυπήματος ἀνοιγομένου τοῦ κλειδίου εἰς τὸ ἔσω μέρος, <lb n="10,35"></lb>τοῦ ἀέρος ἐκχωροῦντος διὰ τῶν ἐν τῷ ΟΠ σωλῆνι <lb n="10,36"></lb>εἰρημένων τρυπημάτων καὶ κειμένων κατὰ τὰ ἐν τοῖς <lb n="10,37"></lb>ΗΘΚΛ, ΖΜΝΞ σωλῆσι τρυπήματα. </s> <s id="id.000158">ὅταν οὖν δι' <lb n="10,38"></lb>ἡμίσους γένηται ἡ σφαῖρα τοῦ ὑγροῦ, ἐγκλίνωμεν τὸ <lb n="10,39"></lb>ΣΡ σωληνίδιον, ὥστε παραλλάξαι τὰ κατάλληλα κεί<lb n="10,40"></lb>μενα τρυπήματα· εἶτα καθιέντες τὸν ΨΩ σωλῆνα ἐκ<lb n="10,41"></lb>θλίβωμεν δι' αὐτοῦ τὸν ἐν τῷ ΤΥΦ σωλῆνι ἐναπει<lb n="10,42"></lb>λημμένον ἀέρα τε καὶ ὑγρόν, ὃς δὴ χωρήσει εἰς τὸ <lb n="10,43"></lb>τεῦχος τῆς σφαίρας διὰ τοῦ κλειδίου μετὰ βίας διὰ <lb n="10,44"></lb>τὸ τὴν σφαῖραν πλήρη εἶναι ἀέρος τε καὶ ὑγροῦ. <lb n="10,45"></lb></s> <s id="id.000159">γίνεται οὖν ἡ εἴσκρισις κατὰ πίλησιν τοῦ ἀέρος συνερ<lb n="10,46"></lb>χομένου εἰς τὰ παρεμπεπλεγμένα μεταξὺ αὐτοῦ κενά· <pb pagenum="76"></pb><lb n="10,47"></lb>εἶτα πάλιν ἀνασπάσαντες τὸν ΨΩ σωλῆνα, ὥστε πλη<lb n="10,48"></lb>ρωθῆναι τὸν ΤΥΦ σωλῆνα ἀέρος, πάλιν καθέντες τὸν <lb n="10,49"></lb>ΨΩ σωλῆνα εἰσκρινοῦμεν ἐν τῇ σφαίρᾳ τὸν εἰρημένον <lb n="10,50"></lb>ἀέρα. </s> <s id="id.000160">καὶ τοῦτο πλεονάκις ποιοῦντες ἕξομεν ἐν τῇ <lb n="10,51"></lb>σφαίρᾳ πολὺν πεπιλημένον ἀέρα· ὅτι γὰρ ὁ εἰσκρινό<lb n="10,52"></lb>μενος ἀὴρ ἀνασπασθέντος τοῦ ἐμβολέως οὐ παρεξέρ<lb n="10,53"></lb>χεται, φανερὸν διὰ τὸ τὸ κλειδίον ὑπ' αὐτοῦ ἔσωθεν <lb n="10,54"></lb>θλιβόμενον ἀποκεκλεῖσθαι. </s> <s id="id.000161">ἐὰν οὖν ἀναστρέψωμεν <lb n="10,55"></lb>πάλιν τὸ ΡΣ σωληνίδιον, ὥστε ὀρθὸν γενέσθαι καὶ <lb n="10,56"></lb>τὰ τρυπήματα κατάλληλα κεῖσθαι, τότε ἀναπιτυσθή<lb n="10,57"></lb>σεται τὸ ὑγρόν, τοῦ πεπιλημένου ἀέρος χεομένου εἰς <lb n="10,58"></lb>τὸν ἴδιον ὄγκον καὶ θλίβοντος τὸ ὑγρὸν τὸ ὑπο<lb n="10,59"></lb>κείμενον. </s> <s id="id.000162">ἐὰν οὖν πλείων ᾖ ὁ πεπιλημένος ἀήρ, πᾶν <lb n="10,60"></lb>ἐξελάσει τὸ ὑγρόν, ὥστε καὶ τὸν ὑπερπλεονάζοντα σὺν <lb n="10,61"></lb>τῷ ὑγρῷ ἐκκρουσθῆναι ἀέρα. <lb n="10,62"></lb></s> </p> <p n="11"> <s id="id.000163">Τὸ δὲ εἰρημένον ἀσσάριον κατασκευάζεται οὕτως· <lb n="11,1"></lb>δύο πλινθία κατασκευάζεται χάλκεα τετράγωνα ἔχοντα <lb n="11,2"></lb>ἑκάστην πλευρὰν ὡς δακτύλου ἑνός, τὸ πάχος δὲ <pb pagenum="78"></pb><lb n="11,3"></lb>ὡσπερεὶ στάθμης. </s> <s id="id.000164">ταῦτα δὴ ἐφαρμοσθέντα ἐπάλληλα <lb n="11,4"></lb>κατὰ τὸ πλάτος σμηρίζεται, τουτέστι λειοῦται, ὥστε <lb n="11,5"></lb>εἰς τὸ μεταξὺ αὐτῶν μήτε ἀέρα μήτε ὑγρὸν παρεμ<lb n="11,6"></lb>πίπτειν. <lb n="11,7"></lb></s> <s id="id.000165">Ἔστω δὲ ταῦτα τὰ ΑΒΓΔ, ΕΖΗΘ· ἓν δὲ αὐτῶν <lb n="11,8"></lb>τὸ ΕΖΗΘ τέτρηται κατὰ μέσον στρογγύλῳ τρήματι <lb n="11,9"></lb>τὴν διάμετρον <gap></gap> ὡς δακτύλου τρίτον· ἐφαρμοσθείσης <lb n="11,10"></lb>δὲ τῆς ΑΔ πλευρᾶς ἐπὶ τὴν ΕΘ, συλλαμβάνεται πρὸς <lb n="11,11"></lb>ἄλληλα τὰ πλινθία στροφωματίοις, ὥστε τὰς λείας <lb n="11,12"></lb>ἐπιφανείας τῶν πλινθίων ἀλλήλαις ἐφηρμοκέναι. </s> <s id="id.000166">ὅταν <lb n="11,13"></lb>οὖν βουλώμεθα δι' αὐτῶν ἐνεργεῖν, ἐπικολλᾶται τὸ <lb n="11,14"></lb>ΕΖΗΘ πλινθίον τῷ τρήματι, δι' οὗ ἤτοι ἀέρα ἢ <lb n="11,15"></lb>ὑγρὸν εἰσωθούμενον δύναται στέγειν· διὰ γὰρ τῆς <lb n="11,16"></lb>διωθήσεως τὸ ΑΒΓΔ πλινθίον ἀνοίγεται εὐλύτως <lb n="11,17"></lb>κινούμενον διὰ τῶν στροφωματίων καὶ δέχεται τὸν <lb n="11,18"></lb>ἀέρα καὶ τὸ ὑγρόν, ὃς ἀποκλείεται εἰς τὸ στεγνὸν ἀγ<pb pagenum="80"></pb><lb n="11,19"></lb>γεῖον ἀντερείδων τῷ ΑΒΓΔ πλινθιδίῳ καὶ ἀποκλείων <lb n="11,20"></lb>τὸ τρῆμα, δι' οὗ ὁ ἀὴρ εἰσωθεῖται. <lb n="11,21"></lb></s> </p> <p n="12"> <s id="id.000167">Ἐπί τινων βωμῶν πυρὸς θυμιαθέντος τὰ παρα<lb n="12,1"></lb>κείμενα ζῴδια σπένδειν· κατασκευάζεται δὲ οὕτως. <lb n="12,2"></lb></s> <s id="id.000168">Ἔστω βάσις, ἐφ' ἧς ἕστηκε τὰ ζῴδια, ἡ ΑΒΓΔ, ἐφ' <lb n="12,3"></lb>ἧς ἐφεστάτω βωμὸς ὁ ΕΖ στεγνὸς πανταχόθεν· καὶ <lb n="12,4"></lb>αὐτὴ δὲ ἡ βάσις στεγνὴ ἔστω συντετρημένη τῷ βωμῷ <lb n="12,5"></lb>κατὰ τὸ Η· διὰ δὲ τῆς βάσεως σωλὴν διώσθω ὁ ΘΚΛ <lb n="12,6"></lb>ἀπέχων μὲν ἀπὸ τοῦ πυθμένος τῆς βάσεως βραχὺ κατὰ <lb n="12,7"></lb>τὸ Λ, συντετρημένος δὲ τῷ φιαλίῳ, ὃ κατέχει τὸ ζῴδιον <lb n="12,8"></lb>κατὰ τὸ Θ· ἐγκεχύσθω δὲ εἰς τὴν βάσιν διά τινος <lb n="12,9"></lb>τρυπήματος τοῦ Μ ὑγρόν, ὃ μετὰ τὴν ἔγχυσιν ἀπε<lb n="12,10"></lb>στεγνώσθω. </s> <s id="id.000169">ἐὰν οὖν ἐπὶ τοῦ ΕΖΗ βωμοῦ πῦρ ἀνα<lb n="12,11"></lb>καυθῇ, συμβήσεται τὸν ἐντὸς ἀέρα λεπτυνόμενον οἴ<lb n="12,12"></lb>χεσθαι εἰς τὴν βάσιν καὶ ἐκθλίβειν τὸ ἐν αὐτῇ ὑγρόν· <lb n="12,13"></lb>τοῦτο δὲ μὴ ἔχον ἄλλην ἀντιπερίστασιν χωρήσει διὰ <pb pagenum="82"></pb><lb n="12,14"></lb>τοῦ ΘΚΛ σωλῆνος εἰς τὸ φιαλίδιον. </s> <s id="id.000170">καὶ οὕτως τὸ <lb n="12,15"></lb>ζῴδιον σπείσει καὶ ἐπὶ τοσοῦτον, ἐφ' ὅσον καὶ τὸ πῦρ <lb n="12,16"></lb>ἐπίκειται· σβεσθέντος δὲ τοῦ πυρὸς πάλιν παύεται σπέν<lb n="12,17"></lb>δον. </s> <s id="id.000171">καὶ τοῦτο ἔσται, ὁσάκις ἂν τὸ πῦρ ἀνακαίηται. <lb n="12,18"></lb><pb pagenum="84"></pb></s> <s id="id.000172">Ἔστω δὲ ὁ σωλήν, δι' οὗ ἡ θερμασία μέλλει <lb n="12,19"></lb>εἰσέρχεσθαι, εὐρύτερος κατὰ τὸ μέσον· ἀναγκαῖον γὰρ <lb n="12,20"></lb>τὴν θερμασίαν ἢ μᾶλλον τὸν ἀπὸ ταύτης ἀτμὸν εἰς <lb n="12,21"></lb>εὐρυτέραν χωρισθέντα χώραν πλείονα γίγνεσθαι καὶ <lb n="12,22"></lb>πλεῖον δύνασθαι ἐνεργεῖν. <lb n="12,23"></lb></s> </p> <p n="13"> <s id="id.000173">Ἔνια τῶν ἀγγείων, ἐὰν μὴ πληρωθῇ, οὐ ῥέει· <lb n="13,1"></lb>πληρωθέντων δὲ κενοῦται πᾶν ὃ ἔχει ὑγρόν· κατα<lb n="13,2"></lb>σκευάζεται δὲ οὕτως. <lb n="13,3"></lb></s> <s id="id.000174">Ἔστω ἀγγεῖον τὸ ΑΒΓΔ ἀνεστομωμένον· διὰ δὲ <lb n="13,4"></lb>τοῦ πυθμένος διώσθω ἤτοι πνικτὸς διαβήτης ὁ ΕΖΗΘ <lb n="13,5"></lb>ἢ καμπύλος σίφων ὁ ΗΘΚ. </s> <s id="id.000175">συμβήσεται οὖν πληρω<lb n="13,6"></lb>θέντος τοῦ ΑΒΓΔ ἀγγείου καὶ ὑπερβλύσαντος τοῦ <lb n="13,7"></lb>ὕδατος φέρεσθαι δι' αὐτῶν τῶν διαβητῶν καὶ πάλιν <lb n="13,8"></lb>ἐκρεῖν, ἄχρις ἂν κενωθῇ τὸ ΑΒΓΔ ἀγγεῖον, ἐάνπερ <lb n="13,9"></lb>οἱ διαβῆται τὰς ἀρχὰς ἔχωσιν ἔγγιστα τοῦ πυθμένος <lb n="13,10"></lb>τοῦ ἀγγείου, ὥστε μόνον ὕδατι διάρρυσιν ὑπάρχειν. <lb n="13,11"></lb></s> </p> <p n="14"> <s id="id.000176">Καὶ δύο ἀγγείων ὑπαρχόντων ἐπί τινος βάσεως <lb n="14,1"></lb>καὶ τοῦ ἑνὸς αὐτῶν πεπληρωμένου οἴνου, τοῦ δὲ <lb n="14,2"></lb>ἑτέρου κενοῦ ὑπάρχοντος καὶ ἀμφοτέρων κρουνοὺς <lb n="14,3"></lb>ἐχόντων ἀνεῳγότας, οὐ ῥεῖ ὁ οἶνος, ἐὰν μὴ καὶ τὸ <lb n="14,4"></lb>ἕτερον ἀγγεῖον ὕδατος πληρωθῇ· καὶ τότε ἐκρέει ἐκ <lb n="14,5"></lb>μὲν τοῦ ἑνὸς αὐτῶν ὁ οἶνος, ἐκ δὲ τοῦ ἑτέρου τὸ ὕδωρ, <lb n="14,6"></lb>ἄχρις ἂν ἀμφότερα κενωθῇ· καλοῦνται δὲ ὁμονοίας <lb n="14,7"></lb>κρατῆρες. <lb n="14,8"></lb><pb pagenum="86"></pb></s> <s id="id.000177">Ἔστω ἡ μὲν βάσις, ἐφ' ἧς ἐπίκειται τὰ ἀγγεῖα, ἡ <lb n="14,9"></lb>ΑΒΓΔ· τὰ δὲ ἀγγεῖα ἔστω τὰ Ε, Ζ· ἐν δὲ ἑκατέρῳ <lb n="14,10"></lb>αὐτῶν καμπύλος ἔστω σίφων, ἐν μὲν τῷ Ε ὁ ΗΘΚ, <lb n="14,11"></lb>ἐν δὲ τῷ Ζ ὁ ΛΜΝ τὰς ἔξω ὑπεροχὰς ἔχοντες εἰς <lb n="14,12"></lb>κρουνοὺς διεσκευασμένας· αἱ δὲ κυρτότητες αὐτῶν πρὸς <lb n="14,13"></lb>τοῖς στομίοις τῶν ἀγγείων ὑπαρχέτωσαν. </s> <s id="id.000178">ἕτερος δὲ <lb n="14,14"></lb>σωλὴν διὰ τῆς βάσεως εἰς τὰ ἀγγεῖα ἀνακεκάμφθω ὁ <lb n="14,15"></lb>ΞΟΠΡ, οὗ τὰ Ξ, Ρ στόμια παρ' αὐτὰς ἔστω τὰς τῶν <lb n="14,16"></lb>διαβητῶν κυρτότητας. </s> <s id="id.000179">ἐγκεχύσθω δὲ ἐν τῷ Ε ἀγγείῳ <lb n="14,17"></lb>οἶνος, ὥστε τὴν ἐπιφάνειαν τοῦ ὑγροῦ μὴ ὑπὲρ αὐτὴν <lb n="14,18"></lb>εἶναι τὴν τοῦ διαβήτου κυρτότητα τὴν Θ. </s> <s id="id.000180">μέχρι μὲν <lb n="14,19"></lb>τούτου οὐ ῥεῖ ὁ οἶνος διὰ τὸ τὸν διαβήτην μὴ ἔχειν <lb n="14,20"></lb>τὴν ἀρχὴν τῆς ῥύσεως. </s> <s id="id.000181">ἐὰν δὲ καὶ ἐν τῷ Ζ ἀγγείῳ <lb n="14,21"></lb>ὕδωρ ἐγχέωμεν, ὥστε τὴν ἐπιφάνειαν αὐτοῦ ὑπερβάλλειν <lb n="14,22"></lb>τὴν Μ κυρτότητα, τότε τὸ ὕδωρ ἐνεχθήσεται καὶ διὰ <lb n="14,23"></lb>τοῦ ΞΟΠΡ σωλῆνος εἰς τὸ Ε ἀγγεῖον καὶ ἀρχὴν δώσει <lb n="14,24"></lb>τῆς ῥύσεως τῷ οἴνῳ. </s> <s id="id.000182">καὶ τότε ἀμφότερα τὰ ἀγγεῖα <lb n="14,25"></lb>ῥεύσει, τὸ μὲν τὸν οἶνον, τὸ δὲ τὸ ὕδωρ, ἄχρις ἂν <lb n="14,26"></lb>ἀμφότερα κενωθῇ. <lb n="14,27"></lb><pb pagenum="88"></pb></s> </p> <p n="15"> <s id="id.000183">Εἰς ἔνια ἀγγεῖα ὕδατος ἐγχυθέντος μελαγκορύφου <lb n="15,1"></lb>γίνεται φωνὴ ἢ συριγμός· κατασκευάζεται δὲ οὕτως. <lb n="15,2"></lb></s> <s id="id.000184">Ἔστω βάσις στεγνὴ ἡ ΑΒΓΔ· καὶ διὰ τῆς στέγης <lb n="15,3"></lb>τῆς ΑΔ διώσθω χώνη ἡ ΕΖ, ἧς ὁ καυλὸς ἀπεχέτω <lb n="15,4"></lb>τοῦ πυθμένος ὅσον ὕδατι διάρρυσιν καὶ συνεστεγνώσθω <lb n="15,5"></lb>τῇ στέγῃ. </s> <s id="id.000185">ἔστω δὲ καὶ συρίγγιον τὸ ΗΘΚ τῶν εἰθι<lb n="15,6"></lb>σμένων φθέγγεσθαι· συντετρήσθω δὲ τῇ βάσει καὶ <lb n="15,7"></lb>συνεστεγνώσθω ὁμοίως τῇ ΑΔ στέγῃ· τὸ δὲ Κ στόμιον <lb n="15,8"></lb>αὐτοῦ ἐπικεκάμφθω εἰς ὑδάτιον ἀγγειδίου παρακει<lb n="15,9"></lb>μένου τοῦ Λ. </s> <s id="id.000186">συμβήσεται οὖν ἐγχυνομένου τοῦ ὕδατος <lb n="15,10"></lb>διὰ τῆς ΕΖ χώνης τὸν ἐν τῇ βάσει ἀέρα ἐκθλιβό<lb n="15,11"></lb>μενον χωρεῖν διὰ τοῦ ΗΘΚ συριγγίου καὶ τὸν ἦχον <lb n="15,12"></lb>ἀποδιδόναι. </s> <s id="id.000187">ἐὰν μέντοι τοῦ συριγγίου τὸ ἄκρον ἐπι<lb n="15,13"></lb>κεκαμμένον ᾖ πρὸς τῷ ὕδατι, ἀνακαχλάζων εἴδεται ὁ <pb pagenum="90"></pb><lb n="15,14"></lb>ἦχος, ὥστε μελαγκορύφου γίγνεσθαι φωνήν· ἐὰν δὲ <lb n="15,15"></lb>μὴ παρακέηται τὸ ὑδάτιον, συριγμὸς μόνος ἔσται. <lb n="15,16"></lb></s> </p> <p n="16"> <s id="id.000188">Αἱ μὲν οὖν φωναὶ γίνονται διὰ τῶν συρίγγων· <lb n="16,1"></lb>διάφοροι δὲ τοῖς ἤχοις γίγνονται, τῶν συρίγγων ἤτοι <lb n="16,2"></lb>λεπτοτέρων γινομένων <gap></gap> ἤτοι καὶ παρεκτεινομένων <lb n="16,3"></lb>εἰς μῆκος ἢ καὶ συστελλομένων καὶ τοῦ βαπτιζομένου <lb n="16,4"></lb>μέρους εἰς τὸ ὕδωρ ἤτοι πλείονος ἢ ἐλάττονος γινο<lb n="16,5"></lb>μένου, ὥστε διὰ τοιούτου τρόπου ὀρνέων πλειόνων <lb n="16,6"></lb>διαφόρους γίγνεσθαι φωνάς. </s> <s id="id.000189">κατασκευάζεται οὖν ἤτοι <lb n="16,7"></lb>ἐν κρήνῃ ἢ ἐν ἄντρῳ ἢ καθόλου ὅπου ἐπίρρυτον ὕδωρ <lb n="16,8"></lb>ἐστίν, ὄρνεα πλείονα διακείμενα καὶ τούτοις παρακει<lb n="16,9"></lb>μένη γλαύξ, ἥτις ἐπιστρέφεται αὐτομάτως παρὰ τὰ <lb n="16,10"></lb>ὄρνεα καὶ πάλιν ἀποστρέφεται· καὶ ἀποστραφείσης <lb n="16,11"></lb>μὲν φθέγγονται τὰ ὄρνεα, ἐπιστραφείσης δὲ πρὸς <lb n="16,12"></lb>αὐτὰ οὐκέτι φθέγγονται. </s> <s id="id.000190">καὶ τοῦτο πλεονάκις γίνεται. <lb n="16,13"></lb></s> <s id="id.000191">κατασκευάζεται δὲ τὸν τρόπον τοῦτον. <lb n="16,14"></lb></s> <s id="id.000192">Ἔστω κρουνισμάτιον ἀεὶ ῥέον τὸ Α· τούτῳ δὲ <lb n="16,15"></lb>ὑποκείσθω στεγνὸν ἀγγεῖον τὸ ΒΓΔΕ ἔχον πνικτὸν <lb n="16,16"></lb>διαβήτην ἢ καμπύλον σίφωνα τὸν ΖΗ καὶ καθιεμένην <lb n="16,17"></lb>χώνην τὴν ΘΚ, ἧς ὁ καυλὸς ἀπεχέτω ἀπὸ τοῦ πυθ<pb pagenum="92"></pb><lb n="16,18"></lb>μένος τοῦ ἀγγείου ὅσον ὕδατι διάρρυσιν. </s> <s id="id.000193">ἐχέτω δὲ <lb n="16,19"></lb>καὶ πλείονα συριγγίδια, οἷα εἴρηται, ὄντα τὰ Λ. </s> <s id="id.000194">συμ<lb n="16,20"></lb>βήσεται οὖν πληρουμένου μὲν τοῦ ΒΓΔΕ ἀγγείου <lb n="16,21"></lb>τὸν ἀέρα τὸν ἐν αὐτῷ ἐκθλιβόμενον καὶ τὰς τῶν <lb n="16,22"></lb>ὀρνέων ποιεῖν φωνάς, κενουμένου δὲ μετὰ τὴν πλή<lb n="16,23"></lb>ρωσιν διὰ τοῦ ΗΖ διαβήτου μηκέτι φθέγγεσθαι. </s> <s id="id.000195">ἵνα <pb pagenum="94"></pb><lb n="16,24"></lb>οὖν ἡ γλαὺξ ἐπιστρέφηται καὶ ἀποστρέφηται, ὡς προ<lb n="16,25"></lb>είρηται, προκατασκευάζεται τὰ μέλλοντα λέγεσθαι· ἔστω <lb n="16,26"></lb>γὰρ ἐπί τινος βάσεως τῆς Μ ἄξων βεβηκὼς ὁ ΝΞ <lb n="16,27"></lb>ἀπὸ τόρνου εἰργασμένος, περὶ ὃν περικείσθω ἁρμοστὴ <lb n="16,28"></lb>σύριγξ ἡ ΟΠ εὐλύτως δυναμένη περὶ αὐτὸν στρέφε<lb n="16,29"></lb>σθαι· ταύτῃ δὲ συμφυὲς ἔστω τυμπάνιον τὸ ΡΣ, ἐφ' <lb n="16,30"></lb>ᾧ ἐπιβήσεται ἡ γλαὺξ συμφυὴς αὐτῷ ὑπάρχουσα· περὶ <lb n="16,31"></lb>δὲ τὴν ΟΠ σύριγγα δύο ἁλύσεις ἐπὶ τἀναντία ἐπει<lb n="16,32"></lb>ληθεῖσαι αἱ ΤΥ, ΦΧ διὰ τροχίων δύο ἀποδεδέσθωσαν <lb n="16,33"></lb>ἡ μὲν ΤΥ εἰς βάρος ἐκκρεμάμενον τὸ Ψ, ἡ δὲ ΦΧ <lb n="16,34"></lb>εἰς κοῖλον ἀγγεῖον τὸ Ω ὑποκείμενον τῷ ΖΗ σίφωνι <lb n="16,35"></lb>ἢ πνικτῷ διαβήτῃ. </s> <s id="id.000196">συμβήσεται οὖν κενουμένου τοῦ <lb n="16,36"></lb>ΒΓΔΕ ἀγγείου τὸ ὑγρὸν φέρεσθαι εἰς τὸ Ω ἀγγεῖον <lb n="16,37"></lb>καὶ ἐπιστρέφεσθαι τήν τε ΟΠ σύριγγα καὶ τὴν γλαῦκα, <pb pagenum="96"></pb><lb n="16,38"></lb>ὥστε βλέπειν πρὸς τὰ ὀρνιθάρια, κενωθέντος δὲ τοῦ <lb n="16,39"></lb>ΒΓΔΕ ἀγγείου κενοῦσθαι καὶ τὸ Ω διά τινος ἐν <lb n="16,40"></lb>αὐτῷ πνικτοῦ διαβήτου ἢ καμπύλου σίφωνος, ὥστε <lb n="16,41"></lb>πάλιν καταβαρῆσαν τὸ Ψ βάρος ἀποστρέψαι τὴν γλαῦκα <lb n="16,42"></lb>κατὰ τὸν καιρὸν ἐκεῖνον, ὅτε πληροῦται τὸ ΒΓΔΕ <lb n="16,43"></lb>ἀγγεῖον καὶ πάλιν αἱ τῶν ὀρνέων γίνονται φωναί. <lb n="16,44"></lb></s> <s id="id.000197">Καὶ οἱ τῶν σαλπίγγων δὲ ἦχοι διὰ τοῦ παρα<lb n="16,45"></lb>πλησίου γίνονται τρόπου τῷ προειρημένῳ· ὅταν γὰρ <lb n="16,46"></lb>εἰς στεγνὸν ἀγγεῖον κατατεθῇ τῆς χώνης ὁ καυλὸς <lb n="16,47"></lb>ἀπέχων ἀπὸ τοῦ πυθμένος βραχὺ καὶ συνεστεγνωμένος <lb n="16,48"></lb>τῷ τεύχει τοῦ ἀγγείου, εἶτα ἡ σάλπιγξ ἔχουσα τόν τε <lb n="16,49"></lb>κώδωνα καὶ τὴν γλωσσίδα συντετρημένην τῷ ἀγγείῳ <lb n="16,50"></lb>κατὰ τὸ ἄνω μέρος αὐτοῦ, συμβήσεται διὰ τῆς χώνης <pb pagenum="98"></pb><lb n="16,51"></lb>ἐγχυνομένου τοῦ ὑγροῦ ἐκθλιβόμενον τὸν ἐν τῷ ἀγ<lb n="16,52"></lb>γείῳ ἀέρα διὰ τῆς γλωσσίδος τὸν ἦχον ἀποτελεῖν. <lb n="16,53"></lb></s> </p> <p n="17"> <s id="id.000198">Θυρῶν ἀνοιγομένων ναοῦ σάλπιγγος ἦχος γίνεται <lb n="17,1"></lb>τόνδε τὸν τρόπον. <lb n="17,2"></lb></s> <s id="id.000199">Ὄπισθεν τῆς θύρας ἀγγεῖον ἔστω τὸ ΑΒΓΔ <lb n="17,3"></lb>ὕδωρ ἔχον· πνιγεὺς δὲ ἔστω ἐν τούτῳ, τουτέστι σύ<lb n="17,4"></lb>στομον ἀγγεῖον κατεστραμμένον τὸ Ζ· τῷ δὲ πυθμένι <lb n="17,5"></lb>αὐτοῦ συντετρήσθω ἡ ΘΚ σάλπιγξ ἔχουσα τόν τε <lb n="17,6"></lb>κώδωνα καὶ τὴν γλωσσίδα· τῷ δὲ σωλῆνι τῆς σάλπιγ<pb pagenum="100"></pb><lb n="17,7"></lb>γος παρακείσθω κανὼν ὁ ΛΜ συμφυὴς μὲν ὢν τῷ <lb n="17,8"></lb>πνιγεῖ, συνδεδεμένος δὲ τῷ τῆς σάλπιγγος σωλῆνι <lb n="17,9"></lb>καὶ ἔχων ἐκ τοῦ ἄκρου κωλυμάτιον τὸ Μ, τουτέστι <lb n="17,10"></lb>χελωνάριον· τῷ δὲ κωλυματίῳ ὑποκείσθω κανὼν ὁ <lb n="17,11"></lb>ΝΞ ἀνέχων τὸν Ζ πνιγέα ἀπέχοντα ἀπὸ τοῦ ὕδατος <lb n="17,12"></lb>ἱκανόν. </s> <s id="id.000200">ὁ δὲ ΝΞ κανὼν κινείσθω περὶ περόνην τὴν <lb n="17,13"></lb>Ο· ἐκ δὲ τοῦ Ξ ἄκρου τοῦ κανόνος ἅλυσις ἢ σπάρτος <lb n="17,14"></lb>ἐκδεθεῖσα ἀποδεδέσθω διὰ τροχίλου τοῦ Π εἰς τὸ <lb n="17,15"></lb>ὄπισθεν τῆς θύρας. </s> <s id="id.000201">συμβήσεται οὖν τῆς θύρας ἀνοι<lb n="17,16"></lb>γομένης τεινομένην τὴν σπάρτον ἐπισπᾶσθαι τὸ Ξ <lb n="17,17"></lb>ἄκρον τοῦ κανόνος, ὥστε μηκέτι ὑποπεπτωκέναι τὸν <lb n="17,18"></lb>ΝΞ κανόνα τῷ Μ κωλυματίῳ· τούτου δὲ παραλλάξαντος <lb n="17,19"></lb>φερόμενος ὁ πνιγεὺς εἰς τὸ ὕδωρ τὸν τῆς σάλπιγγος <lb n="17,20"></lb>ἦχον ἀποτελέσει διὰ τὸ τὸν ἐν αὐτῷ ἀέρα διὰ τῆς <lb n="17,21"></lb>γλωσσίδος καὶ τοῦ κώδωνος ἐκθλίβεσθαι. <lb n="17,22"></lb></s> </p> <p n="18"> <s id="id.000202">Εἰς ἔνια ῥυτὰ προεγχυθέντος οἴνου, ὅταν ὕδωρ <lb n="18,1"></lb>ἐπιχέωμεν, ὁτὲ μὲν καθαρὸν τὸ ὕδωρ ἐκρέει, [2ὁτὲ δὲ <lb n="18,2"></lb>κρᾶμα,]2 ὁτὲ δὲ οἶνος καθαρός· κατασκευάζεται δὲ τόνδε <lb n="18,3"></lb>τὸν τρόπον. <lb n="18,4"></lb></s> <s id="id.000203">Ἔστω ῥυτὸν τὸ ΑΒΓ ἔχον διαφράγματα δύο τὰ <lb n="18,5"></lb>ΔΕ, ΖΗ· διὰ δὲ ἀμφοτέρων αὐτῶν σωλὴν διώσθω ὁ <lb n="18,6"></lb>ΘΚ συνεστεγνωμένος τοῖς διαφράγμασι καὶ τετρυπη<lb n="18,7"></lb>μένος τρηματίῳ τῷ Λ κειμένῳ ὑπεράνω βραχὺ τοῦ <lb n="18,8"></lb>ΖΗ διαφράγματος. </s> <s id="id.000204">ὑπὸ δὲ τὸ ΔΕ διάφραγμα δι<pb pagenum="102"></pb><lb n="18,9"></lb>αύγιον ἔστω τὸ Μ ἐν τῷ κύτει τοῦ ῥυτοῦ. </s> <s id="id.000205">τούτων δὲ <lb n="18,10"></lb>οὕτως ἐχόντων ἐὰν ἀπολαβών τις τὴν Γ ἔκρυσιν ἐγχέῃ <lb n="18,11"></lb>τὸν οἶνον, χωρήσει [2διὰ τοῦ Λ τρυπήματος εἰς τὴν <lb n="18,12"></lb>ΔΕΖΗ χώραν· ὁ γὰρ ἐν αὐτῇ ἀὴρ ἐκχωρήσει]2 διὰ <lb n="18,13"></lb>τοῦ Μ διαυγίου. </s> <s id="id.000206">ὅταν οὖν τῷ δακτύλῳ ἐπιπωμάσωμεν <lb n="18,14"></lb>τὸ Μ διαύγιον, στέξει ὁ ἐν τῷ ΔΕΖΗ [2μέρει]2 οἶνος. <lb n="18,15"></lb></s> <s id="id.000207">ὅταν οὖν ὕδωρ ἐπιχέωμεν τῷ ΑΒΕΔ μέρει τοῦ ῥυτοῦ <lb n="18,16"></lb>κατέχοντες τὸ Μ διαύγιον, ῥεύσει καθαρὸν τὸ ὕδωρ· <lb n="18,17"></lb>ἐὰν δὲ ἀνῶμεν ἔτι ἄνω ὄντος τοῦ ὕδατος τὸ Μ δι<lb n="18,18"></lb>αύγιον, κρᾶμα ῥυήσεται· τοῦ δὲ ὕδατος ἐκρεύσαντος, <lb n="18,19"></lb>τότε καθαρὸς ὁ οἶνος ῥεύσει. </s> <s id="id.000208">ἔξεστι δὲ καὶ πλεονάκις <lb n="18,20"></lb>ἀνιέντα τὸ Μ διαύγιον διαφόρους τὰς ἐκρύσεις ποι<lb n="18,21"></lb>εῖσθαι. </s> <s id="id.000209">ἄμεινον δὲ προεγχέαντα ὕδωρ εἰς τὴν ΔΕΗΖ <lb n="18,22"></lb>χώραν καὶ καταλαβόντα τὸ διαύγιον οἶνον ἐπιχέειν· <lb n="18,23"></lb>συμβήσεται γὰρ ὁτὲ μὲν καθαρὸν οἶνον ἐκρέειν, ἀνε<lb n="18,24"></lb>θέντος δὲ τοῦ διαυγίου πάλιν κρᾶμα καὶ πάλιν ἀπο<lb n="18,25"></lb>ληφθέντος τοῦ διαυγίου καθαρὸν τὸν οἶνον ἐκρέειν. <lb n="18,26"></lb></s> <s id="id.000210">καὶ τοῦτο, ὁσάκις ἐὰν βουλώμεθα, ἔσται. <lb n="18,27"></lb></s> </p> <p n="19"> <s id="id.000211">Κρατῆρος ἐπικειμένου ἐπί τινος βάσεως πλήρους <lb n="19,1"></lb>ὄντος οἴνου, ὅσον ἐάν τις ἐξ αὐτοῦ ἀρύσηται, πάλιν <lb n="19,2"></lb>πλήρης ἔσται ὁ κρατήρ· κατασκευάζεται δὲ τὸν τρόπον <lb n="19,3"></lb>τοῦτον. <lb n="19,4"></lb></s> <s id="id.000212">Ἔστω ἀγγεῖον τὸ ΑΒ διαπεφραγμένον τὸ στόμιον <pb pagenum="104"></pb><lb n="19,5"></lb>τῷ ΓΔ διαφράγματι παρ' αὐτὸν τὸν τράχηλον· διὰ δὲ <lb n="19,6"></lb>τοῦ διαφράγματος καθείσθω σωλὴν ὁ ΕΖ ἀπέχων ἀπὸ <lb n="19,7"></lb>τοῦ πυθμένος βραχύ· ἕτερος δὲ διώσθω σωλὴν διὰ <lb n="19,8"></lb>τοῦ πυθμένος ὁ ΗΘ ἀπέχων ἀπὸ τοῦ ΓΔ διαφράγ<lb n="19,9"></lb>ματος βραχύ. </s> <s id="id.000213">ὁ δὲ τοῦ ἀγγείου πυθμὴν τετρήσθω <lb n="19,10"></lb>κατὰ τὸ Κ καὶ λαβέτω σωληνάριον τὸ ΚΛ. </s> <s id="id.000214">τὸ δὲ <lb n="19,11"></lb>ΑΒ ἀγγεῖον ἐπικείσθω ἐπί τινος βάσεως τῆς ΜΝΞΟ, <lb n="19,12"></lb>δι' ἧς ἔστω ἡ τοῦ ΗΘ σωλῆνος ὑπεροχή· ὁ δὲ εἰρη<lb n="19,13"></lb>μένος κρατὴρ ἔστω ὁ ΠΡ. </s> <s id="id.000215">διὰ δὲ τῆς ΜΝΞΟ βάσεως <lb n="19,14"></lb>σωλὴν ἔστω ὁ ΣΤ συντετρημένος τῇ τε βάσει καὶ τῷ <lb n="19,15"></lb>κρατῆρι. </s> <s id="id.000216">ἴσον ὕψος ἐχέτω τῷ Θ στομίῳ τοῦ ΗΘ <lb n="19,16"></lb>σωλῆνος. </s> <s id="id.000217">ἐγχέωμεν οὖν τὸν οἶνον διὰ τοῦ ΕΖ σω<lb n="19,17"></lb>λῆνος εἰς τὸ ΑΒ· ὁ γὰρ ἀὴρ ἐκχωρήσει διὰ τοῦ ΗΘ <lb n="19,18"></lb>σωλῆνος. </s> <s id="id.000218">ἐὰν οὖν ἀνεστομωμένον ᾖ τὸ ΚΛ σωληνά<lb n="19,19"></lb>ριον, ἐγχεόμενος ὁ οἶνος χωρήσει δι' αὐτοῦ εἰς τὴν <lb n="19,20"></lb>βάσιν καὶ εἰς τὸν ΠΡ κρατῆρα· ἐὰν δὲ ἐπιστομωθῇ, <pb pagenum="106"></pb><lb n="19,21"></lb>τότε πληρωθήσεται τὸ ΑΒ ἀγγεῖον. </s> <s id="id.000219">ἐγχέωμεν οὖν <lb n="19,22"></lb>καὶ εἰς τὴν ΜΝΞΟ βάσιν καὶ εἰς τὸν ΠΡ κρατῆρα <lb n="19,23"></lb>τὸν οἶνον, ὥστε πλήρη εἶναι τὸν ΠΡ κρατῆρα καὶ τὴν <lb n="19,24"></lb>ΜΝΞΟ βάσιν πεπληρῶσθαι ἄχρι τοῦ Θ στομίου τοῦ <lb n="19,25"></lb>σωλῆνος. </s> <s id="id.000220">τούτου δὲ γενομένου καὶ φραγέντος τοῦ Ε, <lb n="19,26"></lb>οὐ [2ῥεύσει]2 διὰ τοῦ ΚΛ σωλῆνος ὁ ἐν τῷ ΑΒ ἀγγείῳ <lb n="19,27"></lb>οἶνος διὰ τὸ μὴ ἔχειν εἰς τὸν κενούμενον τόπον ἀέρα <lb n="19,28"></lb>ἀντικαταστῆναι ἄλλον· ἦν γὰρ αὐτῷ ἡ εἴσκρισις διὰ <lb n="19,29"></lb>τοῦ Ε στομίου. </s> <s id="id.000221">ὅταν οὖν ἀπαρυσώμεθα ἐκ τοῦ κρατῆ<lb n="19,30"></lb>ρος οἶνον, ἀναστομωθήσεται τὸ Θ στόμιον, καὶ παρ<lb n="19,31"></lb>είσδυσιν λαβόντος τοῦ ἀέρος πάλιν ῥεύσει ὁ οἶνος <lb n="19,32"></lb>εἴς τε τὴν βάσιν καὶ τὸν ΠΡ κρατῆρα, ἄχρις ἂν πλή<lb n="19,33"></lb>ρης γένηται. </s> <s id="id.000222">καὶ τοῦτο ἔσται, ὁσάκις ἐὰν ἀρυσώ<lb n="19,34"></lb>μεθα ἐκ τοῦ κρατῆρος οἶνον. </s> <s id="id.000223">δεήσει δὲ καὶ τὴν <lb n="19,35"></lb>ΜΝΞΟ βάσιν τετρῆσθαι τρηματίῳ τῷ Υ πρὸς τὸ <lb n="19,36"></lb>τὸν ἀντικαταλλασσόμενον ἀέρα εἰς τὸ ΑΒ ἀγγεῖον διὰ <lb n="19,37"></lb>τοῦ Η στομίου εἰσχωρεῖν καὶ διὰ τοῦ Υ τρήματος. <lb n="19,38"></lb></s> </p> <p n="20"> <s id="id.000224">Ἐὰν εἰς χρείαν βουλώμεθα τὸ αὐτὸ σκευάσαι, ὥστε <lb n="20,1"></lb>κρατῆρος ὄντος ἔν τινι τόπῳ πλεῖον ἀρύεσθαι ἐξ αὐτοῦ <lb n="20,2"></lb>ὕδωρ καὶ ἀεὶ πλήρη εἶναι τὸν κρατῆρα, κατασκευάζεται <lb n="20,3"></lb>οὕτως. <lb n="20,4"></lb></s> <s id="id.000225">Ἔστω ἀγγεῖον τὸ ΑΒ, ἐν ᾧ ἔνδοθεν ἔστω ὕδατος <pb pagenum="108"></pb><lb n="20,5"></lb>αὔταρκες πρὸς τὴν μέλλουσαν χρείαν· κρουνὸς δὲ ἐξ <lb n="20,6"></lb>αὐτοῦ ἔστω ὁ ΓΔ, [2καὶ]2 ὑποκείσθω αὐτῷ ληνὸς ἡ <lb n="20,7"></lb>ΗΘ· κανόνιον δέ τι παρὰ τὸν κρουνὸν κηλωνευέσθω <lb n="20,8"></lb>τὸ ΕΖ, οὗ πρὸς μὲν τὸ Ε ἄκρον ἐκκρεμάσθω φελλὸς <lb n="20,9"></lb>ὁ Κ ἐνὼν ἐν τῇ ληνῷ· πρὸς δὲ τῷ Ζ ἁλυσείδιον ἀπο<lb n="20,10"></lb>δεδέσθω βάρος μολιβοῦν ἔχον τὸ Ξ. </s> <s id="id.000226">ἔστω [2δὲ]2 οὕτως <lb n="20,11"></lb>ἐσκευασμένον, ὥστε ἐπινηχομένου τοῦ Κ φελλοῦ εἰς <lb n="20,12"></lb>τὸ ἐν τῇ ΘΗ ληνῷ ὕδωρ ἀποκλείεσθαι τὸν κρουνόν, <lb n="20,13"></lb>ἀρθέντος δὲ ὕδατος ἀπὸ τῆς ληνοῦ καθίσαντα τὸν <lb n="20,14"></lb>φελλὸν ἀνοῖξαι τὸν κρουνόν, ὥστε πάλιν ἐπιρρεῦσαν <lb n="20,15"></lb>τὸ ὕδωρ μετεωρίσαι τὸν φελλὸν καὶ πάλιν ἀποκλει<lb n="20,16"></lb>σθῆναι τὸν κρουνόν· δεήσει δὲ τὸν φελλὸν βαρύτερον <lb n="20,17"></lb>εἶναι τοῦ πρὸς τῷ Ξ βάρους. </s> <s id="id.000227">ἔστω δὲ καὶ ὁ εἰρη<pb pagenum="110"></pb><lb n="20,18"></lb>μένος κρατὴρ ἐν τόπῳ τινὶ κείμενος ὁ ΛΜ, οὗ τὸ <lb n="20,19"></lb>χεῖλος ἔστω ἐν αὐτῇ τῇ ἐπιφανείᾳ τοῦ ἐν τῇ ληνῷ <lb n="20,20"></lb>ὕδατος, ὅτε οὐκέτι ἐπιρρέει ὁ κρουνὸς τοῦ φελλοῦ <lb n="20,21"></lb>ἐπινηχομένου. </s> <s id="id.000228">φερέτω δὲ καὶ ἐκ τῆς ληνοῦ σωλὴν <lb n="20,22"></lb>εἰς τὸν πυθμένα τοῦ κρατῆρος ὁ ΘΝ. </s> <s id="id.000229">ὅταν ἄρα πλή<lb n="20,23"></lb>ρους ὄντος τοῦ κρατῆρος ἀρύσῃ τις ὕδωρ, συγκενώσει <lb n="20,24"></lb>καὶ τὸ ἐν τῇ ΘΗ ληνῷ ὕδωρ· καὶ καθίσας ὁ φελλὸς <lb n="20,25"></lb>ἀνοίξει τὸν κρουνόν, καὶ τὸ ἐπιρρέον εἴς τε τὴν <lb n="20,26"></lb>ληνὸν καὶ τὸν κρατῆρα ἐνεχθήσεται καὶ μετεωρίσει <lb n="20,27"></lb>τὸν φελλόν, ὥστε πάλιν μηκέτι ἐπιρρέειν. </s> <s id="id.000230">καὶ τοῦτο <lb n="20,28"></lb>ἔσται, ὁσάκις ἂν ἀφέληταί τις ἐκ τοῦ κρατῆρος ὕδωρ. <lb n="20,29"></lb></s> </p> <p n="21"> <s id="id.000231">Εἰς ἔνια σπονδεῖα πενταδράχμου νομίσματος ἐμ<lb n="21,1"></lb>βληθέντος, ὕδωρ ἀπορρέει εἰς τὸ περιρραίνεσθαι. <lb n="21,2"></lb></s> <s id="id.000232">Ἔστω σπονδεῖον ἢ θησαυρὸς ὁ ΑΒΓΔ, οὗ στό<lb n="21,3"></lb>μιον ἔστω τὸ Α ἀνεστομωμένον, ἐν δὲ τῷ θησαυρῷ <lb n="21,4"></lb>ἀγγεῖον ἔστω τὸ ΖΗΘΚ ἔχον ὕδωρ καὶ πυξίδα τὴν <lb n="21,5"></lb>Λ, ἐξ ἧς κρουνὸς ἔξω φερέτω ὁ ΛΜ. </s> <s id="id.000233">παρακείσθω δὲ <lb n="21,6"></lb>τῷ ἀγγείῳ ὄρθιος κανὼν ὁ ΝΞ, περὶ ὃν ἕτερος κηλω<lb n="21,7"></lb>νευέσθω ὁ ΟΠ ἔχων πρὸς μὲν τῷ Ο πλατυσμάτιον <lb n="21,8"></lb>τὸ Ρ παράλληλον τῳ̂ πυθμένι τοῦ ἀγγείου, πρὸς δὲ <pb pagenum="112"></pb><lb n="21,9"></lb>τῷ [2Π κανόνιον τὸ]2 ΠΣ ἔχον πρὸς τῷ Σ ἁρμοστὸν <lb n="21,10"></lb>πῶμα τῇ Λ πυξίδι, ὥστε μὴ ῥέειν τὸ ὕδωρ διὰ τοῦ <lb n="21,11"></lb>ΛΜ σωλῆνος. </s> <s id="id.000234">ἔστω δὲ τὸ πῶμα τῆς πυξίδος βαρύ<lb n="21,12"></lb>τερον τοῦ Ρ πλατυσματίου, κουφότερον δὲ συναμφο<lb n="21,13"></lb>τέρων τοῦ τε νομίσματος καὶ τοῦ πλατυσματίου. </s> <s id="id.000235">ὅταν <lb n="21,14"></lb>οὖν ἐμβληθῇ διὰ τοῦ Α στομίου τὸ νόμισμα, ἐπι<lb n="21,15"></lb>πεσεῖται τῷ Ρ πλατυσματίῳ καὶ καταβαρῆσαν ἐγκλινεῖ <lb n="21,16"></lb>μὲν τὸ ΟΠ κανόνιον, ἐπαρεῖ δὲ τὸ πῶμα τῆς πυξίδος, <lb n="21,17"></lb>ὥστε ῥεῦσαι τὸ ὕδωρ· ἀποπεσόντος δὲ τοῦ νομίσματος <lb n="21,18"></lb>πάλιν τὸ πῶμα ἐπιπεσὸν ἀποκλείσει τὴν πυξίδα, ὥστε <lb n="21,19"></lb>μηκέτι ῥέειν τὸ ὕδωρ. <lb n="21,20"></lb></s> </p> <p n="22"> <s id="id.000236">Εἰς ἀγγεῖον πολλῶν γενῶν ἐμβληθέντων ὑγροῦ <lb n="22,1"></lb>διὰ τοῦ αὐτοῦ στομίου, ἰδίᾳ ἕκαστον ἀπορρέειν διὰ <lb n="22,2"></lb>τοῦ αὐτοῦ κρουνοῦ, ὡς ἂν προαιρώμεθα. <lb n="22,3"></lb></s> <s id="id.000237">Ἔστω τι ἀγγεῖον τὸ ΑΒ διαπεφραγμένον τὸν <lb n="22,4"></lb>τράχηλον τῷ ΓΔ διαφράγματι. </s> <s id="id.000238">ἐχέτω δὲ διαφράγματα <lb n="22,5"></lb>ὄρθια καὶ ἀνατείνοντα μέχρι τοῦ διαφράγματος, ποι<lb n="22,6"></lb>οῦντα χώρας τοσαύτας, ὅσα βουλόμεθα ἐμβαλεῖν ὑγρά. <lb n="22,7"></lb><pb pagenum="114"></pb></s> <s id="id.000239">καὶ ἔστω διάφραγμα <lb n="22,8"></lb>τὸ ΖΕ· ἐν δὲ τῷ ΓΔ διαφράγματι τρυπήματα ἔστω <lb n="22,9"></lb>λεπτὰ καθάπερ ἠθμοειδῆ, φέροντα εἰς ἑκατέραν χώραν· <lb n="22,10"></lb>ὑπὸ δὲ τὸ διάφραγμα διαύγια ἔστω τὰ Η, Θ φέροντα <lb n="22,11"></lb>εἰς τὰς χώρας· ἐκ δὲ τοῦ πυθμένος σωληνάρια ἔστω <lb n="22,12"></lb>τὰ Κ, Λ συντετρημένα ταῖς χώραις καὶ φέροντα εἰς <lb n="22,13"></lb>ἕνα κρουνίσκον κοινὸν τὸν Μ. </s> <s id="id.000240">ἐὰν [2οὖν]2 καταλαβό<lb n="22,14"></lb>μενοι τὰ Η, Θ διαύγια καὶ τὸν Μ κρουνὸν ἐγχέωμεν <lb n="22,15"></lb>διὰ τοῦ στόματος ἓν τῶν ὑγρῶν, εἰς οὐδεμίαν χώραν <lb n="22,16"></lb>εἰσελεύσεται διὰ τὸ τὸν ἐν αὐταῖς ἀέρα μὴ ἔχειν <lb n="22,17"></lb>ἔξοδον. </s> <s id="id.000241">ἐὰν δὲ ἀνῶμεν ἓν τῶν διαυγίων, εἰς ἐκείνην <lb n="22,18"></lb>ἐνεχθήσεται τὴν χώραν τὸ ὑγρόν, ἧς ἐστι καὶ τὸ δι<lb n="22,19"></lb>αύγιον. </s> <s id="id.000242">εἶτα πάλιν καταληφθέντος τοῦ διαυγίου ὅταν <lb n="22,20"></lb>ἕτερον ὑγρὸν ἐγχέωμεν καὶ ἀνῶμεν τὸ ἕτερον διαύγιον, <lb n="22,21"></lb>πάλιν εἰς τὴν ἑτέραν χώραν ἐνεχθήσεται τὸ ὑγρόν. <lb n="22,22"></lb><pb pagenum="116"></pb></s> <s id="id.000243">καταλαβόμενοι οὖν τὰ διαύγια πάντα σὺν τοῖς ἠθμοῖς <lb n="22,23"></lb>ὅταν ἀνῶμεν τὸν Μ κρουνόν, οὐ μὴ ῥεύσῃ, ἐὰν μὴ <lb n="22,24"></lb>ἓν τῶν διαυγίων ἀνεθῇ. </s> <s id="id.000244">καὶ τότε τοῦ ἀέρος παρείσ<lb n="22,25"></lb>δυσιν ἐσχηκότος ῥυήσεται τὸ ἐν ἐκείνῃ τῇ χώρᾳ ὑγρόν· <lb n="22,26"></lb>καταληφθέντος δὲ τοῦ διαυγίου καὶ τοῦ ἑτέρου ἀνε<lb n="22,27"></lb>θέντος τὸ αὐτὸ συμβήσεται. <lb n="22,28"></lb></s> </p> <p n="23"> <s id="id.000245">Δύο ἀγγείων ὄντων ἐπί τινος βάσεως καὶ τοῦ <lb n="23,1"></lb>μὲν ἑνὸς πλήρους ὄντος οἴνου, τοῦ δὲ ἑτέρου ὑπάρ<lb n="23,2"></lb>χοντος κενοῦ, ὅσον ἐὰν εἰς τὸ κενὸν ἀγγεῖον ὕδωρ <lb n="23,3"></lb>ἐγχέωμεν, τοσοῦτος ὁ οἶνος ἐκ τοῦ ἑτέρου ῥυήσεται· <lb n="23,4"></lb>κατασκευάζεται δὲ οὕτως. <lb n="23,5"></lb></s> <s id="id.000246">Ἔστω ἐπί τινος βάσεως τῆς ΑΒ δύο ἀγγεῖα τὰ <lb n="23,6"></lb>ΓΔ, ΕΖ διαπεφραγμένα τὰ στόμια τοῖς ΗΘ, ΚΛ δια<pb pagenum="118"></pb><lb n="23,7"></lb>φράγμασι. </s> <s id="id.000247">σωλὴν δὲ ὁ ΜΝΞΟ διὰ τῆς βάσεως διώσθω <lb n="23,8"></lb>καὶ ἀνακεκάμφθω εἰς τὰ ἀγγεῖα ἀπέχων ἀπὸ τῶν δια<lb n="23,9"></lb>φραγμάτων βραχὺ κατὰ τὰ Μ, Ο. </s> <s id="id.000248">καὶ ἐν μὲν τῷ ΕΖ <lb n="23,10"></lb>καμπύλος σίφων ἔστω ὁ ΠΡΣ τὴν κυρτότητα ἔχων <lb n="23,11"></lb>πρὸς τῷ στόματι τοῦ ἀγγείου· τὸ δὲ ἕτερον σκέλος <lb n="23,12"></lb>αὐτοῦ ἐκτὸς φερέτω εἰς κρουνὸν διεσκευασμένον. </s> <s id="id.000249">διὰ <lb n="23,13"></lb>δὲ τοῦ ΗΘ διαφράγματος καθείσθω χώνη ἡ ΤΥ, ἧς <lb n="23,14"></lb>ὁ καυλὸς συνεστεγνώσθω τῷ διαφράγματι καὶ ἀπε<lb n="23,15"></lb>χέτω ἀπὸ τοῦ πυθμένος βραχύ. </s> <s id="id.000250">ἐγκεχύσθω δὲ διά τινος <lb n="23,16"></lb>τρυπήματος τοῦ Φ εἰς τὸ ΕΖ ἀγγεῖον οἶνος, ὃ μετὰ <lb n="23,17"></lb>τὴν ἔγχυσιν πάλιν ἀπεστεγνώσθω. </s> <s id="id.000251">ἐὰν οὖν ἐγχέωμεν <lb n="23,18"></lb>διὰ τῆς χώνης ὕδωρ εἰς τὸ ΓΔ ἀγγεῖον, συμβήσεται <lb n="23,19"></lb>τὸν ἐν αὐτῷ ἀέρα ἐκθλιβόμενον χωρεῖν εἰς τὸ ΖΕ <lb n="23,20"></lb>ἀγγεῖον διὰ τοῦ ΜΝΞΟ σωλῆνος· ὁ δὲ μεταχωρῶν <lb n="23,21"></lb>ἐκθλίψει τὸν ἐν τῷ ΕΖ ἀγγείῳ οἶνον· καὶ τοῦτο <lb n="23,22"></lb>ἔσται, ὁσάκις ἐὰν ὕδωρ ἐγχέωμεν. </s> <s id="id.000252">καὶ δῆλον ὅτι ἐκ<lb n="23,23"></lb>θλιβόμενος ὁ ἀὴρ ἴσον ὄγκον ἔχει τῷ ἐγχυνομένῳ <lb n="23,24"></lb>ὕδατι καὶ τοσοῦτον οἶνον ἐκθλίψει. </s> <s id="id.000253">καὶ ἐὰν μηδὲ σίφων <lb n="23,25"></lb>ᾖ καμπύλος, ἀλλὰ μόνον κρουνὸς πρὸς τῷ Σ, δύναται <lb n="23,26"></lb>τὸ αὐτὸ γενέσθαι, ἐὰν μὴ τοῦ ὕδατος ἡ βία κατακρα<lb n="23,27"></lb>τήσῃ τοῦ κρουνοῦ. <lb n="23,28"></lb></s> </p> <p n="24"> <s id="id.000254">Ἀγγείου ὄντος κενοῦ καὶ ἑτέρου οἶνον ἔχοντος, <lb n="24,1"></lb>ὅσον ἐὰν ὕδωρ εἰς τὸ κενὸν ἀγγεῖον ἐμβάλωμεν, το<pb pagenum="120"></pb><lb n="24,2"></lb>σοῦτον διὰ κρουνοῦ ληψόμεθα κεκραμένον ᾧ ἐὰν <lb n="24,3"></lb>βουλώμεθα εἶναι λόγῳ· ἔστω δὲ τὸ ὕδωρ τοῦ οἴνου <lb n="24,4"></lb>διπλάσιον. <lb n="24,5"></lb></s> <s id="id.000255">Ἔστω τὸ κενὸν ἀγγεῖον τὸ ΑΒ ἤτοι κυλινδρικὸν <lb n="24,6"></lb>ἢ στερεὸν παραλληλεπίπεδον ὀρθογώνιον· τούτῳ δὲ <lb n="24,7"></lb>ἕτερον παρακείσθω στεγνὸν <lb n="24,8"></lb>πάντοθεν καὶ ἐπὶ τῆς αὐτῆς <lb n="24,9"></lb>βάσεως κείμενον τὸ ΓΔ ἤτοι <lb n="24,10"></lb>ὁμοίως κυλινδρικὸν ἢ στερεὸν <lb n="24,11"></lb>παραλληλεπίπεδον ὀρθογώνι<lb n="24,12"></lb>ον· ἡ δὲ τοῦ ΑΒ βάσις διπλα<lb n="24,13"></lb>σία ἔστω τῆς τοῦ ΓΔ βάσεως, <lb n="24,14"></lb>ἐπειδήπερ βουλόμεθα τὸ ὕδωρ <lb n="24,15"></lb>τοῦ οἴνου εἶναι διπλάσιον. <lb n="24,16"></lb></s> <s id="id.000256">τούτῳ δὴ παρακείσθω ἕτερον ἀγγεῖον στεγνὸν τὸ ΖΕ, <pb pagenum="122"></pb><lb n="24,17"></lb>ἐν ᾧ ἐγχυθήσεται ὁ οἶνος· καὶ δι' ἀμφοτέρων τῶν ΓΔ, <lb n="24,18"></lb>ΕΖ σωλὴν ἔστω ὁ ΗΘΚ συντετρημένος τοῖς ἐπιφράγ<lb n="24,19"></lb>μασιν αὐτῶν καὶ συνεστεγνωμένος· τὸ δὲ ΕΖ ἀγγεῖον <lb n="24,20"></lb>ἐχέτω καμπύλον σωλῆνα τὸν ΛΜΝ, οὗ τὸ μὲν ἐντὸς <lb n="24,21"></lb>σκέλος ἀπεχέτω τοῦ πυθμένος τοῦ ἀγγείου ὅσον ὕδατι <lb n="24,22"></lb>διάρρυσιν· τὸ δὲ ἕτερον ἐκτὸς ἐπικεκάμφθω καὶ φερέτω <lb n="24,23"></lb>εἰς ἀγγεῖον ἕτερον τὸ ΞΟ, ἐξ οὗ σωλὴν ὁ ΠΡ φερέτω <lb n="24,24"></lb>διὰ πάντων τῶν ἀγγείων ἢ καὶ ὑποβεβλημένος ὑπὸ <lb n="24,25"></lb>τὴν ἕδραν τῶν ἀγγείων τάσσεται, ἵνα κάτω φέρηται <lb n="24,26"></lb>ῥᾳδίως αὐτὸς εἰς τὸ παρὰ τὸν πυθμένα τοῦ ΑΒ ἀγ<lb n="24,27"></lb>γείου μέρος. </s> <s id="id.000257">ἕτερος δὲ σωλὴν ὁ ΤΣ συντετρήσθω τοῖς <lb n="24,28"></lb>ΑΒ, ΓΔ ἀγγείοις· ἐχέτω δὲ καὶ τὸ ΑΒ ἀγγεῖον παρὰ <lb n="24,29"></lb>τὸν πυθμένα κρουνίσκον τὸν Υ. </s> <s id="id.000258">οἱ δὲ ΡΠ, Υ κρου<lb n="24,30"></lb>νίσκοι ἐμπεριλαμβανέσθωσαν κρουνῷ τῷ ΦΧ κλειδίον <lb n="24,31"></lb>ἔχοντι, δι' οὗ ἀνοιχθήσεται καὶ κλεισθήσεται, ὁπόταν <lb n="24,32"></lb>προαιρώμεθα. </s> <s id="id.000259">τούτων δὴ κατασκευασθέντων καὶ ἀπο<pb pagenum="124"></pb><lb n="24,33"></lb>κλεισθέντος τοῦ ΧΦ κρουνοῦ ἐὰν ἐμβάλωμεν ὕδωρ <lb n="24,34"></lb>εἰς τὸ ΑΒ ἀγγεῖον, μεταχωρήσει μέρος αὐτοῦ καὶ εἰς <lb n="24,35"></lb>τὸ ΓΔ ἀγγεῖον, τουτέστι τὸ ἥμισυ, διὰ τοῦ ΣΤ σω<lb n="24,36"></lb>λῆνος· τὸ δὲ ἐμπεσὸν ὑγρὸν εἰς τὸ ΓΔ ἀγγεῖον ἐκ<lb n="24,37"></lb>θλίψει τὸν ἴσον αὐτῷ ἀέρα διὰ τοῦ ΗΘΚ σωλῆνος <lb n="24,38"></lb>εἰς τὸ ΕΖ ἀγγεῖον· οὗτος δὲ τὸν ἴσον οἶνον ἐκθλίψει <lb n="24,39"></lb>διὰ τοῦ ΛΜΝ σωλῆνος εἰς τὸ ΞΟ ἀγγεῖον. </s> <s id="id.000260">ὅταν ἄρα <lb n="24,40"></lb>ἀνοίξωμεν τὸν ΧΦ κρουνόν, ῥεύσει δι' αὐτοῦ τό τε <lb n="24,41"></lb>ἐμβληθὲν ὕδωρ εἰς τὸ ΑΒ ἀγγεῖον καὶ ὁ οἶνος ἐκ τοῦ <lb n="24,42"></lb>ΞΟ ἀγγείου διὰ τοῦ ΠΡ σωλῆνος ἐνεχθείς· καὶ ἔσται <lb n="24,43"></lb>γεγονὸς τὸ προκείμενον. </s> <s id="id.000261">πάλιν οὖν κενὰ μενεῖ τὰ ἀγ<lb n="24,44"></lb>γεῖα, ὅταν ἐκρυέντος τοῦ κράματος ὁ ἀὴρ χωρήσῃ εἰς <lb n="24,45"></lb>αὐτὰ διὰ τοῦ ΠΡ σωλῆνος. <lb n="24,46"></lb></s> </p> <p n="25"> <s id="id.000262">Ἀγγείου ὄντος, ἐν ᾧ ὕδωρ ἐστί, καὶ κρουνοῦ <lb n="25,1"></lb>ὑπάρχοντος ἐν αὐτῷ, ἐν ᾧ κλείς ἐστι, ζῳδίου δ' ἐπινη<lb n="25,2"></lb>χομένου ἐπὶ τοῦ ὕδατος, ὅσον ἂν διὰ τοῦ κρουνοῦ <lb n="25,3"></lb>ἀφέλωμεν ὕδωρ ἐκ τοῦ ζῳδίου οἶνος ἐπιρρεύσει πρὸς <lb n="25,4"></lb>λόγον τὸν δοθέντα τῷ ἀφαιρεθέντι ὕδατι. <lb n="25,5"></lb></s> <s id="id.000263">Ἔστω γὰρ τὸ τοῦ ὕδατος ἀγγεῖον τὸ ΑΒ κρουνὸν <lb n="25,6"></lb>ἔχον τὸν Γ ἀποκλειόμενον· ἐπὶ δὲ τοῦ ὕδατος ἐπινη<pb pagenum="126"></pb><lb n="25,7"></lb>χέσθω λεβητάριον τὸ Δ ἔχον ὄρθιον σωλῆνα τὸν ΕΖ <lb n="25,8"></lb>εἰς ζῴδιον διεσκευασμένον· τὸ δὲ τὸν οἶνον ἔχον ἀγ<lb n="25,9"></lb>γεῖον παρακείσθω· καὶ ἔστω τὸ ΗΘ, ἐν ᾧ καμπύλος <lb n="25,10"></lb>σίφων ἔστω ὁ ΚΛΜ, οὗ τὸ μὲν ἓν σκέλος ἐντὸς ἔστω <lb n="25,11"></lb>τοῦ ΗΘ ἀγγείου, τὸ δὲ ἕτερον ἐκτὸς καὶ φέρον εἰς <lb n="25,12"></lb>τὸν ΕΖ σωλῆνα. </s> <s id="id.000264">ἐὰν οὖν ἐπισπασώμεθα διὰ τοῦ Μ <lb n="25,13"></lb>καταστομίου τὸν οἶνον, ῥεύσει εἰς τὸν ΕΖ σωλῆνα, <lb n="25,14"></lb>ἄχρις ἂν ἡ τοῦ οἴνου ἐπιφάνεια ἥ τε ἐν τῷ ΗΘ ἀγ<lb n="25,15"></lb>γείῳ καὶ ἡ ἐν τῷ ΕΖ σωλῆνι ἐπὶ μιᾶς εὐθείας γένη<lb n="25,16"></lb>ται· γεγονέτω δὲ κατὰ τὴν ΝΞΟΠ εὐθεῖαν. </s> <s id="id.000265">καὶ <lb n="25,17"></lb>παρὰ τὸ Π σημεῖον κρουνίσκος ἀνεῳγὼς ἔστω ὁ Ρ. <lb n="25,18"></lb></s> <s id="id.000266">ὅταν δὲ ἀφέ<lb n="25,19"></lb>λωμεν διὰ τοῦ Γ κρουνοῦ ὁσονδηποτοῦν ὕδωρ, κατα<lb n="25,20"></lb>βήσεται τὸ Δ λεβητάριον, σὺν ᾧ καὶ ὁ ΕΖ σωλήν, <lb n="25,21"></lb>ὥστε τὴν τοῦ οἴνου ἐπιφάνειαν τὴν ΟΠ ταπεινοτέραν <lb n="25,22"></lb>γενέσθαι τῆς ΝΞ ἐπιφανείας· καὶ διὰ τοῦτο ταπεινο<lb n="25,23"></lb>τέρου γενηθέντος τοῦ ἐκτὸς μέρους τοῦ σίφωνος, <lb n="25,24"></lb>πάλιν μεταχωρήσει ὁ οἶνος εἰς τὸν ΕΖ σωλῆνα καὶ <lb n="25,25"></lb>διὰ τοῦ Ρ κρουνοῦ εἰς τὸ ἐκτὸς ἐνεχθήσεται· καὶ τοῦτο <lb n="25,26"></lb>ἔσται, ὁσάκις ἐὰν ἀφελώμεθα διὰ τοῦ Γ κρουνοῦ ὕδωρ. <lb n="25,27"></lb></s> <s id="id.000267">ἀνάλογον τῷ ἀπορρυηθέντι ὕδατι ὁ οἶνος ἐπιρρεύσει. <lb n="25,28"></lb><pb pagenum="128"></pb></s> <s id="id.000268">ἐχέτω δὲ ἡ τοῦ ΑΒ ἀγγείου βάσις πρὸς τὴν τοῦ ΗΘ <lb n="25,29"></lb>ἀγγείου βάσιν τὸν ἐπιταχθέντα λόγον· καὶ οὕτως ἔσται <lb n="25,30"></lb>τὸ προκείμενον. <lb n="25,31"></lb></s> </p> <p n="26"> <s id="id.000269">Ἐὰν δὲ βουλώμεθα ἐγχέοντες ὕδωρ εἴς τι ἀγγεῖον <lb n="26,1"></lb>τούτῳ πρὸς λόγον τὸν οἶνον ἐπιρρεῦσαι, ποιήσομεν <lb n="26,2"></lb>οὕτως. <lb n="26,3"></lb></s> <s id="id.000270">Ἔστω γὰρ πάλιν τὸ μὲν ἔχον ἀγγεῖον τὸ ὕδωρ τὸ <lb n="26,4"></lb>ΑΒ, τὸ δὲ τὸν οἶνον ἔχον τὸ ΗΘ· ὁ δὲ ΕΖ σωλὴν ἐκτὸς <lb n="26,5"></lb>ἔστω τοῦ ΑΒ ἀγγείου· <lb n="26,6"></lb>ἐν δὲ τῷ ΑΒ ἀγγείῳ <lb n="26,7"></lb>σφαῖρα ἐπινηχέσθω ἡ <lb n="26,8"></lb>Δ, ἐξ ἧς σπάρτος διὰ <lb n="26,9"></lb>τροχίλου τοῦ Γ ἀπο<lb n="26,10"></lb>δεδέσθω εἰς τὸν ΕΖ <lb n="26,11"></lb>σωλῆνα, ὥστε αὐτὸν <lb n="26,12"></lb>κρέμασθαι· τὰ δὲ ἄλλα <lb n="26,13"></lb>ταὐτὰ πάντα ἔστω τοῖς <lb n="26,14"></lb>ἐπάνω εἰρημένοις. </s> <s id="id.000271">συμβήσεται οὖν ἐμβληθέντος τοῦ <lb n="26,15"></lb>ὕδατος εἰς τὸ ΑΒ ἀγγεῖον μετεωριζόμενον τὸ Δ σφαιρίον <lb n="26,16"></lb>χαλᾶν τὸν ΕΖ σωλῆνα, ὥστε πάλιν ἐπιρρέειν τὸν οἶνον. <lb n="26,17"></lb><pb pagenum="130"></pb></s> </p> <p n="27"> <s id="id.000272">Δύναται δὲ καὶ ἄλλως. <lb n="27,1"></lb></s> <s id="id.000273">Ἡ γὰρ ἐκ τοῦ Δ σφαιρίου σπάρτος ἀποδεδόσθω <lb n="27,2"></lb>διὰ τοῦ Γ τροχίλου εἰς ἕτερον τροχιλίδιον τὸ Σ καὶ <lb n="27,3"></lb>ἐκδεδέσθω διὰ τούτου εἰς τὸν ΚΛΜ διαβήτην. </s> <s id="id.000274">συμ<lb n="27,4"></lb>βήσεται γὰρ μετεωριζομένου τοῦ σφαιρίου χαλᾶσθαι <lb n="27,5"></lb>τὸν ΚΛΜ διαβήτην κρεμάμενον ἐκ τῆς σπάρτου, ὥστε <lb n="27,6"></lb>πάλιν μείζονος γενηθέντος τοῦ ἐκτὸς σκέλους τοῦ σί<lb n="27,7"></lb>φωνος τὸν οἶνον ῥέειν διὰ τοῦ Μ στομίου. <lb n="27,8"></lb></s> </p> <p n="28"> <s id="id.000275">Οἱ δὲ σίφωνες, οἷς χρῶνται εἰς τοὺς ἐμπρησμούς, <lb n="28,1"></lb>κατασκευάζονται οὕτως. <lb n="28,2"></lb></s> <s id="id.000276">Ἔστωσαν δύο πυξίδες χαλκαῖ κατατετορνευμέναι <lb n="28,3"></lb>τὴν ἐντὸς ἐπιφάνειαν πρὸς ἐμβολέα, καθάπερ αἱ τῶν <lb n="28,4"></lb>ὑδραύλεων πυξίδες, αἱ ΑΒΓΔ, ΕΖΗΘ· ἐμβολεῖς δὲ <lb n="28,5"></lb>αὐταῖς ἔστωσαν ἁρμοστοὶ οἱ ΚΛ, ΜΝ· συντετρήσθω<lb n="28,6"></lb>σαν δὲ πρὸς ἀλλήλας αἱ πυξίδες διὰ σωλῆνος τοῦ <pb pagenum="132"></pb><lb n="28,7"></lb>ΞΟΔΖ. </s> <s id="id.000277">ἐκ δὲ τῶν ἐκτὸς μερῶν αἱ πυξίδες ἐντὸς τοῦ <lb n="28,8"></lb>ΞΟΔΖ σωλῆνος ἐχέτωσαν ἀσσάρια προκείμενα, οἷα <lb n="28,9"></lb>εἴρηται ἐν τοῖς ἐπάνω, τὰ Π, Ρ, ὥστε εἰς τὸ ἐκτὸς <lb n="28,10"></lb>τῶν πυξιδίων ἀνοίγεσθαι μέρος. </s> <s id="id.000278">ἐχέτωσαν δὲ καὶ ἐν <lb n="28,11"></lb>τοῖς πυθμέσιν αἱ πυξίδες τρήματα στρογγύλα τὰ Σ, <lb n="28,12"></lb>Τ ἐπιπωμαννύμενα τυμπανίοις ἐσμηρισμένοις τοῖς ΥΦ, <lb n="28,13"></lb>ΧΨ, δι' ὧν περόνια διαβεβλήσθω ἐπικεκολλημένα ἢ <lb n="28,14"></lb>προσκεκοινωμένα τοῖς πυθμέσι τῶν πυξιδίων τὰ Ω, <lb n="28,15"></lb>Ω, ἔχοντα ἐκ τῶν ἄκρων κωλυμάτια πρὸς τὸ τὰ τυμ<lb n="28,16"></lb>πάνια μηκέτι ἐξέλκεσθαι ἐξ αὐτῶν. </s> <s id="id.000279">οἱ δὲ ἐμβολεῖς <lb n="28,17"></lb>ἐχέτωσαν ὄρθια συμφυῆ κανόνια μέσα τὰ #2, #4, οἷς <lb n="28,18"></lb>ἐπιζευγνύσθω κανὼν ὁ #5 #22Α κινούμενος περὶ μὲν τὸ <lb n="28,19"></lb>μέσον περὶ περόνην τὴν #22Δ μένουσαν, περὶ δὲ τὰ <lb n="28,20"></lb>κανόνια τὰ #2, #4 περὶ περόνας τὰς #22Β, #22Γ. </s> <s id="id.000280">τῷ δὲ ΞΟΔΖ <lb n="28,21"></lb>σωλῆνι συντετρήσθω ἕτερος σωλὴν ὄρθιος ὁ #22Ε #22#2 εἰς <lb n="28,22"></lb>δίχηλον διεσχισμένος κατὰ τὸ #22#2 καὶ ἔχων τὰ σμηρί<lb n="28,23"></lb>σματα, δι' ὧν ἀναπιέζει τὸ ὑγρόν, οἷα καὶ ἔμπροσθεν <pb pagenum="134"></pb><lb n="28,24"></lb>εἴρηται ἐν τῷ ἀναπυτίζοντι ὕδωρ ἀγγείῳ διὰ τοῦ <lb n="28,25"></lb>πεπιλημένου εἰς αὐτὸ ἀέρος. </s> <s id="id.000281">ἐὰν οὖν αἱ εἰρημέναι <lb n="28,26"></lb>πυξίδες σὺν τῇ πρὸς αὐτὰς κατασκευῇ ἐμβληθῶσιν εἰς <lb n="28,27"></lb>ὕδατος ἀγγεῖον τὸ #22Ζ #22Η #22Θ Μ;6Α;6 καὶ κηλωνεύηται ὁ #5 #22Α <lb n="28,28"></lb>κανὼν ἐκ τῶν ἄκρων αὐτοῦ τῶν #5, #22Α ἐναλλὰξ κινου<lb n="28,29"></lb>μένων περὶ τὴν #22Δ περόνην, οἱ ἐμβολεῖς καθιέμενοι <lb n="28,30"></lb>ἐκθλίψουσι διὰ τοῦ #22Ε #22#2 σωλῆνος καὶ τοῦ Μ;6Β;6 ἐπι<lb n="28,31"></lb>στρεπτοῦ στομίου τὸ ὑγρόν· ὁ γὰρ ΜΝ ἐμβολεὺς <lb n="28,32"></lb>ἀνασειόμενος μὲν ἀνοίγει τὸ Τ τρῆμα ἐπαιρομένου τοῦ <lb n="28,33"></lb>ΧΨ τυμπανίου, ἀποκλείει δὲ τὸ Ρ ἀσσάριον· καθιέ<lb n="28,34"></lb>μενος δὲ τὸ μὲν Τ ἀποκλείει, τὸ δὲ Ρ ἀνοίγει, δι' οὗ <lb n="28,35"></lb>καὶ τὸ ὕδωρ ἐκθλιβόμενον ἀναπιέζεται· τὰ δὲ αὐτὰ <lb n="28,36"></lb>συμβαίνει καὶ περὶ τὸν ΚΛ ἐμβολέα. </s> <s id="id.000282">τὸ μὲν οὖν Μ;6Β;6 <lb n="28,37"></lb>σωληνάριον ἀνανεῦον καὶ ἐπινεῦον τὸν ἐκπιτυσμὸν <lb n="28,38"></lb>πρὸς τὸ δοθὲν ὕψος ποιεῖται, οὐκέτι μέντοι πρὸς τὴν <lb n="28,39"></lb>δοθεῖσαν ἐπιστροφήν, εἰ μὴ ὅλον τὸ ὄργανον ἐπιστρέ<lb n="28,40"></lb>φεται· τοῦτο δὲ βραδὺ καὶ μοχθηρὸν πρὸς τὰς κατ<lb n="28,41"></lb>επειγούσας χρείας ὑπάρχει. </s> <s id="id.000283">ἵν' οὖν εὐκόπως εἰς τὸν <lb n="28,42"></lb>δοθέντα τόπον ἐκπιτύζηται τὸ ὑγρόν, ποιήσωμεν τὸν <lb n="28,43"></lb>#22Ε #22#2 σωλῆνα σύνθετον κατὰ τὸ μῆκος ἐκ δύο συνεσμη<lb n="28,44"></lb>ρισμένων ἀλλήλοις, ὧν ὁ μὲν εἷς συμφυὴς ἔστω τῷ <pb pagenum="136"></pb><lb n="28,45"></lb>ΞΟΔΖ σωλῆνι, ὁ δὲ ἕτερος τῷ διχήλῳ τῷ πρὸς τῷ <lb n="28,46"></lb>#22#2· ἐπιστρεφομένου γὰρ τοῦ ἐπάνω σωλῆνος καὶ ἐπι<lb n="28,47"></lb>νεύοντος τοῦ Μ;6Β;6 ὁ ἀναπιεσμὸς γίνεται, πρὸς ὃν ἐὰν <lb n="28,48"></lb>βουλώμεθα τόπον. </s> <s id="id.000284">ἕξει δὲ καὶ ὁ ἄνω συνεσμηρισμένος <lb n="28,49"></lb>σωλὴν κωλυμάτια πρὸς τὸ μὴ ὑπὸ τῆς τοῦ ὑγροῦ βίας <lb n="28,50"></lb>ἐκπίπτειν τοῦ ὀργάνου· ταῦτα δὲ ἔσται γαμμοειδῆ <lb n="28,51"></lb>συγκεκολλημένα αὐτῷ καὶ περὶ κρίκον στρεφόμενα περι<lb n="28,52"></lb>κείμενον τῷ ὑποκάτω σωλῆνι. <lb n="28,53"></lb></s> </p> <p n="29"> <s id="id.000285">Κατασκευάζεται δὲ ἔν τινι τόπῳ ὕδωρ ἐπίρρυτον <lb n="29,1"></lb>ἔχοντι ζῷον εἴτε χαλκοῦν εἴτε ἐξ ἄλλης τινὸς ὕλης· <lb n="29,2"></lb>προσενεχθέντος δὲ αὐτῷ ποτηρίου πίνει μετὰ ψόφου <lb n="29,3"></lb>καὶ βοῆς, ὥστε φαντασίαν ποιεῖν δίψης· ἔστι δὲ ἡ <lb n="29,4"></lb>κατασκευὴ τοιαύτη. <lb n="29,5"></lb></s> <s id="id.000286">Ἔστω τι ἀγγεῖον τὸ ΑΒ, ἐν ᾧ ἐπίρρυτόν ἐστι <lb n="29,6"></lb>κρουνισμάτιον τὸ Γ· ἐν δὲ τῷ ΑΒ ἀγγείῳ καμπύλος <lb n="29,7"></lb>σίφων ἔστω ἢ πνικτὸς διαβήτης ὁ ΔΕΖ, οὗ τὸ ἕτερον <lb n="29,8"></lb>σκέλος ἐκτὸς ὑπερεχέτω τοῦ πυθμένος τοῦ ἀγγείου. <lb n="29,9"></lb></s> <s id="id.000287">ὑποκείσθω δὲ τούτῳ βάσις στεγνὴ ἡ ΗΘΚΛ ἔχουσα <lb n="29,10"></lb>καὶ αὐτὴ ὁμοίως καμπύλον σίφωνα τὸν ΜΝΞ· ὑπο<lb n="29,11"></lb>κείσθω δὲ τῷ Ζ στομίῳ χώνη ἡ ΟΠ, ἧς ὁ καυλὸς <lb n="29,12"></lb>φερέτω εἰς τὴν ΗΘΚΛ βάσιν ἀπέχων ἀπὸ τοῦ πυθ<lb n="29,13"></lb>μένος ὅσον ὕδατι διάρρυσιν. </s> <s id="id.000288">τὸ δὲ τοῦ ζῳδίου στό<pb pagenum="138"></pb><lb n="29,14"></lb>μιον ἔστω πρὸς τῷ Ρ, δι' οὗ σωλὴν κείσθω φέρων <lb n="29,15"></lb>δι' ἑνὸς τῶν ποδῶν ἢ δι' ἄλλου τινὸς μέρους τοῦ <lb n="29,16"></lb>ζῳδίου κρυπτῶς εἰς τὴν βάσιν· ἔστω δὲ οὗτος ὁ ΡΣΤ. <lb n="29,17"></lb></s> <s id="id.000289">συμβήσεται οὖν πληρωθέντος τοῦ ΑΒ ἀγγείου ὑπερ<lb n="29,18"></lb>βλύσαν τὸ ὑγρὸν ἐνεχθῆναι εἰς τὴν ΠΟ χώνην καὶ <lb n="29,19"></lb>πληρῶσαι μὲν τὴν ΗΘΚΛ βάσιν, κενῶσαι δὲ τὸ ΑΒ <lb n="29,20"></lb>ἀγγεῖον. </s> <s id="id.000290">πάλιν δὴ πληρωθείσης τῆς βάσεως ὑπερ<lb n="29,21"></lb>βλύσαν τὸ ὕδωρ διὰ τοῦ ΜΝΞ σίφωνος κενώσει τὴν <lb n="29,22"></lb>βάσιν, ἧς κενουμένης ὁ ἀὴρ διὰ τοῦ Ρ στομίου ἀνα<lb n="29,23"></lb>πληρώσει τὸν κενούμενον τόπον. </s> <s id="id.000291">ὅταν ἄρα προσενέγ<lb n="29,24"></lb>κωμεν τῷ Ρ τὸ ποτήριον, πίεται μετὰ βίας ἐπισπώ<lb n="29,25"></lb>μενον ἀντὶ τοῦ ἀέρος τὸ ὑγρόν, ἄχρις ἂν ἡ βάσις <lb n="29,26"></lb>κενωθῇ ἐντός. </s> <s id="id.000292">οὕτω δὲ πάλιν τοῦ ΑΒ ἀγγείου πλη<lb n="29,27"></lb>ρωθέντος κενοῦται, καὶ ταὐτὰ ἔσται τοῖς εἰρημένοις. <lb n="29,28"></lb><pb pagenum="140"></pb></s> <s id="id.000293">ἵν' οὖν κατὰ τὸν δέοντα καιρόν, τουτέστι κενουμένης <lb n="29,29"></lb>τῆς βάσεως, προσφέρηται τὸ ποτήριον, ἔστω διὰ τῆς <lb n="29,30"></lb>ἐκρύσεως τῆς διὰ τοῦ ΜΝΞ διαβήτου κινούμενόν τι <lb n="29,31"></lb>ἐπιπίπτοντος τοῦ ὕδατος αὐτῷ, ἐν ᾧ ἀποβλέποντες ὅταν <lb n="29,32"></lb>κινῆται προσοίσομεν τὸ ποτήριον. <lb n="29,33"></lb></s> </p> <p n="30"> <s id="id.000294">Ἔστι δὲ καὶ ἄλλως ἐπιρρύτου ὄντος ὕδατος τοῦ <lb n="30,1"></lb>Πανίσκου ἐπιστρεφομένου πίνειν τὸ ζῷον. <lb n="30,2"></lb></s> <s id="id.000295">Ἔστω γὰρ στεγνὴ βάσις πάντοθεν ἡ ΑΒΓΔ διά<lb n="30,3"></lb>φραγμα ἔχουσα· ἐπὶ δὲ τῆς ἐφέδρας ἐφεστάτω τὸ ζῷον· <lb n="30,4"></lb>ὁ δὲ διὰ τοῦ στόματος αὐτοῦ σωλὴν ἔστω ὁ ΕΖΗ. <lb n="30,5"></lb></s> <s id="id.000296">ἐχέτω δὲ ἡ βάσις ἐν ἑαυτῇ καὶ καμπύλον σίφωνα τὸν <lb n="30,6"></lb>ΘΚΛ ἐν τῇ κάτω χώρᾳ, οὗ τὸ ἓν σκέλος ἐκτὸς ὑπερ<lb n="30,7"></lb>εχέτω τοῦ πυθμένος. </s> <s id="id.000297">διὰ δὲ τοῦ μέσου διαφράγματος <lb n="30,8"></lb>χώνη ἔστω ἡ ΜΝ, ἧς ὁ καυλὸς ἀπεχέτω ἀπὸ τοῦ <lb n="30,9"></lb>πυθμένος βραχύ. </s> <s id="id.000298">ἐπικείσθω δὲ τῇ ΑΒΓΔ βάσει ἑτέρα <lb n="30,10"></lb>βάσις ἡ ΞΟ, ἐφ' ἧς ἐφεστάτω Πανίσκος ὁ ΠΡ ἀξόνιον <lb n="30,11"></lb>ἔχων τὸ Σ ὑπερέχον εἰς τὸ ἄνω μέρος τῆς βάσεως, ᾧ <pb pagenum="142"></pb><lb n="30,12"></lb>συμφυὴς ἔστω σωλὴν ὁ ΤΥ ἔχων ἐκ τοῦ ἄκρου φιάλιον <lb n="30,13"></lb>συμφυὲς καὶ συντετρημένον αὐτῷ τὸ ΥΦ· τηλικοῦτος <lb n="30,14"></lb>δὲ ἔστω ὁ ΤΥ σωλήν, ὥστε ἐπιστραφέντος τοῦ Πα<lb n="30,15"></lb>νίσκου τὸ ΥΦ φιάλιον κεῖσθαι κατὰ τὴν ΜΝ χώνην <lb n="30,16"></lb>ὑπεράνω βραχύ. </s> <s id="id.000299">κατὰ δὲ τὴν ΜΝ χώνην ἐπὶ τῆς <lb n="30,17"></lb>βάσεως ἔστω φιάλιον τὸ ΧΨ συντετρημένον τῇ βάσει, <lb n="30,18"></lb>ἐν ᾧ φερέσθω τὸ ἐπίρρυτον ὕδωρ τὸ Ω τοσοῦτον, <lb n="30,19"></lb>ὥστε πλέον εἶναι τῆς διὰ τοῦ ΘΚΛ διαβήτου ἀπορ<lb n="30,20"></lb>ρύσεως. </s> <s id="id.000300">ἐνεχθήσεται ἄρα τὸ προειρημένον ὑγρὸν διὰ <lb n="30,21"></lb>τῆς ΜΝ χώνης εἰς τὸ κάτω μέρος τῆς ΑΒΓΔ βάσεως, <lb n="30,22"></lb>τοῦ ἐν αὐτῇ ἀέρος χωροῦντος διὰ τοῦ ΕΖΗ σωλῆνος. <lb n="30,23"></lb></s> <s id="id.000301">καὶ ἀεὶ ἔσται πλήρης ἡ βάσις τοῦ ὑγροῦ διὰ τὸ μεί<lb n="30,24"></lb>ζονα εἶναι τὴν ἐπίρρυσιν τῆς ἀπορρύσεως. </s> <s id="id.000302">ὅταν ἄρα <lb n="30,25"></lb>ἐπιστρέφωμεν τὸν Πανίσκον, τὸ ΥΦ φιάλιον ὑπὲρ <lb n="30,26"></lb>τὴν χώνην γενόμενον δέξεται τὴν Ω ἐπίρρυσιν, ἥτις <pb pagenum="144"></pb><lb n="30,27"></lb>διὰ τοῦ ΤΥ σωλῆνος εἰς ἕτερον χωρήσει τόπον. </s> <s id="id.000303">μη<lb n="30,28"></lb>κέτι οὖν ἐπιρρέοντος τοῦ ὑγροῦ εἰς τὸ κάτω μέρος <lb n="30,29"></lb>τῆς ΑΒΓΔ βάσεως, ὁ ΘΚΛ διαβήτης κενώσει αὐτήν, <lb n="30,30"></lb>τοῦ ἀέρος εἰσπίπτοντος διὰ τοῦ ΕΖΗ σωλῆνος, ὥστε <lb n="30,31"></lb>προσενεχθέντος τοῦ ποτηρίου πάλιν πίεται τὸ ζῷον. <lb n="30,32"></lb></s> </p> <p n="31"> <s id="id.000304">Δύναται δὲ καὶ ἄλλως πίνειν τὸ ζῷον μήτε ἐπιρ<lb n="31,1"></lb>ρύτου ὄντος ὕδατος μήτε ἄλλου τινὸς κινοῦντος τὸν <lb n="31,2"></lb>Πανίσκον. <lb n="31,3"></lb></s> <s id="id.000305">Ἔστω γὰρ βάσις μὲν ἡ ΑΒΓΔ· τὸ δὲ τοῦ ζῳδίου <lb n="31,4"></lb>στόμιον ἔστω πρὸς τῷ Ε, καὶ διὰ τῶν στέρνων τοῦ <lb n="31,5"></lb>ζῴου καὶ τοῦ ὀπισθίου ποδὸς ἢ τῆς οὐρᾶς ἀπὸ τοῦ Ε <pb pagenum="146"></pb><lb n="31,6"></lb>στόματος διώσθω σωλὴν ὁ ΕΖΗ φέρων εἰς τὸ ἐντὸς <lb n="31,7"></lb>τῆς βάσεως, καὶ τεθείσης ἀκινήτου τῆς βάσεως τετρυ<lb n="31,8"></lb>πήσθω ὁ ΕΖΗ σωλὴν ὁ διὰ τοῦ ζῴου λεπτῷ καὶ <lb n="31,9"></lb>δυσθεωρήτῳ τρυπήματι %τῷ Ε κειμένῳ πρὸς διαβήτην <lb n="31,10"></lb>τῷ Η στομίῳ. </s> <s id="id.000306">ἐὰν οὖν τις πληρώσῃ τὸν ΕΖΗ <lb n="31,11"></lb>διαβήτην ὕδατος διά τινος μετεώρου σωλῆνος, οὗ τὸ <lb n="31,12"></lb>ἄκρον πρόσκειται τῷ% Ε, μενεῖ πλήρης ὕδατος ὁ ΕΖΗ <lb n="31,13"></lb>διαβήτης διὰ τὸ ἐξ ἴσου κεῖσθαι τὰ στόμια αὐτοῦ. <lb n="31,14"></lb></s> <s id="id.000307">ὅταν οὖν προσενέγκωμεν τῷ Ε στομίῳ τὸ ποτήριον <lb n="31,15"></lb>καὶ βαπτισθῇ τι μέρος τοῦ στομίου, συμβήσεται τοῦ <lb n="31,16"></lb>ΕΖΗ διαβήτου τὸ πρὸς τῷ Η κῶλον μεῖζον γενέσθαι. <lb n="31,17"></lb></s> <s id="id.000308">καὶ διὰ τοῦτο ἐπισπάσεται τὸ ὑγρόν· τὸ δὲ ἐπισπώ<lb n="31,18"></lb>μενον φέρεται εἰς τὴν ΑΒΓΔ βάσιν. </s> <s id="id.000309">οὐκ ἀνάγκη δὲ <lb n="31,19"></lb>τὴν ΑΒΓΔ βάσιν στεγνοῦν ἐπὶ ταύτης τῆς κατα<lb n="31,20"></lb>σκευῆς. <lb n="31,21"></lb><pb pagenum="148"></pb></s> </p> <p n="32"> <s id="id.000310">Ἐν τοῖς Αἰγυπτίων ἱεροῖς πρὸς ταῖς παραστάσι <lb n="32,1"></lb>τροχοὶ χάλκεοι ἐπιστρεπτοὶ γίνονται πρὸς τὸ τοὺς <lb n="32,2"></lb>εἰσερχομένους ἐπιστρέφειν αὐτοὺς διὰ τὸ δοκεῖν τὸν <lb n="32,3"></lb>χαλκὸν ἁγνίζειν· ἔστι δὲ καὶ περιρραντήρια πρὸς τὸ <lb n="32,4"></lb>τοὺς εἰσερχομένους περιρραίνεσθαι. </s> <s id="id.000311">δέον οὖν ἔστω <lb n="32,5"></lb>ποιῆσαι, ὥστε ἐπιστραφέντος τοῦ τροχοῦ ὕδωρ ἐξ αὐτοῦ <lb n="32,6"></lb>ἐπιρρέειν εἰς τὸ ὡς εἴρηται περιρραίνεσθαι. <lb n="32,7"></lb></s> <s id="id.000312">Ἔστω ὄπισθεν τῆς παραστάδος κρυπτὸν ἀγγεῖον <lb n="32,8"></lb>ὕδατος τὸ ΑΒΓΔ τετρημένον τὸν πυθμένα τῷ Ε <lb n="32,9"></lb>τρήματι. </s> <s id="id.000313">ὑποκεκολλήσθω ὑπὸ τὸν πυθμένα αὐλίσκος <lb n="32,10"></lb>ὁ ΖΗΘΚ ἔχων καὶ αὐτὸς τρύπημα κατὰ τὸ ἐν τῷ <pb pagenum="150"></pb><lb n="32,11"></lb>πυθμένι τρῆμα· ἐντὸς δὲ τούτου ἕτερος αὐλίσκος <lb n="32,12"></lb>ὁ ΛΜ κατὰ μὲν τὸ Λ μέρος προσκεκολλημένος τῷ <lb n="32,13"></lb>ΖΗΘΚ, κατὰ δὲ τὸ Ε τρῆμα καὶ αὐτὸς τρῆμα ἔχων <lb n="32,14"></lb>τὸ Π· μεταξὺ δὲ τῶν εἰρημένων δύο αὐλίσκων ἕτερός <lb n="32,15"></lb>ἐστιν ὁ ΝΞΟΡ συνεσμηρισμένος ἀμφοτέροις καὶ ἔχων <lb n="32,16"></lb>τρῆμα κατὰ τὸ Ε τρῆμα τὸ Σ. </s> <s id="id.000314">καταλλήλων οὖν τού<lb n="32,17"></lb>των τῶν τρημάτων ὄντων, ἐὰν ἐγχέῃ τις εἰς τὸ ΑΒΓΔ <lb n="32,18"></lb>ἀγγεῖον ὕδωρ, ἔξω ῥεύσει διὰ τοῦ ΛΜ αὐλίσκου· ἐὰν <lb n="32,19"></lb>δὲ ἐπιστρέφωμεν τὸν ΝΞΟΡ αὐλίσκον, ὡς παραλλάξαι <lb n="32,20"></lb>τὸ Σ τρῆμα, οὐκέτι ῥεύσει. </s> <s id="id.000315">γεγονέτω οὖν ὁ τροχὸς <lb n="32,21"></lb>συμφυὴς τῷ ΝΞΟΡ αὐλίσκῳ, ὥστε ἐπιστρεφομένου <lb n="32,22"></lb>αὐτοῦ πλεονάκις τὸ ὕδωρ ῥεύσει. <lb n="32,23"></lb><pb pagenum="152"></pb></s> </p> <p n="33"> <s id="id.000316">Ἀγγείου ὄντος ἑνός, ἐμβαλεῖν διὰ τοῦ στόματος <lb n="33,1"></lb>αὐτοῦ οἴνων πλείονα γένη καὶ διὰ τοῦ αὐτοῦ κρουνοῦ <lb n="33,2"></lb>λαμβάνειν ἕκαστον αὐτῶν, ὃ ἐάν τις προαιρῆται, ὥστε <lb n="33,3"></lb>πλειόνων ἐμβαλόντων τοὺς οἴνους ἕκαστον τὸν ἴδιον <lb n="33,4"></lb>δέξασθαι κατὰ μέρος, ὅσος ἐὰν ᾖ ὁ ἀφ' ἑκάστου ἐμ<lb n="33,5"></lb>βληθείς. <lb n="33,6"></lb></s> <s id="id.000317">Ἔστω ἀγγεῖον στεγνὸν τὸ ΑΒΓΔ διαπεφραγμένον <lb n="33,7"></lb>τὸν τράχηλον τῷ ΕΖ διαφράγματι· διαπεφράχθω δὲ <lb n="33,8"></lb>καὶ τὸ ὅλον ἀγγεῖον εἰς χώρας τοσαύτας, ὅσους βουλό<lb n="33,9"></lb>μεθα καὶ τοὺς οἴνους εἶναι· καὶ ἔστω διαφράγματα <lb n="33,10"></lb>τὰ ΗΘ, ΚΛ, ὥστε γίνεσθαι χώρας τρεῖς τὰς Μ, Ν, Ξ, <lb n="33,11"></lb>εἰς ἃς ἐμβληθήσεται ὁ οἶνος. </s> <s id="id.000318">τετρήσθω δὲ τὸ ΕΖ <lb n="33,12"></lb>διάφραγμα καθ' ἑκάστην χώραν λεπτοῖς τρυπηματίοις· <lb n="33,13"></lb>καὶ ἔστω τὰ τρυπημάτια τὰ Ο, Π, Ρ· ἐκ δὲ τῶν <lb n="33,14"></lb>Ο, Π, Ρ τρυπηματίων σωληνάρια ἀνατεινέτω τὰ ΠΣ, <lb n="33,15"></lb>ΟΤ, ΡΥ εἰς τὸν τράχηλον τοῦ ἀγγείου συντετρημένα <lb n="33,16"></lb>αὐτῷ· παρὰ δὲ ἕκαστον σωληνάριον τρυπημάτια ἔστω <lb n="33,17"></lb>λεπτὰ ἐν τῷ ΕΖ διαφράγματι ἠθμοειδῆ, δι' ὧν τὸ <lb n="33,18"></lb>ὑγρὸν εἰς τὰς χώρας χωρήσει. </s> <s id="id.000319">ὅταν οὖν βουλώμεθα <pb pagenum="154"></pb><lb n="33,19"></lb>ἐγχέειν ἕκαστον οἶνον, καταληψόμεθα τοῖς δακτύλοις <lb n="33,20"></lb>τὰ Σ, Τ, Υ καὶ ἐγχέομεν τὸν οἶνον διὰ τοῦ Φ τρα<lb n="33,21"></lb>χήλου· οὗτος δὲ εἰς οὐδεμίαν χώραν χωρήσει διὰ τὸ <lb n="33,22"></lb>μὴ ἔχειν διέξοδον τὸν ἐν ταῖς χώραις ἀέρα. </s> <s id="id.000320">ὅταν οὖν <lb n="33,23"></lb>ἀνέσωμεν ἓν τῶν Σ, Τ, Υ διαυγίων, ὁ ἐν τῇ κατ' <lb n="33,24"></lb>ἐκεῖνο χώρᾳ ἀὴρ ἐκχωρήσει, διὰ τοῦ ἠθμοῦ τοῦ οἴνου <pb pagenum="156"></pb><lb n="33,25"></lb>εἰς τὴν χώραν ἐμπίπτοντος. </s> <s id="id.000321">πάλιν καταλαμβανόμενοι <lb n="33,26"></lb>τὸ διαύγιον, ἄλλο ὁμοίως ἀνήσομεν καὶ ἐμβαλοῦμεν <lb n="33,27"></lb>ἕτερον οἶνον, εἶτα ἑξῆς τοὺς λοιπούς, ὅσοι ἐὰν ὦσιν <lb n="33,28"></lb>οἵ τε οἶνοι καὶ αἱ ἐν τῷ ΑΒΓΔ ἀγγείῳ ἰσοπληθεῖς <lb n="33,29"></lb>χῶραι. </s> <s id="id.000322">δεξόμεθα δὲ ἕκαστον αὐτῶν κατὰ μέρος διὰ <lb n="33,30"></lb>τοῦ αὐτοῦ κρουνοῦ οὕτως. </s> <s id="id.000323">ἐν τῷ πυθμένι τοῦ ΑΒΓΔ <lb n="33,31"></lb>ἀγγείου ἐξ ἑκάστης χώρας σωλῆνες ἔστωσαν ἐκ μὲν <lb n="33,32"></lb>τῆς Μ ὁ ΧΨ, ἐκ δὲ τῆς Ν ὁ Ω#2, ἐκ δὲ τῆς Ξ ὁ <lb n="33,33"></lb>#4#5· τὰ δὲ ἄκρα αὐτῶν τὰ Ψ, #2, #5 συντετρήσθω <lb n="33,34"></lb>ἑτέρῳ σωλῆνι τῷ Ψ#2#5 #22Α ἀπέχοντα ἀπ' ἀλλήλων, καὶ <lb n="33,35"></lb>ἐστεγνώσθωσαν εἰς τὸ ἐντὸς τοῦ Ψ#2#5 #22Α. </s> <s id="id.000324">ἕτερος δὲ <lb n="33,36"></lb>σωλὴν [2ἔστω]2 συνεσμηρισμένος ὁ #22Β #22Γ τῷ Ψ#2#5 #22Α, <lb n="33,37"></lb>ἐπεστομωμένος μὲν κατὰ τὸ ἐντὸς μέρος τὸ #22Γ, τρή<lb n="33,38"></lb>ματα δὲ ἔχων κατὰ τὰ Ψ, #2, #5, ὥστε ἐπιστρεφομένου <lb n="33,39"></lb>τοῦ #22Β #22Γ σωλῆνος τὰ ἐν αὐτῷ τρήματα παραγινόμενα <lb n="33,40"></lb>παρ' ἕκαστον τῶν Ψ, #2, #5 τρημάτων δέχεσθαι τὸν ἐν <pb pagenum="158"></pb><lb n="33,41"></lb>ἑκάστῃ χώρᾳ οἶνον καὶ εἰς τὸ ἐκτὸς ἀποδιδόναι διὰ <lb n="33,42"></lb>τοῦ ἐκτὸς στομίου τοῦ #22Β #22Γ σωλῆνος. </s> <s id="id.000325">τῷ οὖν #22Β #22Γ <lb n="33,43"></lb>σωλῆνι συμφυὴς ἔστω σιδηροῦς ὀβελίσκος ὁ #22Δ #22Ε· καὶ <lb n="33,44"></lb>κατὰ μὲν τὸ #22Ε μέρος [2βάροσ]2 ἐκ μολίβδου προσκε<lb n="33,45"></lb>κολλήσθω τὸ #22Ε, κατὰ δὲ τὸ #22Δ περόνη σιδηρᾶ ἡ <lb n="33,46"></lb>#22Δ #22#2 ἔχουσα ἐκ τοῦ μέσου προσκεκολλημένον φιάλιον <lb n="33,47"></lb>τὸ #22#2 τὰ κοῖλα εἰς τὸ ἄνω μέρος ἔχον. </s> <s id="id.000326">ἔστω δέ τις <lb n="33,48"></lb>καὶ κῶνος κοῖλος κόλουρος, οὗ ὁ μὲν μείζων κύκλος <lb n="33,49"></lb>ἔστω ὁ #22Ζ, ὁ δὲ ἐλάσσων ὁ #22Θ, δι' οὗ καὶ ἡ #22Δ #22#2 <lb n="33,50"></lb>περόνη διερχέσθω. </s> <s id="id.000327">γεγονέτω δὲ καὶ σφαιρία μολιβᾶ <lb n="33,51"></lb>ἄνισα τοῖς μεγέθεσι τοσαῦτα ὅσαι εἰσὶ καὶ αἱ Μ, Ν, Ξ <lb n="33,52"></lb>χῶραι. </s> <s id="id.000328">ἐὰν οὖν τὸ ἔλασσον τῶν σφαιρίων ἐπιθῶμεν <lb n="33,53"></lb>τῷ #22Ζ#22Θ φιαλίῳ, καταβαρῆσαν εἰς τὸ κάτω μέρος <lb n="33,54"></lb>ἐνεχθήσεται, ἄχρις ἂν ψαύσῃ τῆς τοῦ κώνου κολούρου <lb n="33,55"></lb>κοίλης ἐπιφανείας, καὶ ἐπιστρέψει τὸν #22Β#22Γ σωλῆνα, <pb pagenum="160"></pb><lb n="33,56"></lb>ὥστε τὸ ἐν αὐτῷ τρῆμα γενέσθαι κατὰ τὸ Ψ καὶ δέ<lb n="33,57"></lb>χεσθαι τὸν ἐν τῇ Μ χώρᾳ οἶνον ῥέοντα ἐπὶ τοσοῦτον, <lb n="33,58"></lb>ἐφ' ὅσον καὶ ἐπίκειται ἡ σφαῖρα τῷ φιαλίῳ, εἰ μὴ <lb n="33,59"></lb>ἄρα ὅλος ᾖ ἐκρερευκώς. </s> <s id="id.000329">ἐὰν δὲ ἀφέλωμεν τὸ σφαι<lb n="33,60"></lb>ρίον, πάλιν τὸ #22Ε βάρος καταστρέψαν ἀποκλείσει τὸ <lb n="33,61"></lb>Ψ τρῆμα, ὥστε μηκέτι ῥέειν τὸν οἶνον. </s> <s id="id.000330">πάλιν οὖν <lb n="33,62"></lb>ἢν ἕτερον τῶν σφαιρίων ἐπιθῶμεν, πλέον κατενεχθή<lb n="33,63"></lb>σεται καὶ πλέον ἐπιστρέψει τὸν #22Β σωλῆνα, ἄχρις ἂν <lb n="33,64"></lb>τὸ ἐν αὐτῷ τρῆμα γένηται κατὰ τὸ #2 τρῆμα· καὶ οὕτως <lb n="33,65"></lb>ῥεύσει ὁ ἐν τῇ Ν χώρᾳ οἶνος. </s> <s id="id.000331">καὶ πάλιν ἀρθέντος <lb n="33,66"></lb>τοῦ σφαιρίου καταρρέψαν τὸ #22Ε βάρος ἀποκλείσει τὸ <lb n="33,67"></lb>#2 τρῆμα, ὥστε μηκέτι ῥέειν τὸν οἶνον. </s> <s id="id.000332">ἐὰν δὲ ἕτερον <lb n="33,68"></lb>μεῖζον ἐπιτεθῇ, πλέον ἐπιστραφήσεται ὁ #22Β σωλήν, <lb n="33,69"></lb>ὥστε ῥέειν τὸν ἐν τῇ Ξ χώρᾳ οἶνον. </s> <s id="id.000333">δεῖ μέντοι τὸ <lb n="33,70"></lb>ἔλασσον τῶν σφαιρίων ἐπιτεθὲν ἐπὶ τῷ φιαλίῳ κατα<pb pagenum="162"></pb><lb n="33,71"></lb>κρατεῖν τοῦ #22Ε βάρους, τουτέστιν ἐπιστρέφειν τὸν <lb n="33,72"></lb>#22Β σωλῆνα· οὕτως γὰρ καὶ τὰ σφαιρία τὰ λοιπὰ <lb n="33,73"></lb>κατακρατήσει καὶ ἐπιστρέψει τὸν #22Β κρουνόν. <lb n="33,74"></lb></s> </p> <p n="34"> <s id="id.000334">Λύχνον κατασκευάσαι ἑαυτὸν προσμύσσοντα. <lb n="34,1"></lb></s> <s id="id.000335">Ἔστω ὁ λύχνος ὁ ΑΒΓ· διὰ δὴ τοῦ στόματος <lb n="34,2"></lb>αὐτοῦ περόνη σιδηρᾶ διώσθω ἡ ΔΕ κινουμένη εὐλύτως <lb n="34,3"></lb>περὶ τὸ Ε σημεῖον· περὶ δὲ τὴν περόνην τὸ ἐλλύχνιον <lb n="34,4"></lb>περιειλείσθω εὔλυτον. </s> <s id="id.000336">παρακείσθω δὲ καὶ τύμπανον <lb n="34,5"></lb>ὠδοντωμένον τὸ Ζ κινούμενον περὶ ἀξόνιον εὐλύτως, <lb n="34,6"></lb>οὗ οἱ ὀδόντες ψαυέτωσαν τῆς περόνης, ὅπως ἐπι<pb pagenum="164"></pb><lb n="34,7"></lb>στρεφομένου αὐτοῦ προωθῆται τὸ ἐλλύχνιον διὰ τῶν <lb n="34,8"></lb>ὀδόντων. </s> <s id="id.000337">ἐχέτω δὲ ὁ λύχνος ἀνεῳγότα τὸν ὀμφαλὸν <lb n="34,9"></lb>ἐπὶ πλέον. </s> <s id="id.000338">ἐμβληθέντος δὲ τοῦ ἐλαίου ἐπινηχέσθω <lb n="34,10"></lb>λεβητάριον τὸ Η ἔχον συμφυὲς ὄρθιον κανόνιον τὸ Θ <lb n="34,11"></lb>ὠδοντωμένον καὶ συμπεπλεγμένον τοῖς ὀδοῦσι τοῦ <lb n="34,12"></lb>τυμπανίου. </s> <s id="id.000339">συμβήσεται οὖν δαπανωμένου τοῦ ἐλαίου <lb n="34,13"></lb>τὸ λεβητάριον καταβαῖνον ἐπιστρέφειν τὸ Ζ τυμπάνιον <lb n="34,14"></lb>διὰ τῶν τοῦ κανονίου ὀδόντων, ὥστε προωθεῖσθαι τὸ <lb n="34,15"></lb>ἐλλύχνιον. <lb n="34,16"></lb></s> </p> <p n="35"> <s id="id.000340">Ἀγγείου ὄντος καὶ κρουνὸν παρὰ τὸν πυθμένα <lb n="35,1"></lb>ἀνεῳγότα ἔχοντος καὶ ἐγχεομένου εἰς αὐτὸ ὑγροῦ, <lb n="35,2"></lb>ὁτὲ μὲν κατ' ἀρχὰς ῥεύσει ὁ κρουνός, ὁτὲ δὲ κατὰ τὸ <lb n="35,3"></lb>ἥμισυ, ὁτὲ δὲ καὶ ὅλου πληρωθέντος· ἢ καὶ καθόλου, <lb n="35,4"></lb>ὁπόσου ἂν ἐμβληθέντος τοῦ ὑγροῦ ῥεύσει ὁ κρουνός, <lb n="35,5"></lb>καὶ πᾶν κενώσει τὸ ἐμβληθὲν ὑγρόν. <lb n="35,6"></lb></s> <s id="id.000341">Ἔστω τι ἀγγεῖον τὸ ΑΒ διαπεφραγμένον τὸν <lb n="35,7"></lb>τράχηλον· διὰ δὲ τοῦ διαφράγματος καθείσθω σωλὴν <lb n="35,8"></lb>ὁ ΓΔ συνεστεγνωμένος τῷ διαφράγματι, ἀπέχων δὲ <lb n="35,9"></lb>τοῦ πυθμένος ὅσον ὕδατι διάρρυσιν. </s> <s id="id.000342">ἔστω δὲ καὶ <pb pagenum="166"></pb><lb n="35,10"></lb>καμπύλος σίφων ὁ ΕΖΗ, οὗ τὸ μὲν ἐντὸς σκέλος <lb n="35,11"></lb>ἀπεχέτω ἀπὸ τοῦ πυθμένος ὅσον ὕδατι διάρρυσιν, τὸ <lb n="35,12"></lb>δὲ ἕτερον εἰς τὸ ἐκτὸς ἀποδοθὲν εἰς κρουνὸν διε<lb n="35,13"></lb>σκευάσθω· ἡ δὲ κυρτότης τοῦ διαβήτου παρ' αὐτὸν <lb n="35,14"></lb>ἔστω τὸν τράχηλον τοῦ ἀγγείου. </s> <s id="id.000343">ἐχέτω δὲ καὶ δι<lb n="35,15"></lb>αύγιον τὸ ΑΒ ἀγγεῖον παρὰ τὸ διάφραγμα, τὸ Θ φέρον <lb n="35,16"></lb>εἰς τὸ κύτος. </s> <s id="id.000344">ἐὰν οὖν βουλώμεθα κατ' ἀρχὰς ἐγχεο<lb n="35,17"></lb>μένου τοῦ ὑγροῦ ῥέειν τὸν κρουνόν, καταληψόμεθα τῷ <lb n="35,18"></lb>δακτύλῳ τὸ Θ διαύγιον, καὶ ῥεύσει ὁ κρουνός· μὴ <lb n="35,19"></lb>γὰρ ἔχοντος τοῦ ἐν τῷ ἀγγείῳ ἀέρος ἀντιπερίστασιν, <lb n="35,20"></lb>τὸ ὑγρὸν ὁρμήσει διὰ τοῦ καμπύλου σίφωνος εἰς τὸ <lb n="35,21"></lb>ἐκτὸς μέρος. </s> <s id="id.000345">ἐὰν δὲ μὴ καταλαβώμεθα τὸ διαύγιον, <lb n="35,22"></lb>χωρήσει τὸ ὑγρὸν εἰς τὸ κύτος, καὶ οὐ μὴ ῥεύσει ὁ <lb n="35,23"></lb>κρουνός, ἄχρις ἂν πάλιν καταλαβώμεθα τὸ διαύγιον. <lb n="35,24"></lb></s> <s id="id.000346">μετὰ δὲ ταῦτα ἀνεθέντος τοῦ διαυγίου ὁ διαβήτης <lb n="35,25"></lb>ἅπαν κενώσει τὸ ὑγρόν. <lb n="35,26"></lb></s> </p> <p n="36"> <s id="id.000347">Κατασκευάζεται δὲ καὶ ἀγγεῖον, ὃ ἐφ' ὅσον μὲν <lb n="36,1"></lb>ἐπιχέεις τὸ ὑγρὸν δέχεται, ἐὰν δὲ διαλίπῃς, οὐκέτι δέ<lb n="36,2"></lb>χεται. </s> <s id="id.000348">γίνεται δὲ τὸν τρόπον τοῦτον. <lb n="36,3"></lb></s> <s id="id.000349">Ἔστω τὸ ἀγγεῖον τὸ ΑΒ διαπεφραγμένον τὸν <pb pagenum="168"></pb><lb n="36,4"></lb>τράχηλον τῷ ΓΔ διαφράγματι· διὰ δὲ τοῦ διαφράγ<lb n="36,5"></lb>ματος καθείσθω σωλὴν ὁ ΕΖ ἀπέχων μὲν ἀπὸ τοῦ <lb n="36,6"></lb>πυθμένος βραχύ, ὑπερέχων δὲ τοῦ διαφράγματος, ὥστε <lb n="36,7"></lb>μικρὸν ἀπέχειν τοῦ χείλους τοῦ ἀγγείου. </s> <s id="id.000350">περὶ δὲ <lb n="36,8"></lb>τοῦτον περικείσθω ἕτερος ὁ ΗΘ ἀπέχων ἀπὸ τοῦ δια<lb n="36,9"></lb>φράγματος ὅσον ὕδατι διάρρυσιν καὶ ἀπὸ τοῦ ΕΖ <lb n="36,10"></lb>σωλῆνος· ἐπιπεφράχθω δὲ ὁ ΗΘ σωλὴν τὸ ἄνω μέρος <lb n="36,11"></lb>λεπιδίῳ. </s> <s id="id.000351">ἐχέτω δὲ τὸ ἀγγεῖον καὶ διαύγιον τὸ Κ <lb n="36,12"></lb>φέρον εἰς τὸ κύτος. </s> <s id="id.000352">ὅταν οὖν ἐγχέωμεν τὸ ὑγρὸν διὰ <lb n="36,13"></lb>τοῦ τραχήλου, συμβήσεται χωρεῖν αὐτὸ διά τε τοῦ <lb n="36,14"></lb>ΗΘ σωλῆνος καὶ διὰ τοῦ ΕΖ εἰς τὸ κύτος, τοῦ ἀέρος <lb n="36,15"></lb>ἐκχωροῦντος διὰ τοῦ Κ διαυγίου. </s> <s id="id.000353">ἐὰν οὖν διαλίπω<lb n="36,16"></lb>μεν καὶ κενωθῇ ὁ τοῦ ἀγγείου τράχηλος, ὁ ἀὴρ δια<lb n="36,17"></lb>στήσει τὴν συνέχειαν, ὥστε τὸ ἐνὸν ἐν τῷ ΗΘ σωλῆνι <lb n="36,18"></lb>ὑγρὸν καταρραγὲν πεσεῖται ἐπὶ τὸ διάφραγμα· ἔστω <lb n="36,19"></lb>γὰρ τὸ εὖρος τὸ περὶ τὸν ΗΘ σωλῆνα μέγα, ὥστε <lb n="36,20"></lb>τῷ βάρει καταπεσεῖται τὸ ὑγρόν. </s> <s id="id.000354">ἐπεγχυθέντος δὲ <lb n="36,21"></lb>ἑτέρου ὑγροῦ ὁ ἐναποληφθεὶς ἐν τῷ ΕΖ σωλῆνι <lb n="36,22"></lb>ἀὴρ καὶ ἐν τῷ ΗΘ οὐκ ἐάσει παρεισελθεῖν τὸ ὑγρόν, <lb n="36,23"></lb>ἀλλ' ὑπὲρ τὸ χεῖλος τοῦ ἀγγείου ὑπερχυθήσεται. <lb n="36,24"></lb><pb pagenum="170"></pb></s> </p> <p n="37"> <s id="id.000355">Κατασκευάζεται δὲ καὶ Σατυρίσκος ἐπί τινος <lb n="37,1"></lb>βάσεως ἀσκὸν ἐν ταῖς χερσὶ κατέχων, ᾧ προσπαρά<lb n="37,2"></lb>κειται λουτηρίδιον, καὶ ἐγχυθέντος εἰς αὐτὸ ὑγροῦ, <lb n="37,3"></lb>ὥστε πληρω<lb n="37,4"></lb>θῆναι, ἐπιρ<lb n="37,5"></lb>ρεύσει διὰ <lb n="37,6"></lb>τοῦ ἀσκοῦ <lb n="37,7"></lb>ὕδωρ εἰς τὸ <lb n="37,8"></lb>λουτηρίδιον <lb n="37,9"></lb>καὶ οὐχ <lb n="37,10"></lb>ὑπερχυθή<lb n="37,11"></lb>σεται, ἄχρις <lb n="37,12"></lb>οὗ πᾶν τὸ <lb n="37,13"></lb>διὰ τοῦ <lb n="37,14"></lb>ἀσκοῦ ὕδωρ <lb n="37,15"></lb>κενωθῇ· <lb n="37,16"></lb>ἔστι δὲ ἡ κα<lb n="37,17"></lb>τασκευὴ τοι<lb n="37,18"></lb>αύτη. <lb n="37,19"></lb></s> <s id="id.000356">Ἔστω τις <lb n="37,20"></lb>βάσις ἡ ΑΒ <lb n="37,21"></lb>στεγνὴ πάν<lb n="37,22"></lb>τοθεν, ἤτοι κυλινδρικὴ ἢ ὀκτάγωνος εὐπρεπείας ἕνεκα, <lb n="37,23"></lb>διαπεφραγμένη τῷ ΓΔ διαφράγματι· διὰ δὲ τοῦ δια<lb n="37,24"></lb>φράγματος ἀνατεινέσθω σωλὴν ὁ ΕΖ συντετρημένος <pb pagenum="172"></pb><lb n="37,25"></lb>τῷ διαφράγματι, ἀπέχων δὲ τῆς στέγης βραχύ. </s> <s id="id.000357">διὰ δὲ <lb n="37,26"></lb>τῆς στέγης διώσθω σωλὴν ὁ ΗΘ ὑπερέχων μὲν εἰς τὸ <lb n="37,27"></lb>ἄνω μέρος βραχὺ καὶ ἔχων λουτηρίδιον ἐπικείμενον, <lb n="37,28"></lb>ἀπέχων δὲ ἀπὸ τοῦ πυθμένος τοῦ ἀγγείου ὅσον ὕδατι <lb n="37,29"></lb>διάρρυσιν, συνεστεγνωμένος δὲ τῇ στέγῃ τοῦ ἀγγείου <lb n="37,30"></lb>καὶ τῷ διαφράγματι. </s> <s id="id.000358">ἕτερος δὲ ὁμοίως διώσθω διὰ τῆς <lb n="37,31"></lb>στέγης ὁ ΚΛΜ ἀπέχων μὲν ἀπὸ τοῦ διαφράγματος <lb n="37,32"></lb>βραχύ, συνεστεγνωμένος δὲ τῇ στέγῃ καὶ φέρων τὴν ἐξ <lb n="37,33"></lb>αὑτοῦ ῥύσιν εἰς τὸ λουτηρίδιον, ὃ δὴ πρόσκειται τῷ <lb n="37,34"></lb>ΗΘ σωλῆνι συντετρημένον αὐτῷ. </s> <s id="id.000359">πεπληρώσθω οὖν τὸ <lb n="37,35"></lb>ΑΔ ἀγγεῖον ὑγροῦ διά τινος ὀπῆς τῆς Ν, ἥτις μετὰ τὴν <lb n="37,36"></lb>ἔγχυσιν ἐστεγνώσθω. </s> <s id="id.000360">ἐὰν οὖν ἐγχέωμεν εἰς τὸ λουτη<lb n="37,37"></lb>ρίδιον ὑγρόν, χωρήσει διὰ τοῦ ΗΘ σωλῆνος εἰς τὸ <lb n="37,38"></lb>ΒΓ ἀγγεῖον, τοῦ ἐν αὐτῷ ἀέρος χωροῦντος διὰ τοῦ <lb n="37,39"></lb>ΕΖ σωλῆνος, ὃς χωρήσας εἰς τὸ ΑΔ ἀγγεῖον ἐκθλίψει <pb pagenum="174"></pb><lb n="37,40"></lb>τὸ ἐν αὐτῷ ὑγρὸν διὰ τοῦ ΚΛΜ σωλῆνος εἰς τὸ <lb n="37,41"></lb>λουτηρίδιον. </s> <s id="id.000361">τοῦτο δὲ πάλιν φερόμενον εἰς τὸ ΒΓ <lb n="37,42"></lb>ἀγγεῖον ἐκθλίψει ὁμοίως τὸν ἐν αὐτῷ ἀέρα, ὃς δὴ <lb n="37,43"></lb>πάλιν τὸ ἐν τῷ ΑΔ ἀγγείῳ ὕδωρ ἐκθλίψει εἰς τὸ <lb n="37,44"></lb>λουτηρίδιον· καὶ τοῦτο ἔσται, ἄχρις ἂν κενωθῇ τὸ ἐν <lb n="37,45"></lb>τῷ ΑΔ ἀγγείῳ ὕδωρ. </s> <s id="id.000362">δεήσει δὲ τὸν ΜΛΚ σωλῆνα <lb n="37,46"></lb>διὰ τοῦ στόματος τοῦ ἀσκοῦ εἶναι καὶ λεπτὸν παντά<lb n="37,47"></lb>πασιν ὑπάρχειν ἕνεκα τοῦ τὴν ἐπίδειξιν ἐπὶ πλείονα <lb n="37,48"></lb>χρόνον παραμένειν. <lb n="37,49"></lb></s> </p> <p n="38"> <s id="id.000363">Ναί̈σκου κατασκευή, ὥστε θυσίας γινομένης τὰς <lb n="38,1"></lb>θύρας αὐτομάτως ἀνοίγεσθαι, σβεσθείσης δὲ τῆς θυσίας <lb n="38,2"></lb>πάλιν κλείεσθαι. <lb n="38,3"></lb></s> <s id="id.000364">Ἔστω ὁ προειρημένος ναί̈σκος ἐπὶ βάσεως τῆς <lb n="38,4"></lb>ΑΒΓΔ, ἐφ' ἧς ἐπικείσθω βωμίσκος ὁ ΕΔ· διὰ δὲ <lb n="38,5"></lb>τοῦ βωμίσκου διώσθω σωλὴν ὁ ΗΖ, οὗ τὸ μὲν Ζ <pb pagenum="176"></pb><lb n="38,6"></lb>στόμιον ἐντὸς ἔστω τοῦ βωμίσκου, τὸ δὲ Η ἐν <lb n="38,7"></lb>σφαίρᾳ τινὶ περιειλήφθω τῇ Θ ἀπέχον ἀπὸ τοῦ κέν<lb n="38,8"></lb>τρου αὐτῆς βραχύ· συνεστεγνώσθω δὲ καὶ ἡ σφαῖρα <lb n="38,9"></lb>τῷ ΗΖ σωλῆνι. </s> <s id="id.000365">ἔστω δὲ καὶ ἐν τῇ σφαίρᾳ καμπύλος <lb n="38,10"></lb>σίφων ὁ ΚΛΜ. </s> <s id="id.000366">οἱ δὲ στροφεῖς τῶν θυρῶν παρεκτε<lb n="38,11"></lb>τάσθωσαν εἰς τὸ κάτω μέρος καὶ στρεφέσθωσαν ἐν <lb n="38,12"></lb>κνωδακίοις οὖσιν ἐν τῇ ΑΒΓΔ βάσει εὐλύτως. </s> <s id="id.000367">ἐκ δὲ <lb n="38,13"></lb>τῶν στροφέων ἁλυσείδια εἰς ἓν ἀποδεθέντα διὰ τρο<lb n="38,14"></lb>χίλου ἀποδεδέσθω εἰς ἀγγεῖον κοῖλον τὸ ΝΞ κρεμά<pb pagenum="178"></pb><lb n="38,15"></lb>μενον· ἕτερα δὲ ἁλυσείδια ἐπειληθέντα πρὸς τοὺς <lb n="38,16"></lb>στροφεῖς τὰ ἐναντία τοῖς πρότερον εἰς ἓν ἀποδεθέντα <lb n="38,17"></lb>διὰ τροχίλου εἰς βάρος μολιβοῦν ἀποδεδέσθω, δι' οὗ <lb n="38,18"></lb>καταρρέποντος ἀποκεκλεισμέναι ἔσονται αἱ θύραι. </s> <s id="id.000368">ὁ <lb n="38,19"></lb>δὲ ΚΛΜ σίφων τὸ ἐκτὸς σκέλος ἐχέτω φέρον εἰς τὸ <lb n="38,20"></lb>κρεμαστὸν ἀγγεῖον. </s> <s id="id.000369">ἐμβεβλήσθω δὲ διά τινος τρυπή<lb n="38,21"></lb>ματος τοῦ Π ὕδωρ εἰς τὴν σφαῖραν, ὥστε δι' ἡμίσους <lb n="38,22"></lb>γενέσθαι, ὃ μετὰ τὴν ἔγχυσιν ἐστεγνώσθω. </s> <s id="id.000370">συμβή<lb n="38,23"></lb>σεται οὖν τοῦ πυρὸς θυμιαθέντος θερμαινόμενον τὸν <lb n="38,24"></lb>ἐν τῷ βωμίσκῳ ἀέρα χεῖσθαι εἰς πλείονα τόπον· οὗτος <lb n="38,25"></lb>δὲ διὰ τοῦ ΗΖ σωλῆνος εἰς τὴν σφαῖραν χωρῶν ἐκ<lb n="38,26"></lb>θλίψει τὸ ἐν αὐτῇ ὑγρὸν διὰ τοῦ ΚΛΜ σίφωνος εἰς <lb n="38,27"></lb>τὸ κρεμαστὸν ἀγγεῖον, ὃ δὴ καταβαρῆσαν ἐπισπάσεται <lb n="38,28"></lb>τὰ ἁλυσείδια καὶ ἀνοίξει τὰς θύρας. </s> <s id="id.000371">πάλιν δὴ σβε<lb n="38,29"></lb>σθέντος τοῦ πυρὸς ὁ μὲν λεπτυνθεὶς ἀὴρ ἐκχωρήσει <lb n="38,30"></lb>διὰ τῶν ἀραιωμάτων τοῦ τεύχους τῆς σφαίρας. </s> <s id="id.000372">ὁ δὲ <lb n="38,31"></lb>καμπύλος σίφων ἐπισπάσεται τὸ ὑγρὸν τὸ ἐκ τοῦ κρε<lb n="38,32"></lb>μαστοῦ ἀγγείου, ὥστε ἀναπληρῶσαι τὸν τῶν ἐκκρι<lb n="38,33"></lb>θέντων ἀραιωμάτων τόπον· ἔσται γὰρ αὐτοῦ τὸ ἄκρον <lb n="38,34"></lb>βαπτιζόμενον εἰς τὸ ἐν τῷ κρεμαστῷ ἀγγείῳ ὕδωρ. <lb n="38,35"></lb></s> <s id="id.000373">κουφισθέντος δὲ τοῦ ἀγγείου πάλιν τὸ ἐκκρεμάμενον <lb n="38,36"></lb>βάρος καταρρέψαν κλείσει τὰς θύρας. </s> <s id="id.000374">ἔνιοι δὲ ἀντὶ <lb n="38,37"></lb>ὕδατος ὑδραργύρῳ χρῶνται, ἐπειδήπερ βαρύτερός <lb n="38,38"></lb>ἐστι τοῦ ὕδατος καὶ εὐκόπως ὑπὸ τῆς θερμότητος <lb n="38,39"></lb>λύεται. <lb n="38,40"></lb></s> </p> <p n="39"> <s id="id.000375">Ἔστι δὲ καὶ ἄλλως θυσίας γινομένης τὰς θύρας <lb n="39,1"></lb>ἀνοίγεσθαι. <lb n="39,2"></lb><pb pagenum="180"></pb></s> <s id="id.000376">Ἔστω πάλιν ναί̈σκος ἐπί τινος βάσεως τῆς ΑΒΓΔ, <lb n="39,3"></lb>ἐφ' ἧς ἔστω βωμὸς ὁ Ε. </s> <s id="id.000377">διὰ δὲ τοῦ βωμοῦ σωλὴν <lb n="39,4"></lb>ἔστω ὁ ΖΗΘ· ἀποδεδόσθω δὲ εἰς ἀσκωμάτιον τὸ Κ <lb n="39,5"></lb>στεγνὸν πάντοθεν, ᾧ ἐπικείσθω βαρύλλιον τὸ Λ, ἐξ <lb n="39,6"></lb>οὗ ἁλυσείδιον διὰ τροχίλου ἀποδεδέσθω εἰς τὰ περὶ <lb n="39,7"></lb>τοὺς στροφεῖς ἁλυσείδια, ὥστε ἐπτυγμένου τοῦ ἀσκώ<lb n="39,8"></lb>ματος κατακρατεῖν τὸ Λ βάρος καὶ κλείειν τὰς θύρας, <lb n="39,9"></lb>ἐπιτεθέντος δὲ τοῦ πυρὸς ἀνοίγειν· πάλιν γὰρ θερ<lb n="39,10"></lb>μαινόμενος ὁ ἐν τῷ βωμίσκῳ ἀὴρ χεθεὶς χωρήσει <lb n="39,11"></lb>διὰ τοῦ ΖΗΘ σωλῆνος εἰς τὸ ἀσκωμάτιον καὶ <lb n="39,12"></lb>ἐπαρεῖ αὐτὸ σὺν τῷ Λ βάρει, καὶ ἀνοιχθήσονται αἱ <lb n="39,13"></lb>θύραι· ἤτοι γὰρ αὗται δι' ἑαυτῶν αὐτομάτως ἀνοιχθή<pb pagenum="182"></pb><lb n="39,14"></lb>σονται, καθάπερ καὶ αἱ τῶν βαλανείων θύραι αὐτο<lb n="39,15"></lb>μάτως κλείονται, ἢ ἕξουσί τι ἀντισηκοῦν βάρος τὸ <lb n="39,16"></lb>ἀνοῖγον αὐτάς. </s> <s id="id.000378">σβεσθείσης δὲ τῆς θυσίας καὶ ἐκχω<lb n="39,17"></lb>ροῦντος τοῦ ἐν τῷ ἀσκωματίῳ εἰσελθόντος ἀέρος, τὸ <lb n="39,18"></lb>Λ βάρος καταφερόμενον σὺν τῷ ἀσκώματι ἐπισπάσεται <lb n="39,19"></lb>καὶ κλείσει τὰς θύρας. <lb n="39,20"></lb></s> </p> <p n="40"> <s id="id.000379">Ἀγγείου ὄντος πλήρους οἴνου καὶ κρουνοὺς ἔχοντος <lb n="40,1"></lb>τρεῖς διὰ μὲν τοῦ μέσου ῥέειν τὸν οἶνον· ὅταν δὲ <lb n="40,2"></lb>ὕδωρ ἐπιχέωμεν, τὸν μὲν οἶνον μηκέτι ῥέειν, ἀλλὰ τὸ <lb n="40,3"></lb>ὕδωρ διὰ τῶν λοιπῶν δύο κρουνῶν· ὅταν δὲ παύση<lb n="40,4"></lb>ται τὸ ὕδωρ ῥέον, τὸν οἶνον διὰ τοῦ μέσου ῥέειν· <lb n="40,5"></lb>καὶ τοῦτο γίνεται, ὁσάκις ἂν ὕδωρ ἐπιχέωμεν. <lb n="40,6"></lb></s> <s id="id.000380">Ἔστω τι ἀγγεῖον τὸ ΑΒ διαπεφραγμένον τὸν τράχη<lb n="40,7"></lb>λον τῷ ΓΔ διαφράγματι. </s> <s id="id.000381">πρὸς δὲ τῷ πυθμένι κρουνὸν <lb n="40,8"></lb>ἐχέτω τὸν Ε. </s> <s id="id.000382">διὰ δὲ τοῦ διαφράγματος δύο καθεί<lb n="40,9"></lb>σθωσαν σωλῆνες οἱ ΖΗΘ, ΚΛΜ εἰς κρουνοὺς ἀπο<lb n="40,10"></lb>δεδομένοι καὶ ὑπερέχοντες ἄνω τοῦ διαφράγματος· <pb pagenum="184"></pb><lb n="40,11"></lb>περὶ δὲ τὰς ὑπεροχὰς ἕτεροι ἐπικείσθωσαν οἱ Ν, Ξ <lb n="40,12"></lb>ἐπιπεπωμασμένοι ἄνωθεν καὶ ἀπέχοντες ἀπὸ τοῦ δια<lb n="40,13"></lb>φράγματος ὅσον <lb n="40,14"></lb>ὕδατι διάρρυσιν. <lb n="40,15"></lb></s> <s id="id.000383">ἕτερος δὲ σωλὴν ὁ <lb n="40,16"></lb>ΠΟ συντετρήσθω <lb n="40,17"></lb>τῷ ΖΗΘ σωλῆνι <lb n="40,18"></lb>ἀπέχων ἀπὸ τοῦ <lb n="40,19"></lb>ΓΔ διαφράγματος <lb n="40,20"></lb>βραχύ. </s> <s id="id.000384">καταλη<lb n="40,21"></lb>φθέντος οὖν τοῦ Ε <lb n="40,22"></lb>κρουνοῦ, πεπλη<lb n="40,23"></lb>ρώσθω διά τινος <lb n="40,24"></lb>ὀπῆς τῆς Φ τὸ ΑΒ <lb n="40,25"></lb>ἀγγεῖον οἴνου, ὃ μετὰ τὴν ἔγχυσιν ἐστεγνώσθω. </s> <s id="id.000385">συμ<lb n="40,26"></lb>βήσεται οὖν ἀφεθέντος τοῦ Ε κρουνοῦ ῥέειν τὸν οἶνον· <lb n="40,27"></lb>ὁ γὰρ ἀὴρ ἔξωθεν διὰ τοῦ Θ στομίου καὶ τοῦ ΟΠ <lb n="40,28"></lb>σωλῆνος εἰς τὸν κενούμενον τόπον χωρεῖ. </s> <s id="id.000386">ἐὰν δὲ <lb n="40,29"></lb>ἐγχέωμεν ὕδωρ ἐπὶ τὸ ΓΔ διάφραγμα, ἐνεχθήσεται <lb n="40,30"></lb>εἰς τὸ ἐκτὸς μέρος διὰ τῶν ΖΗΘ, ΚΛΜ σωλήνων· <lb n="40,31"></lb>τοῦ δὲ ἀέρος μὴ ἔχοντος παρείσδυσιν εἰς τὸ ΑΒ <lb n="40,32"></lb>ἀγγεῖον, οὐκέτι ῥεύσει ὁ οἶνος, ἄχρις ἂν ἐκρεύσῃ πᾶν <lb n="40,33"></lb>τὸ ὕδωρ. </s> <s id="id.000387">καὶ πάλιν τοῦ ἀέρος ἔχοντος παρείσδυσιν <pb pagenum="186"></pb><lb n="40,34"></lb>ὁ οἶνος ῥέει. </s> <s id="id.000388">δύναται δὲ ἀντὶ τοῦ ΟΠ σωλῆνος <lb n="40,35"></lb>ἕτερος συντετρημένος τῷ διαφράγματι εἶναι ὁ ΡΣ, <lb n="40,36"></lb>περὶ ὃν ἕτερος ὁ ΤΥ περικείσθω ὁμοίως τοῖς Ν, Ξ, <lb n="40,37"></lb>ὑψηλότερος μέντοι αὐτῶν, ὥστε ὑπὲρ τὸ χεῖλος εἶναι <lb n="40,38"></lb>τοῦ ἀγγείου τὸν ΡΣ. </s> <s id="id.000389">καὶ τὰ αὐτὰ συμβήσεται. <lb n="40,39"></lb></s> </p> <p n="41"> <s id="id.000390">Βάσεως οὔσης, ἐφ' ἧς ἐφέστηκε δενδρύφιον, περὶ <lb n="41,1"></lb>ὃ δράκων εἱλεῖται, καὶ παρεστὼς Ἡρακλῆς τοξεύων <lb n="41,2"></lb>καὶ μήλου ἐπικειμένου τῇ βάσει, ἐπὰν τὸ μῆλον μικρὸν <lb n="41,3"></lb>ἀπὸ τῆς βάσεώς τις κουφίσῃ τῇ χειρί, ὁ μὲν Ἡρακλῆς <lb n="41,4"></lb>ἀφήσει τὸ βέλος πρὸς τὸν δράκοντα, ὁ δὲ δράκων <lb n="41,5"></lb>συρίσει. <lb n="41,6"></lb></s> <s id="id.000391">Ἔστω ἡ μὲν εἰρημένη βάσις στεγνὴ ἡ ΑΒ διά<lb n="41,7"></lb>φραγμα ἔχουσα τὸ ΓΔ· τῷ δὲ διαφράγματι συμφυὲς <lb n="41,8"></lb>ἔστω κοῖλον κόλουρον κωνάριον τὸ ΕΖ ἔχον ἐλάσσονα <lb n="41,9"></lb>τὸν Ζ κύκλον ἀνεῳγότα πρὸς τῷ πυθμένι, ὀλίγον δὲ <lb n="41,10"></lb>ἀπέχοντα ὅσον ὕδατι διάρρυσιν· τούτῳ δὲ συνεσμηρι<lb n="41,11"></lb>σμένον ἔστω ἕτερον τὸ Θ καὶ ἐξ ἁλυσειδίου τινὸς <lb n="41,12"></lb>ἀποδεδεμένον διὰ τρήματος εἰς τὸ Κ μῆλον ἐπικεί<lb n="41,13"></lb>μενον τῇ βάσει. </s> <s id="id.000392">κατεχέτω δὲ ὁ Ἡρακλῆς τοξάριον <lb n="41,14"></lb>κεράτινον ἔχον ἐντεταμένην τὴν νευρὰν ἀπέχουσαν <lb n="41,15"></lb>ἀπὸ τῆς δεξιᾶς χειρὸς τὸ αὔταρκες· ἐν δὲ τῇ δεξιᾶ <lb n="41,16"></lb>χειρὶ κατὰ τὸν δράκοντα ἔστω χεὶρ ὁμοία τῇ ἐκτὸς <pb pagenum="188"></pb><lb n="41,17"></lb>κατὰ πάντα πλὴν ὅτι μικρά, ἔχουσα καὶ τὴν σχαστηρίαν. <lb n="41,18"></lb></s> <s id="id.000393">ἐκ δὲ τοῦ ἄκρου τῆς σχαστηρίας ἁλυσείδιον ἢ σπάρτος <lb n="41,19"></lb>ἀποδεδόσθω διὰ τῆς βάσεως <lb n="41,20"></lb>εἰς τρόχιλον ὑπὲρ τὸ διά<lb n="41,21"></lb>φραγμα κείμενον καὶ ἔτι εἰς <lb n="41,22"></lb>τὸ ἁλυσείδιον τὸ ἐνδεδεμένον <lb n="41,23"></lb>εἴς τε τὸ κωνάριον καὶ τὸ <lb n="41,24"></lb>μῆλον. </s> <s id="id.000394">ἐπισπασώμεθα οὖν <lb n="41,25"></lb>τὸ τόξον καὶ ὑποβαλόντες ὑπὸ <lb n="41,26"></lb>τὴν χεῖρα κατακλείσωμεν τὴν <lb n="41,27"></lb>σχαστηρίαν, ὥστε εἶναι τετα<lb n="41,28"></lb>μένην τὴν σπάρτον καὶ βιά<lb n="41,29"></lb>ζεσθαι τὸ μῆλον εἰς τὸ κάτω μέρος. </s> <s id="id.000395">ἔστω δὲ ἡ σπάρ<lb n="41,30"></lb>τος διὰ τοῦ σώματος καὶ τῆς χειρὸς ἔσωθεν τοῦ Ἡρα<pb pagenum="190"></pb><lb n="41,31"></lb>κλέους. </s> <s id="id.000396">ἐκ δὲ τοῦ διαφράγματος ἀνατεινέτω σωληνά<lb n="41,32"></lb>ριον ὑπὲρ τὴν βάσιν τῶν εἰθισμένων συρίζειν· τοῦτο δὲ <lb n="41,33"></lb>ἔστω ὑπὸ τὸ δενδρύφιον ἢ παρ' αὐτὸ τὸ δενδρύφιον. <lb n="41,34"></lb></s> <s id="id.000397">καὶ ἔστω τὸ <lb n="41,35"></lb>μὲν δενδρύφιον τὸ ΛΜ, τοξάριον δὲ τὸ ΝΞ, νευρὰ δὲ <lb n="41,36"></lb>ἡ ΟΠ, ἡ δὲ ἐπιλαμβανομένη χεὶρ ἡ ΡΣ, σχαστηρία δὲ <lb n="41,37"></lb>ἡ ΤΥ, σπάρτος δὲ ἡ ΦΧ, τρόχιλος δὲ ὁ Χ, περὶ ὃν ἡ <lb n="41,38"></lb>σπάρτος, συρίγγιον δὲ τὸ ΨΩ. </s> <s id="id.000398">ἐὰν οὖν ἐπάρῃ τις τὸ <lb n="41,39"></lb>Κ μῆλον, συνεπαρεῖ καὶ τὸ Θ κωνάριον καὶ ἐπισπάσεται <lb n="41,40"></lb>τὴν ΥΦΧ σπάρτον καὶ σχάσει τὴν χεῖρα, ὥστε ἀφεθῆναι <lb n="41,41"></lb>τὸ βέλος. </s> <s id="id.000399">καὶ τὸ ἐν τῷ ΑΔ ἀγγείῳ ὕδωρ φερόμενον <lb n="41,42"></lb>εἰς τὸ ΒΓ ἐκκρούσει τὸν ἐν αὐτῷ ἀέρα διὰ τοῦ <lb n="41,43"></lb>συριγγίου καὶ τὸν ἦχον ἀποτελέσει. </s> <s id="id.000400">τεθέντος δὲ τοῦ <lb n="41,44"></lb>μήλου πάλιν τὸ κωνάριον ἐναρμόσαν τῷ ἑτέρῳ στε<lb n="41,45"></lb>γνώσει τὴν ῥύσιν, ὥστε μηκέτι φθέγγεσθαι. </s> <s id="id.000401">πάλιν <lb n="41,46"></lb>οὖν καταρτισώμεθα τὰ κατὰ τὸ βέλος καὶ ἐάσωμεν. <lb n="41,47"></lb></s> <s id="id.000402">πληρωθέντος δὲ τοῦ ΓΒ ἀγγείου, πάλιν κενωθήσεται <lb n="41,48"></lb>διά τινος κρουνοῦ κλειδίον ἔχοντος· τὸ δὲ ΑΔ πληρώ<lb n="41,49"></lb>σομεν ὡς καὶ τὸ πρότερον. <lb n="41,50"></lb><pb pagenum="192"></pb></s> </p> <p n="42"> <s id="id.000403">Ὑδραυλικοῦ ὀργάνου κατασκευή. <lb n="42,1"></lb></s> <s id="id.000404">Ἔστω τις βωμίσκος χάλκεος ὁ ΑΒΓΔ, ἐν ᾧ ὕδωρ <lb n="42,2"></lb>ἔστω· ἐν δὲ τῷ ὕδατι κοῖλον ἡμισφαίριον κατεστραμ<lb n="42,3"></lb>μένον ἔστω, ὃ καλεῖται πνιγεὺς ὁ ΕΖΗΘ ἔχων ἐν <lb n="42,4"></lb>τῷ ὑγρῷ διάρρυσιν εἰς τὰ πρὸς τῷ πυθμένι μέρη. <lb n="42,5"></lb></s> <s id="id.000405">ἀπὸ δὲ τῆς κορυφῆς αὐτοῦ δύο ἀνατεινέτωσαν σωλῆνες <lb n="42,6"></lb>συντετρημένοι αὐτῷ ὑπὲρ τὸν βωμίσκον, εἷς μὲν ὁ <lb n="42,7"></lb>ΗΚΛΜ κατακεκαμμένος εἰς τὸ ἐκτὸς τοῦ βωμίσκου <lb n="42,8"></lb>μέρος καὶ συντετρημένος πυξίδι τῇ ΝΞΟΠ κάτω τὸ <lb n="42,9"></lb>στόμα ἐχούσῃ καὶ τὴν ἐντὸς ἐπιφάνειαν ὀρθὴν πρὸς <lb n="42,10"></lb>ἐμβολέα ἀπειργασμένην. </s> <s id="id.000406">ταύτῃ δὲ ἐμβολεὺς ἁρμοστὸς <lb n="42,11"></lb>ἔστω ὁ ΡΣ, ὥστε ἀέρα μὴ παραπνεῖν· τῷ δὲ ἐμβολεῖ <lb n="42,12"></lb>συμφυὴς ἔστω κανὼν ὁ ΤΥ ἰσχυρὸς σφόδρα· πρὸς δὲ <lb n="42,13"></lb>τὸν ἁρμόζοντα ἕτερος κανὼν ὁ ΥΦ περὶ περόνην <lb n="42,14"></lb>κινούμενος τὴν πρὸς τῷ Υ· ὁ αὐτὸς δὲ κηλωνευέσθω <lb n="42,15"></lb>πρὸς ὄρθιον κανόνα τὸν ΨΧ βεβηκότα ἀσφαλῶς. </s> <s id="id.000407">τῇ <lb n="42,16"></lb>δὲ ΝΞΟΠ πυξίδι ἐπικείσθω κατὰ τὸν πυθμένα ἕτερον <lb n="42,17"></lb>πυξίδιον τὸ Ω συντετρημένον αὐτῇ καὶ ἐπιπεπωμα<lb n="42,18"></lb>σμένον ἐκ τῶν ἄνω μερῶν καὶ ἔχον τρύπημα, δι' οὗ <lb n="42,19"></lb>ὁ ἀὴρ εἰσελεύσεται εἰς τὴν πυξίδα. </s> <s id="id.000408">ὑπὸ δὲ τὸ τρύ<lb n="42,20"></lb>πημα λεπίδιον ἔστω ἐπιφράσσον αὐτὸ καὶ ἀνεχόμενον <pb pagenum="194"></pb><lb n="42,21"></lb>διὰ τρηματίων ὑπό τινων περονίων κεφαλὰς ἐχόντων, <pb pagenum="196"></pb><lb n="42,22"></lb>ὥστε μὴ ἐκπίπτειν τὸ λεπίδιον, ὃ δὴ καλεῖται πλατυ<lb n="42,23"></lb>σμάτιον. </s> <s id="id.000409">ἀπὸ δὲ τοῦ Ζ ἕτερος ἀνατεινέτω σωλὴν ὁ <lb n="42,24"></lb>#2Ζ συντετρημένος ἑτέρῳ σωλῆνι πλαγίῳ τῷ #4#5, ἐν <lb n="42,25"></lb>ᾧ ἐπικείσθωσαν οἱ αὐλοὶ συντετρημένοι αὐτῷ οἱ #22Α <lb n="42,26"></lb>καὶ ἔχοντες ἐκ τῶν κάτω μερῶν καθάπερ γλωσσόκομα <lb n="42,27"></lb>συντετρημένα αὐτοῖς, ὧν τὰ στόματα ἀνεῳγότα ἔστω <lb n="42,28"></lb>τὰ #22Β. </s> <s id="id.000410">διὰ δὲ τῶν στομάτων τὰ πώματα διώσθω <lb n="42,29"></lb>τρήματα ἔχοντα, ὥστε εἰσαγομένων τῶν πωμάτων τὰ <lb n="42,30"></lb>ἐν αὐτοῖς τρήματα κατάλληλα γίνεσθαι τοῖς τῶν αὐλῶν <lb n="42,31"></lb>τρήμασιν, ἐξαγομένων δὲ παραλλάσσειν καὶ ἀποφράσσειν <lb n="42,32"></lb>τοὺς αὐλούς. </s> <s id="id.000411">ἐὰν οὖν ὁ πλάγιος κανὼν κηλωνεύηται <lb n="42,33"></lb>διὰ τοῦ Φ εἰς τὸ κάτω μέρος, ὁ ΡΣ ἐμβολεὺς ἐκθλίψει <lb n="42,34"></lb>μετεωριζόμενος τὸν ἐν τῇ ΝΞΟΠ πυξίδι ἀέρα, ὃς <lb n="42,35"></lb>ἀποκλείσει μὲν τὸ ἐν τῷ Ω πυξιδίῳ τρύπημα διὰ τοῦ <lb n="42,36"></lb>προειρημένου πλατυσματίου· χωρήσει δὲ διὰ τοῦ <lb n="42,37"></lb>ΜΛΚΗ σωλῆνος εἰς τὸν πνιγέα· ἐκ δὲ τοῦ πνιγέως <lb n="42,38"></lb>χωρήσει εἰς τὸν πλάγιον σωλῆνα τὸν #4#5 διὰ τοῦ #2Ζ <lb n="42,39"></lb>σωλῆνος· ἐκ δὲ τοῦ πλαγίου σωλῆνος εἰς τοὺς αὐλοὺς <lb n="42,40"></lb>χωρήσει, ὅταν κατάλληλα ᾖ κείμενα [ἐν] τοῖς αὐλοῖς <lb n="42,41"></lb>τὰ ἐν τοῖς πώμασι τρήματα, τουτέστιν ὅταν εἰσηγμένα <pb pagenum="198"></pb><lb n="42,42"></lb>ᾖ τὰ πώματα ἤτοι πάντα ἤ τινα αὐτῶν. </s> <s id="id.000412">ἵνα οὖν, <lb n="42,43"></lb>ὅταν προαιρώμεθα τῶν αὐλῶν τινα φθέγγεσθαι, ἀνοίγη<lb n="42,44"></lb>ται τὰ κατ' ἐκείνους τρήματα, ὅταν δὲ βουλώμεθα <lb n="42,45"></lb>παύεσθαι, ἀποκλείηται, κατασκευάσωμεν τάδε. <lb n="42,46"></lb></s> <s id="id.000413">Νοείσθω ἓν τῶν γλωσσοκόμων ἐγκείμενον χωρὶς <lb n="42,47"></lb>τὸ #22Γ#22Δ, οὗ τὸ στόμα ἔστω τὸ #22Δ, ὁ δὲ συντετρημένος <lb n="42,48"></lb>τούτῳ αὐλὸς ὁ #22Ε, πῶμα δὲ ἔστω ἁρμοστὸν αὐτῷ τὸ <lb n="42,49"></lb>#22#2#22Ζ τρῆμα ἔχον τὸ #22Η παρηλλαγμένον ἀπὸ τοῦ #22Ε <lb n="42,50"></lb>αὐλοῦ. </s> <s id="id.000414">ἔστω δέ τις καὶ ἀγκωνίσκος τρίκωλος ὁ <lb n="42,51"></lb>#22Ζ#22ΘΜ;6Α;6Μ;6Β;6, οὗ τὸ #22Ζ#22Θ κῶλον συμφυὲς μὲν ἔστω τῷ <lb n="42,52"></lb>#22#2#22Ζ πώματι· πρὸς δὲ τῷ #22ΘΜ;6Α;6 περὶ περόνην κινείσθω <lb n="42,53"></lb>μέσην τὴν Μ;6Γ;6. </s> <s id="id.000415">ἐὰν οὖν κατάξωμεν τῇ χειρὶ τὸ Μ;6Β;6 <lb n="42,54"></lb>ἄκρον τοῦ ἀγκωνίσκου ἐπὶ τὸ #22Δ στόμιον τοῦ γλωσσο<lb n="42,55"></lb>κόμου, παρώσομεν τὸ πῶμα εἰς τὸ ἔσω μέρος, ὥστε <lb n="42,56"></lb>ὅταν ἐμπέσῃ εἰς τὸ ἐντὸς μέρος, τότε τὸ ἐν αὐτῷ <lb n="42,57"></lb>τρῆμα κατάλληλον τῷ αὐλῷ γίνεται. </s> <s id="id.000416">ἵνα οὖν, ὅταν <lb n="42,58"></lb>ἀφέλωμεν τὴν χεῖρα, αὐτόματον τὸ πῶμα ἐξελκυσθῇ <pb pagenum="200"></pb><lb n="42,59"></lb>καὶ παραλλάξῃ τὸν αὐλόν, ἔσται τάδε· ὑποκείσθω ὑπὸ <lb n="42,60"></lb>τὰ γλωσσόκομα κανὼν ἴσος τῷ #4#5 σωλῆνι καὶ παράλ<lb n="42,61"></lb>ληλος αὐτῷ κείμενος ὁ Μ;6Δ;6Μ;6Ε;6. </s> <s id="id.000417">ἐν δὲ τούτῳ ἐμπεπηγέτω <lb n="42,62"></lb>σπαθία κεράτινα εὔτονα καὶ ἐπικεκαμμένα, ὧν ἓν ἔστω <lb n="42,63"></lb>τὸ Μ;6#2;6 κείμενον κατὰ τὸ #22Δ#22Γ γλωσσόκομον. </s> <s id="id.000418">ἐκ δὲ <lb n="42,64"></lb>τοῦ ἄκρου αὐτοῦ νευρὰ ἀποδεθεῖσα ἀποδεδόσθω περὶ <lb n="42,65"></lb>τὸ #22Θ ἄκρον, ὥστε ἔξω παρωσθέντος τοῦ πώματος <lb n="42,66"></lb>τετάσθαι τὴν νευράν. </s> <s id="id.000419">ἐὰν οὖν κατάξαντες τὸ Μ;6Β;6 <lb n="42,67"></lb>ἄκρον τοῦ ἀγκωνίσκου παρώσωμεν τὸ πῶμα εἰς τὸ <lb n="42,68"></lb>ἔσω μέρος, ἡ νευρὰ ἐπισπάσεται τὸ σπαθίον, ὥστε <lb n="42,69"></lb>ἀνορθῶσαι τὴν καμπὴν αὐτοῦ βίᾳ· ὅταν δὲ ἀφῶμεν, <lb n="42,70"></lb>πάλιν τὸ σπαθίον εἰς τὴν ἐξ ἀρχῆς τάξιν καμπτόμενον <lb n="42,71"></lb>ἐξελκύσει τὸ πῶμα τοῦ στόματος, ὥστε παραλλάξαι τὸ <lb n="42,72"></lb>τρῆμα. </s> <s id="id.000420">τούτων οὖν καθ' ἕκαστον γλωσσόκομον γενη<lb n="42,73"></lb>θέντων, ὅταν βουλώμεθά τινας τῶν αὐλῶν φθέγγεσθαι, <lb n="42,74"></lb>κατάξομεν τοῖς δακτύλοις τὰ κατ' ἐκείνους ἀγκωνίσκια· <lb n="42,75"></lb>ὅταν δὲ μηκέτι φθέγγεσθαι βουλώμεθα, ἐπαροῦμεν <lb n="42,76"></lb>τοὺς δακτύλους, καὶ τότε παύσονται τῶν πωμάτων <lb n="42,77"></lb>ἐξελκυσθέντων. </s> <s id="id.000421">τὸ δὲ ἐν τῷ βωμίσκῳ ὕδωρ ἐμβάλλε<pb pagenum="202"></pb><lb n="42,78"></lb>ται ἕνεκα τοῦ τὸν περισσεύοντα ἀέρα ἐν τῷ πνιγεῖ, <lb n="42,79"></lb>λέγω δὴ τὸν ἐκ τῆς πυξίδος ὠθούμενον, ἐπαίροντα τὸ <lb n="42,80"></lb>ὕδωρ συνέχεσθαι πρὸς τὸ ἀεὶ ἔχειν τοὺς αὐλοὺς δυνα<lb n="42,81"></lb>μένους φθέγγεσθαι. </s> <s id="id.000422">ὁ δὲ ΡΣ ἐμβολεὺς ἐπαιρόμενος <lb n="42,82"></lb>μὲν ἐπὶ τὸ ἄνω, ὡς εἴρηται, ἐξωθεῖ τὸν ἐν τῇ πυξίδι <lb n="42,83"></lb>ἀέρα εἰς τὸν πνιγέα, καταγόμενος δὲ ἀνοίγει τὸ ἐν <lb n="42,84"></lb>τῷ Ω πυξιδίῳ πλατυσμάτιον, δι' οὗ ἡ πυξὶς ἀέρος <lb n="42,85"></lb>ἔξωθεν πληροῦται, ὥστε πάλιν τὸν ἐμβολέα ἀνωθού<lb n="42,86"></lb>μενον ἐκθλίβειν αὐτὸν εἰς τὸν πνιγέα. </s> <s id="id.000423">βέλτιον δέ <lb n="42,87"></lb>ἐστι καὶ τὸν ΤΥ κανόνα περὶ περόνην κινεῖσθαι πρὸς <lb n="42,88"></lb>τῷ Τ διτορμίας οὔσης ἐν τῷ πυθμένι τοῦ ἐμβολέως <lb n="42,89"></lb>%ἁρμοσθήσεται, δι' ἧς δεήσει περόνην διωθεῖσθαι πρὸς <lb n="42,90"></lb>τὸ τὸν ἐμβολέα μὴ διαστρέφεσθαι, ἀλλὰ ὀρθὸν ἀνωθεῖ<lb n="42,91"></lb>σθαί τε καὶ κατάγεσθαι. <lb n="42,92"></lb></s> </p> <p n="43"> <s id="id.000424">Ὀργάνου κατασκευή, ὥστε ἀνέμου συρίζοντος ἦχον <lb n="43,1"></lb>ἀποτελεῖσθαι αὐλοῦ. <lb n="43,2"></lb><pb pagenum="204"></pb></s> <s id="id.000425">Ἔστωσαν αὐλοὶ μὲν οἱ Α, ὁ δὲ συντετρημένος <lb n="43,3"></lb>αὐτοῖς πλάγιος σωλὴν ὁ ΒΓ, ὁ δὲ ὄρθιος ὁ ΔΕ, ἐκ <lb n="43,4"></lb>δὲ τούτου πλάγιος ἕτερος ὁ ΕΖ φέρων εἰς πυξίδα <lb n="43,5"></lb>τὴν ΗΘ ἔχουσαν τὴν ἐντὸς ἐπιφάνειαν πρὸς ἐμβολέα <lb n="43,6"></lb>ἀπωρθωμένην. </s> <s id="id.000426">ταύτῃ δὲ ἁρμοζέτω ἐμβολεὺς ὁ ΚΛ <lb n="43,7"></lb>εὐλύτως δυνάμενος εἰς αὐτὴν κατέρχεσθαι· τούτῳ δὲ <lb n="43,8"></lb>συμφυὲς ἔστω κανόνιον τὸ ΜΝ προσκείμενον ἑτέρῳ <lb n="43,9"></lb>κανονίῳ τῷ ΝΞ κηλωνευομένῳ περὶ ἄξονα τὸν ΡΠ· <lb n="43,10"></lb>καὶ πρὸς μὲν τῷ Ν περόνιον ἔστω εὔλυτον· πρὸς δὲ <lb n="43,11"></lb>τῷ Ξ πλατυσμάτιον προσκείσθω συμφυὲς τὸ ΞΟ, τῷ <lb n="43,12"></lb>δὲ ΞΟ παρακείσθω ἄξων ὁ Σ καὶ ἔστω κινούμενος <lb n="43,13"></lb>περὶ κνώδακας σιδηροῦς ἐν πήγματι δυναμένῳ μετά<lb n="43,14"></lb>γεσθαι. </s> <s id="id.000427">τῷ δὲ Σ ἄξονι συμφυῆ ἔστω τυμπάνια δύο <lb n="43,15"></lb>τὰ Υ, Φ, ὧν τὸ μὲν Υ σκυτάλια ἐχέτω ἐπικείμενα τῷ <lb n="43,16"></lb>ΞΟ πλατυσματίῳ· τὸ δὲ Φ πλάτας ἐχέτω καθάπερ <lb n="43,17"></lb>τὰ καλούμενα ἀνεμούρια. </s> <s id="id.000428">ὅταν οὖν ὑπὸ τοῦ ἀνέμου <lb n="43,18"></lb>τυπτόμεναι ἐπείγωνται πᾶσαι καὶ ἐπιστρέφωσι τὸ Φ <lb n="43,19"></lb>τυμπάνιον, ἐπιστραφήσεται καὶ ὁ ἄξων, ὥστε καὶ τὸ <lb n="43,20"></lb>Υ τυμπάνιον καὶ τὰ ἐν αὐτῷ σκυτάλια ἐκ διαλείμματος <lb n="43,21"></lb>τύπτοντα τὸ ΞΟ πλατυσμάτιον ἐπαίρει τὸν ΚΛ ἐμβο<lb n="43,22"></lb>λέα· καὶ ἀποστάντος τοῦ σκυταλίου κατενεχθήσεται ὁ <lb n="43,23"></lb>ἐμβολεὺς καὶ ἐκθλίψει τὸν ἐν τῇ ΗΘ πυξίδι ἀέρα εἰς <pb pagenum="206"></pb><lb n="43,24"></lb>τὰς σύριγγας καὶ τοὺς αὐλοὺς καὶ τὸν ἦχον ἀποτελέσει. <lb n="43,25"></lb></s> <s id="id.000429">ἔξεστι δὲ τὸ πῆγμα τὸ ἔχον τὸν ἄξονα ἐπιστρέφειν <lb n="43,26"></lb>ἀεὶ πρὸς τὸν πνέοντα ἄνεμον, ὡς ἂν βιαιοτέρα καὶ <lb n="43,27"></lb>συνεχεστέρα ἡ ἐπιστροφὴ γίνηται. <lb n="43,28"></lb><pb pagenum="208"></pb></s> </p> </chap> <chap n="2"> <p n="1"> <s id="id.000430">Ἀγγείου κατασκευὴ τοῦ λεγομένου δικαιομέτρου· <lb n="1,1"></lb>τούτου δὲ πληρωθέντος ὑγροῦ, ὁσάκις ἐὰν καταστραφῇ, <lb n="1,2"></lb>τὸ ἴσον ἐκρεῖ. <lb n="1,3"></lb></s> <s id="id.000431">Ἔστω τι ἀγγεῖον τὸ ΑΒ διαπεφραγμένον τὸν <lb n="1,4"></lb>τράχηλον τῷ ΑΒ διαφράγματι· πρὸς δὲ τῷ πυθμένι <lb n="1,5"></lb>τοῦ ἀγγείου σφαιρίον ἔστω τὸ Γ χωροῦν τὸ μέτρον <lb n="1,6"></lb>ὅσον βουλόμεθα ἀπορρέειν. </s> <s id="id.000432">διὰ δὲ τοῦ διαφράγματος <lb n="1,7"></lb>καθείσθω σωληνάριον λεπτότατον τὸ ΔΕ συντετρη<lb n="1,8"></lb>μένον τῷ σφαιρίῳ· εἰς δὲ τὸ σφαιρίον τρημάτιον <lb n="1,9"></lb>ἔστω τὸ Ζ ἐν τῷ κατωτάτω μέρει, ἀφ' οὗ ἀνατείνεται <lb n="1,10"></lb>σωληνάριον τὸ ΖΗ φέρον ὑπὸ τὸ ὠτίον τοῦ ἀγγείου <pb pagenum="210"></pb><lb n="1,11"></lb>συντετρημένον αὐτῷ κοίλῳ ὑπάρχοντι. </s> <s id="id.000433">παρὰ δὲ τὸ <lb n="1,12"></lb>εἰρημένον τρῆμα ἕτερον ἔστω τρῆμα φέρον εἰς τὸ <lb n="1,13"></lb>κύτος τοῦ ἀγγείου τὸ Λ. </s> <s id="id.000434">ἐχέτω δὲ τὸ ὠτίον καὶ <lb n="1,14"></lb>διαύγιον τὸ Θ. </s> <s id="id.000435">καταλαβόμενοι οὖν τὸ Θ διαύγιον <lb n="1,15"></lb>πληρώσομεν τὸ ἀγγεῖον ὑγροῦ διά τινος ὀπῆς, ἥτις <lb n="1,16"></lb>μετὰ τὴν ἔγχυσιν στεγνωθήσεται, ἢ καὶ δι' αὐτοῦ <lb n="1,17"></lb>τοῦ ΔΕ σωλῆνος πληρούσθω τὸ ἀγγεῖον, ὄντος μέντοι <lb n="1,18"></lb>ἐν τῷ κύτει τοῦ ἀγγείου λεπτοῦ τρήματος, δι' οὗ ὁ <lb n="1,19"></lb>ἀὴρ ἐκκρουσθήσεται· συμπληρωθήσεται δὲ καὶ τὸ Γ <lb n="1,20"></lb>σφαιρίον ὑγροῦ διὰ τοῦ ΔΕ σωληναρίου. </s> <s id="id.000436">ἐὰν οὖν <lb n="1,21"></lb>καταστρέψαντες τὸ ἀγγεῖον ἀνῶμεν τὸ Θ διαύγιον, <lb n="1,22"></lb>ἐκρεύσει τὸ ἐν τῷ Γ σφαιρίῳ ὑγρὸν καὶ τὸ ἐν τῷ <lb n="1,23"></lb>ΔΕ σωληναρίῳ. </s> <s id="id.000437">πάλιν οὖν ἐὰν καταλαβόμενοι τὸ <pb pagenum="212"></pb><lb n="1,24"></lb>διαύγιον ἀναστρέψωμεν, πληρωθήσεται τὸ σφαιρίον <lb n="1,25"></lb>καὶ τὸ σωληνάριον· ὁ γὰρ ἐν αὐτοῖς ἀὴρ ἐκκρουσθή<lb n="1,26"></lb>σεται ὑπὸ τοῦ ἐμπίπτοντος ὑγροῦ. </s> <s id="id.000438">εἶτα πάλιν ὅταν <lb n="1,27"></lb>καταστρέψωμεν τὸ ἀγγεῖον, πάλιν τὸ ἴσον ὑγρὸν ῥυή<lb n="1,28"></lb>σεται, εἰ μὴ ἄρα παρὰ τὴν διαφορὰν τοῦ ΔΕ σωλῆνος· <lb n="1,29"></lb>οὐ γὰρ ἀεὶ πληρωθήσεται, ἀλλὰ κατὰ τὴν τοῦ ἀγγείου <lb n="1,30"></lb>κένωσιν καὶ αὐτὸς κενωθήσεται· αὕτη δὲ ἡ διαφορὰ <lb n="1,31"></lb>παντάπασιν ἐλαχίστη ἐστίν. <lb n="1,32"></lb></s> </p> <p n="2"> <s id="id.000439">Εἰς ἔνια ἀγγεῖα διαφυσηθέντα ὕδωρ ἀναπιέζει οὕτως. <lb n="2,1"></lb></s> <s id="id.000440">Διὰ τοῦ στόματος αὐτοῦ διωθεῖται σωλὴν ἀπέχων <lb n="2,2"></lb>μὲν ἀπὸ τοῦ πυθμένος βραχύ, συνεστεγνωμένος δὲ τῷ <lb n="2,3"></lb>στόματι καὶ εἰς λεπτὸν συνηγμένος στόμιον. </s> <s id="id.000441">ἐὰν <lb n="2,4"></lb>[2οὖν]2 καταλαβόμενοι τὸ εἰρημένον στόμιον τῷ δακτύλῳ <lb n="2,5"></lb>ἐγχέωμεν διά τινος ὀπῆς ὑγρὸν καὶ μετὰ τὴν ἔγχυσιν <lb n="2,6"></lb>διὰ τῆς αὐτῆς ὀπῆς ἐμφυσήσαντες κλειδίῳ ἀποκλεί<lb n="2,7"></lb>σωμεν τὴν ὀπὴν καὶ ἀνῶμεν τὸ τοῦ σωλῆνος στόμιον, <lb n="2,8"></lb>ἀναπυτισθήσεται δι' αὐτοῦ τὸ ὑγρὸν ὑπὸ τοῦ ἐμφυση<lb n="2,9"></lb>θέντος καὶ πεπιλημένου ἀέρος. <lb n="2,10"></lb><pb pagenum="214"></pb></s> </p> <p n="3"> <s id="id.000442">Ἐπί τινος βωμοῦ πυρὸς ἀνακαυθέντος ζῴδια κατα<lb n="3,1"></lb>φανήσεται χορεύοντα· οἱ γὰρ βωμοὶ διαφανεῖς, ἤτοι <lb n="3,2"></lb>ὑάλινοι ἢ κεράτινοι, ἔσονται. <lb n="3,3"></lb></s> <s id="id.000443">Διὰ τοῦ ἐπιπύρου καθίεται σωλὴν πρὸς μὲν τὴν <lb n="3,4"></lb>βάσιν τοῦ βωμοῦ ἐν κνώδακι στρεφόμενος, πρὸς δὲ <lb n="3,5"></lb>τὸ ἄνω μέρος συριγγίῳ συμφυεῖ ὄντι τῷ ἐπιπύρῳ. <lb n="3,6"></lb></s> <s id="id.000444">ἐχέτω δὲ καὶ ἐπικεκαμμένα σωληνάρια ὁ σωλὴν συν<lb n="3,7"></lb>τετρημένα καὶ συμφυῆ ἑαυτῷ κατὰ διάμετρον κείμενα <lb n="3,8"></lb>ἀλλήλοις καὶ τὰς [2καμπὰσ]2 καὶ ἐναλλὰξ ἔχοντα. </s> <s id="id.000445">ἐχέτω <lb n="3,9"></lb>δὲ ὁ σωλὴν καὶ τύμπανον συμφυές, ᾧ ἐπίκειται τὰ <lb n="3,10"></lb>χορεύοντα ζῴδια. </s> <s id="id.000446">ἐξαφθείσης οὖν τῆς θυσίας θερμαι<pb pagenum="216"></pb><lb n="3,11"></lb>νόμενος ὁ ἀὴρ διὰ τοῦ συριγγίου χωρήσει εἰς τὸν <lb n="3,12"></lb>σωλῆνα, ἐκ δὲ τούτου διὰ τῶν ἀνακεκαμμένων [2σωλη<lb n="3,13"></lb>ναρίων]2 ἐξωθούμενος καὶ ἀντερείδων τῷ τεύχει τοῦ <lb n="3,14"></lb>βωμοῦ ἐπιστρέψει τὸν σωλῆνα καὶ τὰ χορεύοντα ζῴδια. <lb n="3,15"></lb></s> </p> <p n="4"> <s id="id.000447">Ἐκ διαλειμμάτων φωναὶ γίνονται ὀρνιθαρίων οὕτως. <lb n="4,1"></lb></s> <s id="id.000448">Ἀγγεῖον ἔσται στεγνόν, δι' οὗ χώνη διεῖται, ἧς ὁ <lb n="4,2"></lb>καυλὸς ἀπέχει ἀπὸ τοῦ πυθμένος ὅσον ὕδατι διάρρυσιν. <lb n="4,3"></lb></s> <s id="id.000449">ὑπέρκειται δὲ τῆς χώνης ἀγγεῖον κοῖλον ἐν κνώδαξι <lb n="4,4"></lb>στρεφόμενον τὰ βάρη εἰς τὸ ἄνω μέρος ἔχον, εἰς ὃ <pb pagenum="218"></pb><lb n="4,5"></lb>φέρεται ἀεὶ ἐπίρρυτον ὕδωρ. </s> <s id="id.000450">συμβαίνει οὖν κενοῦ <lb n="4,6"></lb>ὄντος τοῦ ἐκνωδακισμένου ἀγγείου ὀρθὸν αὐτὸ δια<lb n="4,7"></lb>μένειν· βαρύλλιον γὰρ ἔχει προσκείμενον τῷ πυθμένι. <lb n="4,8"></lb></s> <s id="id.000451">πληρωθέντος δὲ καταστρέφεται τὸ ὕδωρ εἰς τὸ στεγνὸν <lb n="4,9"></lb>ἀγγεῖον. </s> <s id="id.000452">ὁ δὲ ἐν τούτῳ ἀὴρ ἐκθλιβόμενος διά τινος <lb n="4,10"></lb>συριγγίου τὸν ἦχον ἀποτελεῖ. </s> <s id="id.000453">κενοῦται δὲ τὸ ἀγγεῖον <lb n="4,11"></lb>διά τινος καμπύλου σίφωνος. </s> <s id="id.000454">ἐν ὅσῳ δὲ ἡ κένωσις <lb n="4,12"></lb>γίνεται, πάλιν τὸ ἐκνωδακισμένον ἀγγεῖον πληρωθὲν <lb n="4,13"></lb>καταστρέφεται. </s> <s id="id.000455">δεήσει δὲ τὴν ἐπίρρυσιν μὴ κατὰ <lb n="4,14"></lb>μέσον φέρεσθαι τοῦ ἐκνωδακισμένου, ὥστε πληρωθὲν <lb n="4,15"></lb>ταχέως καταστρέφεσθαι. <lb n="4,16"></lb></s> </p> <p n="5"> <s id="id.000456">Καὶ ἄλλως δὲ ἐκ διαλειμμάτων ἦχοι γίνονται τόνδε <lb n="5,1"></lb>τὸν τρόπον. <lb n="5,2"></lb></s> <s id="id.000457">Ἀγγεῖόν ἐστι πλείονα ἔχον διαφράγματα πλάγια· <lb n="5,3"></lb>ἐν δὲ ταῖς χώραις διαβῆταί εἰσι φέροντες εἰς τὰς <lb n="5,4"></lb>ὑποκειμένας χώρας ἄνισοι ταῖς ἐπιρρύσεσιν· ἐν δὲ τῷ <pb pagenum="220"></pb><lb n="5,5"></lb>ὑποκάτω ἀγ<lb n="5,6"></lb>γείῳ πρόσ<lb n="5,7"></lb>κειται τὸ <lb n="5,8"></lb>συρίγγιον <lb n="5,9"></lb>τὸ καὶ τὸν <lb n="5,10"></lb>ἦχον ποι<lb n="5,11"></lb>οῦν· εἰς δὲ <lb n="5,12"></lb>τὸ ἄνω ἀγ<lb n="5,13"></lb>γεῖον φέρε<lb n="5,14"></lb>ται ἡ ῥύσις. <lb n="5,15"></lb></s> <s id="id.000458">καὶ συμβαί<lb n="5,16"></lb>νει πληρω<lb n="5,17"></lb>θέντος τοῦ <lb n="5,18"></lb>ἄνω ἀγγείου <lb n="5,19"></lb>μεταχωρεῖν <lb n="5,20"></lb>διὰ τοῦ ἐν <lb n="5,21"></lb>αὐτῷ διαβή<lb n="5,22"></lb>του εἰς τὸ ὑποκείμενον, ἄχρις ἂν ἐπὶ τὸ τελευταῖον παρα<lb n="5,23"></lb>γένηται τὸ ὑγρὸν στεγνοῦ αὐτοῦ ὄντος· ὁ δ' ἐν τούτῳ <lb n="5,24"></lb>ἀὴρ ἐκθλιβόμενος διὰ τοῦ συριγγίου τὸν ἦχον ἀποτελεῖ. <lb n="5,25"></lb><pb pagenum="222"></pb></s> </p> <p n="6"> <s id="id.000459">Καὶ σφαῖραι δὲ ὀχοῦνται ἐπ' ἀέρος οὕτως. <lb n="6,1"></lb></s> <s id="id.000460">Λέβης ὕδωρ ἔχων ὑποκαίεται ἐπιπεφραγμένος τὸ <lb n="6,2"></lb>στόμα· ἀπὸ δὲ τοῦ ἐπιφράγματος ἀνατείνεται σωλήν, <lb n="6,3"></lb>οὗ ἐκ τοῦ ἄκρου ἡμισφαίριον κοῖλον συντέτρηται. <lb n="6,4"></lb></s> <s id="id.000461">ἐὰν οὖν κοῦφον σφαιρίον ἐμβάλωμεν εἰς τὸ ἡμισφαίριον, <lb n="6,5"></lb>συμβήσεται τὴν ἐκ τοῦ λέβητος ἀτμίδα διὰ τοῦ σωλῆνος <lb n="6,6"></lb>φερομένην ἀνακουφίζειν τὸ σφαιρίον εἰς τὸν ἀέρα, <lb n="6,7"></lb>ὥστε ἐποχεῖσθαι. <lb n="6,8"></lb></s> </p> <p n="7"> <s id="id.000462">Γίνεται δὲ καὶ σφαῖρα διαφανὴς ἔχουσα ἐντὸς <lb n="7,1"></lb>ἑαυτῆς ἀέρα καὶ ὑγρὸν καὶ ἐντὸς αὑτῆς ἐν μέσῳ <lb n="7,2"></lb>σφαιρίον εἰς ὑπόδειγμα τοῦ κόσμου. <lb n="7,3"></lb></s> <s id="id.000463">Γίνεται γὰρ δύο ἡμισφαίρια ὑάλινα· τὸ δὲ ἓν <lb n="7,4"></lb>αὐτῶν ἐπιφράσσεται λεπίδι χαλκῇ τρύπημα ἐχούσῃ <lb n="7,5"></lb>ἐν μέσῳ στρογγύλον· τούτῳ δὲ σφαιρίον γίνεται <lb n="7,6"></lb>ἔλαττον κοῦφον, καὶ ἐμβάλλεται τὸ σφαιρίον εἰς ὕδωρ <lb n="7,7"></lb>ἐν τῷ ἑτέρῳ ἡμισφαιρίῳ. </s> <s id="id.000464">εἶτα προστίθεται τούτῳ τὸ <lb n="7,8"></lb>διαπεφραγμένον ἡμισφαίριον, καὶ ποσοῦ ὑγροῦ ἐξαιρε<lb n="7,9"></lb>θέντος ἐκ τοῦ ὕδατος καθέξει τὸ σφαιρίον ὁ ἐν μέσῳ <lb n="7,10"></lb>τόπος. </s> <s id="id.000465">προστεθέντος οὖν τοῦ ἑτέρου ἡμισφαιρίου <lb n="7,11"></lb>ἀποτελεῖται τὸ προκείμενον. <lb n="7,12"></lb><pb pagenum="224"></pb></s> </p> <p n="8"> <s id="id.000466">Ἡ καλουμένη λιβὰς στάξει, ἡλίου ἐπιβαλόντος αὐτῇ. <lb n="8,1"></lb></s> <s id="id.000467">Ἔστω βάσις στεγνὴ ἡ ΑΒΓΔ, δι' ἧς χώνη διώσθω, <lb n="8,2"></lb>ἧς ὁ καυλὸς ἀπεχέτω ἀπὸ τοῦ πυθμένος βραχὺ λίαν. <lb n="8,3"></lb></s> <s id="id.000468">ἔστω δὲ καὶ σφαιρίον τὸ ΕΖ, ἀφ' οὗ σωλὴν φερέτω <lb n="8,4"></lb>εἰς τὴν βάσιν ἀπέχων ἀπὸ τοῦ πυθμένος τοῦ ἀγγείου <lb n="8,5"></lb>καὶ τοῦ τεύχους τοῦ σφαιρίου βραχύ. </s> <s id="id.000469">καμπύλος δὲ <lb n="8,6"></lb>σίφων ἐναρμοσθεὶς εἰς τὸ σφαιρίον φερέτω εἰς τὴν <lb n="8,7"></lb>χώνην, καὶ ἐμβεβλήσθω εἰς τὸ σφαιρίον ὕδωρ. </s> <s id="id.000470">ὅταν <lb n="8,8"></lb>οὖν ὁ ἥλιος ἐπιβάλῃ τῷ σφαιρίῳ, θερμανθεὶς ὁ ἐν <lb n="8,9"></lb>αὐτῷ ἀὴρ ἐκθλίψει τὸ ὑγρόν, ὃ δὴ διὰ τοῦ Η σίφωνος <lb n="8,10"></lb>ἔξω ἐνεχθήσεται καὶ διὰ τῆς χώνης εἰς τὴν βάσιν <lb n="8,11"></lb>χωρήσει. </s> <s id="id.000471">ὅταν δὲ ἐπισκιασθῇ, ἐκχωρήσαντος τοῦ ἀέρος <lb n="8,12"></lb>διὰ τοῦ σφαιρίου ὁ σωλὴν ἀναλήψεται τὸ ὑγρὸν καὶ <lb n="8,13"></lb>ἀναπληρώσει τὸν κενωθέντα τόπον· καὶ τοῦτο ἔσται, <lb n="8,14"></lb>ὁσάκις ἂν ὁ ἥλιος ἐπιβάλῃ. <lb n="8,15"></lb></s> </p> <p n="9"> <s id="id.000472">Θύρσον εἰς ὕδωρ χαλάσαντα ἦχον ἀποτελέσαι ἤτοι <lb n="9,1"></lb>σύριγγος ἢ ὀρνέου τινός. <lb n="9,2"></lb></s> <s id="id.000473">Ἔστω θύρσος ὁ ΑΒΓΔ τρῆμα ἔχων κατὰ τὴν <lb n="9,3"></lb>τοῦ κορύμβου κορυφὴν τὸ Δ· κοῖλος δὲ ἔστω ὁ κόρυμβος <pb pagenum="226"></pb><lb n="9,4"></lb>καθάπερ στρόβιλος καὶ τὸν καυλὸν ἐχέτω διαπεφραγ<lb n="9,5"></lb>μένον μικρὸν ὑπὸ τὸ στόμα τῷ ΑΕ διαφράγματι· <lb n="9,6"></lb>τούτῳ δὲ προσκείσθω συρίγγιον τὸ Ζ ὑπὸ τὸ στόμα <lb n="9,7"></lb>κείμενον τοῦ σωλῆνος καὶ συντετρημένον τῷ διαφράγ<lb n="9,8"></lb>ματι. </s> <s id="id.000474">ὅταν οὖν ἐμβαλόντες τὸ θυρσίον εἰς ὕδωρ θλί<lb n="9,9"></lb>βωμεν εἰς τὸ κάτω, ὁ ἐν αὐτῷ ἀὴρ ἐκθλιβόμενος ἐκ <lb n="9,10"></lb>τοῦ ὕδατος ἦχον ἀποτελέσει. </s> <s id="id.000475">καὶ ἐὰν μὲν ᾖ ψιλὸν τὸ <lb n="9,11"></lb>συρίγγιον, συρίσει μόνον· ἐὰν δὲ ἔχῃ καὶ ποσὸν <lb n="9,12"></lb>ὑδάτιον ὑπὲρ τὸ διάφραγμα, καχλάζων ἔσται ἦχος. <lb n="9,13"></lb></s> </p> <p n="10"> <s id="id.000476">Ζῳδίου ἐπὶ βάσεως ὄντος καὶ ἔχοντος ἐν τῷ στό<lb n="10,1"></lb>ματι σάλπιγγα, ἐὰν ἐμφυσήσωμεν, σαλπίσει. <lb n="10,2"></lb></s> <s id="id.000477">Ἔστω βάσις στεγνὴ ἡ ΑΒΓΔ, ἐφ' ἧς ἐφεστάτω <lb n="10,3"></lb>ζῴδιον· ἐντὸς δὲ τῆς βάσεως ἡμισφαίριον ἔστω κοῖλον <lb n="10,4"></lb>ἐπιπεφραγμένον τὸ ΕΖΗ ἔχον παρὰ τὸν πυθμένα <lb n="10,5"></lb>τρυπημάτια· ἐκ δὲ τοῦ ἡμισφαιρίου ἀνατεινέτω σωλὴν <pb pagenum="228"></pb><lb n="10,6"></lb>ὁ ΘΖ εἰς τὸ ζῴδιον φέρων ἐπὶ τὴν σάλπιγγα· ἐχέτω <lb n="10,7"></lb>δὲ καὶ γλωσσίδα ἡ σάλπιγξ. </s> <s id="id.000478">κεχύσθω δὲ εἰς τὴν <lb n="10,8"></lb>βάσιν ὑγρὸν διά τινος ὀπῆς, ἣ μετὰ τὴν ἔγχυσιν πάλιν <lb n="10,9"></lb>ἀπεστεγνώσθω σμηρίσματί τινι. </s> <s id="id.000479">ὅταν οὖν ἐμφυσῶ<lb n="10,10"></lb>μεν εἰς τὸν κώδωνα τῆς σάλπιγγος, ὁ ἐξ ἡμῶν ἀὴρ <lb n="10,11"></lb>ἐκθλίψει τὸ ἐν τῷ ἡμισφαιρίῳ ὕδωρ διὰ τῶν τρυπημά<lb n="10,12"></lb>των, ὃ προσαναβήσεται εἰς τὴν βάσιν μετεωριζόμενον· <lb n="10,13"></lb>ὅταν δὲ ἀποσπάσωμεν, πάλιν εἰσελεύσεται εἰς τὸ ἡμι<lb n="10,14"></lb>σφαίριον καὶ ἐκθλίψει τὸν ἀέρα. </s> <s id="id.000480">οὗτος δὲ διὰ τῆς <lb n="10,15"></lb>γλωσσίδος ἐξερχόμενος τὸν τῆς σάλπιγγος ἦχον ἀποτε<lb n="10,16"></lb>λέσει. <lb n="10,17"></lb></s> </p> <p n="11"> <s id="id.000481">Λέβητος ὑποκαιομένου σφαιρίον πρὸς κνώδακα <lb n="11,1"></lb>κινεῖσθαι. <lb n="11,2"></lb></s> <s id="id.000482">Ἔστω λέβης ὑποκαιόμενος ἔχων ὕδωρ ὁ ΑΒ καὶ <lb n="11,3"></lb>ἐπιπεφράχθω τὸ στόμιον τῷ ΓΔ πώματι· τούτῳ δὲ <lb n="11,4"></lb>συντετρήσθω σωλὴν ἐπικαμπὴς ὁ ΕΖΗ, οὗ τὸ ἄκρον <pb pagenum="230"></pb><lb n="11,5"></lb>εἰς κοῖλον σφαιρίον ἐνηρμόσθω τὸ ΘΚ· τῷ δὲ ἄκρῳ <lb n="11,6"></lb>τῷ Η κατὰ διάμετρον ἔστω κνώδαξ ὁ ΛΜ βεβηκὼς <lb n="11,7"></lb>ἐπὶ τοῦ ΓΔ <lb n="11,8"></lb>πώματος. </s> <s id="id.000483">ἡ <lb n="11,9"></lb>δὲ σφαῖρα <lb n="11,10"></lb>ἐχέτω δύο <lb n="11,11"></lb>σωληνάρια <lb n="11,12"></lb>ἐπικαμπῆ <lb n="11,13"></lb>κατὰ διάμε<lb n="11,14"></lb>τρον συντε<lb n="11,15"></lb>τρημένα αὐ<lb n="11,16"></lb>τῇ καὶ ἐπι<lb n="11,17"></lb>κεκαμμένα <lb n="11,18"></lb>ἐναλλάξ. </s> <s id="id.000484">αἱ <lb n="11,19"></lb>δὲ καμπαὶ <lb n="11,20"></lb>ἔστωσαν <lb n="11,21"></lb>πρὸς ὀρθὰς <lb n="11,22"></lb>ἐπινοούμε<lb n="11,23"></lb>ναι καὶ διὰ <lb n="11,24"></lb>τῶν Η, Λ <lb n="11,25"></lb>εὐθειῶν. <lb n="11,26"></lb></s> <s id="id.000485">συμβήσεται <lb n="11,27"></lb>οὖν θερμαινομένου τοῦ λέβητος τὴν ἀτμίδα διὰ τοῦ <lb n="11,28"></lb>ΕΖΗ εἰς τὴν σφαῖραν ἐμπίπτουσαν ἐκπίπτειν διὰ τῶν <pb pagenum="232"></pb><lb n="11,29"></lb>ἀνακεκαμμένων [2σωληναρίων]2 εἰς τὸ πῶμα καὶ στρέφειν <lb n="11,30"></lb>τὴν σφαῖραν, καθάπερ ἐπὶ τῶν χορευόντων ζῳδίων. <lb n="11,31"></lb></s> </p> <p n="12"> <s id="id.000486">Κρατῆρος ὄντος ἐπί τινος βάσεως καὶ κρουνὸν <lb n="12,1"></lb>ἔχοντος ἀνεῳγότα μεταξὺ τοῦ ῥέειν παύσασθαι μὴ <lb n="12,2"></lb>ὄντος ἁρμοστοῦ πώματος τοῦ κλείοντος τὸν κρουνόν. <lb n="12,3"></lb></s> <s id="id.000487">διὰ δὲ <lb n="12,4"></lb>τοῦ πυθμένος τοῦ ἀγγείου καὶ τῆς βάσεως σωλὴν <lb n="12,5"></lb>διώσθω ὁ ΔΕΖ εἰς κρουνὸν ἀποδεδομένος. </s> <s id="id.000488">ἐπὶ δὲ <lb n="12,6"></lb>τοῦ ὠτίου τοῦ κρατῆρος κανόνιον ἐφεστάτω τὸ ΗΘ <lb n="12,7"></lb>πεπηγός, πρὸς ὃ κηλωνευέσθω ἕτερον τὸ ΚΛ περὶ <lb n="12,8"></lb>περόνην τὴν Θ· ἐκ δὲ τοῦ Κ ἄκρου κανόνιον καθείσθω <lb n="12,9"></lb>ἕτερον τὸ ΚΜ περὶ μὲν τὸ Κ περόνῃ κινούμενον· <lb n="12,10"></lb>πρὸς δὲ τῷ Μ πυξίδα ἐχέτω τὴν ΝΞ βάρος ἔχουσαν <lb n="12,11"></lb>καὶ δυναμένην περιβαίνειν περὶ τὸν ΔΕΖ σωλῆνα. <lb n="12,12"></lb></s> <s id="id.000489">ὅταν οὖν πλήρους ὄντος τοῦ κρατῆρος πιέσωμεν τὸ Λ <lb n="12,13"></lb>ἄκρον τοῦ κανόνος εἰς τὸ κάτω μέρος, ἀνενεχθήσεται <lb n="12,14"></lb>ἡ ΝΞ πυξίς· ταύτης δὲ ἐπαρθείσης τὸ ἐν τῷ κρα<lb n="12,15"></lb>τῆρι ὕδωρ διὰ τοῦ ΔΕΖ σωλῆνος ἔξω ἐνεχθήσεται· <pb pagenum="234"></pb><lb n="12,16"></lb>ἐὰν δὲ ἀφῶμεν τὸ Λ ἄκρον, καταχθήσεται ἡ πυξὶς καὶ <lb n="12,17"></lb>περικείσεται τῷ ΔΕΖ σωλῆνι, καὶ ὁ ἐν αὐτῇ ἀὴρ <lb n="12,18"></lb>μὴ ἔχων διέξοδον διαστέλλει τὸ περὶ τὸν ΔΕΖ σωλῆνα <lb n="12,19"></lb>ὑγρόν, ὥστε μηκέτι φέρεσθαι διὰ τοῦ Δ στομίου. <lb n="12,20"></lb></s> <s id="id.000490">ὅταν δὲ πάλιν πιέσωμεν εἰς τὸ κάτω μέρος τὸ Λ ἄκρον, <lb n="12,21"></lb>ῥεύσει ὁ κρουνός. <lb n="12,22"></lb></s> </p> <p n="13"> <s id="id.000491">Ῥυτοῦ κατασκευή, ὥστε ἐπικειμένου ὑελίνου ἐπιθέ<lb n="13,1"></lb>ματος καὶ ἐκρέοντος τοῦ ῥυτοῦ προσαναβαίνειν τῷ <lb n="13,2"></lb>ὑαλίνῳ καὶ ἀναβάλλεσθαι τὸ ὑγρόν. <lb n="13,3"></lb></s> <s id="id.000492">Ἔστω ῥυτὸν τὸ ΑΒΓ ἐπιπεφραγμένον τῷ ΔΕ <lb n="13,4"></lb>ἐπιφράγματι· ἐκ δὲ τοῦ ΔΕ δύο σωλῆνες φερέτωσαν <lb n="13,5"></lb>οἱ ΖΗ, ΘΚ, ὧν ὁ μὲν ΖΗ εἰς τὸ ἐκτός, ὁ δὲ ΘΚ <lb n="13,6"></lb>εἰς τὸ ἐντός. </s> <s id="id.000493">τούτους δὲ περιλαμβανέτω ὑέλινον ἐπί<pb pagenum="236"></pb><lb n="13,7"></lb>θεμα τὸ ΜΝ. </s> <s id="id.000494">ἔστω δὲ τῷ ἐπιφράγματι ἐκ τοῦ ὑελίνου <lb n="13,8"></lb>διαύγιον τὸ Ξ, δι' οὗ ὕδωρ ἐγχυθήσεται. </s> <s id="id.000495">πληρω<lb n="13,9"></lb>θέντος οὖν τοῦ ῥυτοῦ διὰ τοῦ εἰρημένου διαυγίου, <lb n="13,10"></lb>συμπληρωθήσεται καὶ ὁ <lb n="13,11"></lb>ΘΚ σωλήν· καὶ ἐγχυνο<lb n="13,12"></lb>μένου τοῦ ὑγροῦ, προσ<lb n="13,13"></lb>αναβήσεται εἰς τὸ ὑέλι<lb n="13,14"></lb>νον, ὥστε διὰ τοῦ ΖΗ <lb n="13,15"></lb>σωλῆνος εἰς τὸ ἐκτὸς ἐνε<lb n="13,16"></lb>χθήσεται· καὶ ἔσται σί<lb n="13,17"></lb>φωνος καμπύλου τάξις, <lb n="13,18"></lb>οὗ τὸ μὲν ἔλασσον σκέλος <lb n="13,19"></lb>τὸ ΘΚ, τὸ δὲ μεῖζον τὸ <lb n="13,20"></lb>ΖΗ. </s> <s id="id.000496">διὸ δὴ ἐπισπάσεται <lb n="13,21"></lb>τὸ ἐν τῷ ῥυτῷ ὑγρὸν <lb n="13,22"></lb>προσαναβαῖνον εἰς τὸ <lb n="13,23"></lb>ὑέλινον ἐπίθεμα. </s> <s id="id.000497">πρό<lb n="13,24"></lb>τερον δὲ τὸν ἐν αὐτῷ <lb n="13,25"></lb>ἀέρα ἐπισπάσεται διὰ τὸ <lb n="13,26"></lb>κουφότερον εἶναι τοῦ ὑγροῦ. </s> <s id="id.000498">εἰς δὲ τὸν κενούμενον <lb n="13,27"></lb>τοῦ ἀέρος τόπον τὸ ὑγρὸν ἀναβαλλόμενον φανήσεται <lb n="13,28"></lb>καὶ τῷ ἰδίῳ βάρει καταφερόμενον· παρὰ φύσιν γὰρ <lb n="13,29"></lb>αὐτῷ ἡ φορὰ εἰς τὸ ἄνω μέρος γίνεται. <lb n="13,30"></lb><pb pagenum="238"></pb></s> </p> <p n="14"> <s id="id.000499">Ἔστι δὲ καὶ ἄλλο κατασκεύασμα, ἐν ᾧ ὑγρὸν ἀνα<lb n="14,1"></lb>φέρεται ἠρέμα καὶ μένει, ὥστε ἀεὶ προσαναβαῖνον <lb n="14,2"></lb>ὁρᾶσθαι. <lb n="14,3"></lb></s> <s id="id.000500">Ἔστω τις βάσις ἡ ΑΒ στεγνὴ πάντοθεν διάφραγμα <lb n="14,4"></lb>ἔχουσα τὸ ΓΔ, ὑέλινον δὲ ἐπίθεμα κυλινδρικὸν τὸ <lb n="14,5"></lb>ΕΖ καὶ αὐτὸ στεγνὸν πάντοθεν· ἐν δὲ τῷ ΕΖ ἐπι<lb n="14,6"></lb>θέματι σωλὴν ἔστω ὁ ΗΘ ἀπέχων ἀπὸ τῆς στέγης <lb n="14,7"></lb>αὐτοῦ βραχύ, συντετρημένος δὲ τῷ ΓΔ διαφράγματι. <lb n="14,8"></lb></s> <s id="id.000501">ἕτερος δὲ σωλὴν ὁ ΚΛ συν<lb n="14,9"></lb>τετρήσθω μὲν τῷ ἐπιφράγματι <lb n="14,10"></lb>τῆς βάσεως, ἀπεχέτω δὲ ἀπὸ τοῦ <lb n="14,11"></lb>διαφράγματος βραχύ. </s> <s id="id.000502">ἔστω δὲ <lb n="14,12"></lb>καὶ τῇ βάσει ἐκτὸς τοῦ ὑελίνου <lb n="14,13"></lb>ἐπιθέματος ὀπὴ ἡ Μ, δι' ἧς <lb n="14,14"></lb>πληρωθήτω τὸ ΑΔ ἀγγεῖον. <lb n="14,15"></lb></s> <s id="id.000503">ἐχέτω δὲ καὶ ἡ ΑΒ βάσις κρου<lb n="14,16"></lb>νὸν παρ' αὐτὸν τὸν πυθμένα, <pb pagenum="240"></pb><lb n="14,17"></lb>τὸν Ν. </s> <s id="id.000504">ἔστω δὲ καὶ ἕτερος σωλὴν ὁ ΞΟ συντετρη<lb n="14,18"></lb>μένος μὲν τῷ διαφράγματι, ἀπέχων δὲ ἀπὸ τῆς βάσεως <lb n="14,19"></lb>βραχύ, δι' οὗ πληρωθήσεται τὸ ΓΒ ἀγγεῖον. </s> <s id="id.000505">κατα<lb n="14,20"></lb>ληφθέντος οὖν τοῦ Ν κρουνοῦ, ὁ ἐν τῷ ΓΒ ἀὴρ ἐκχω<lb n="14,21"></lb>ρήσει διὰ τοῦ ΗΘ καὶ τοῦ ΚΛ καὶ τῆς Μ ὀπῆς εἰς <lb n="14,22"></lb>τὸ ἐκτός. </s> <s id="id.000506">ὅταν οὖν πληρωθῇ τὸ ΓΒ ἀγγεῖον, πληρώ<lb n="14,23"></lb>σωμεν καὶ τὸ ΑΔ διὰ τῆς Μ ὀπῆς· ὁ γὰρ ἐν αὐτῷ <lb n="14,24"></lb>ἀὴρ διὰ τῆς ὀπῆς ἐκχωρήσει. </s> <s id="id.000507">ἐὰν οὖν ἀφῶμεν τὸν Ν <lb n="14,25"></lb>κρουνὸν ῥέειν, εἰς τὸν κενούμενον τοῦ ΓΒ τόπον ὁ <lb n="14,26"></lb>ἀὴρ ἐκ τοῦ ὑελίνου ἐπιθέματος μεταχωρήσει διὰ τοῦ <lb n="14,27"></lb>ΗΘ σωλῆνος· εἰς δὲ τὸν κενούμενον τούτου τόπον ἐκ <lb n="14,28"></lb>τοῦ ΑΔ ἀγγείου ὕδωρ προσαναβήσεται διὰ τοῦ ΚΛ <lb n="14,29"></lb>σωλῆνος. </s> <s id="id.000508">πάλιν δὲ εἰς τὸν κενούμενον τόπον τοῦ ΑΔ <lb n="14,30"></lb>ἀγγείου ὁ ἀὴρ διὰ τῆς Μ ὀπῆς παρεισελεύσεται· καὶ <lb n="14,31"></lb>τοῦτο [2ἔσται]2, ἄχρις ἂν πληρωθῇ τὸ ὑέλινον ἐπίθεμα. <lb n="14,32"></lb><pb pagenum="242"></pb></s> <s id="id.000509">δεήσει δὲ τὰ ΑΔ, ΓΒ, ΕΖ χωρήματα ἴσα εἶναι, ὅπως <lb n="14,33"></lb>εἰς ἄλληλα μεταχωρῇ ὅ τε ἀὴρ καὶ τὸ ὑγρόν. </s> <s id="id.000510">ὅταν δὲ <lb n="14,34"></lb>κενωθῇ τὸ ΓΒ ἀγγεῖον καὶ διασταθῇ ἡ τοῦ ἀέρος συν<lb n="14,35"></lb>έχεια, πάλιν κατενεχθήσεται ἐκ τοῦ ὑελίνου ὕδωρ εἰς <lb n="14,36"></lb>τὸ ΑΔ ἀγγεῖον, τοῦ ἀέρος μεταχωροῦντος διὰ τοῦ Ν <lb n="14,37"></lb>κρουνοῦ καὶ τοῦ ΗΘ σωλῆνος εἰς τὸ ὑέλινον ἐπίθεμα· <lb n="14,38"></lb>ὁ δὲ ἐν τῷ ΑΔ ἀὴρ ἐκχωρήσει διὰ τῆς Μ ὀπῆς. <lb n="14,39"></lb></s> </p> <p n="15"> <s id="id.000511">Εἰς ἔνια ζῴδια ἐμφυσηθέντα διὰ τοῦ στόματος δι' <lb n="15,1"></lb>ἑτέρου τόπου ὕδωρ ἐκπυτίζει· οἷον ἐὰν Σατυρίσκος <lb n="15,2"></lb>ἀσκὸν κατέχῃ, διὰ τοῦ ἀσκοῦ ἐκπυτισθήσεται. <lb n="15,3"></lb></s> <s id="id.000512">Ἔστω βάσις στεγνὴ ἡ ΑΒΓΔ, ἐφ' ἧς ἐπικείσθω <lb n="15,4"></lb>τὸ ζῴδιον, καὶ διὰ τοῦ στόματος τοῦ ζῳδίου σωλὴν <lb n="15,5"></lb>διώσθω ὁ ΕΖ συντετρημένος τῇ βάσει καὶ ἔχων <lb n="15,6"></lb>ὑποκείμενον πλατυσμάτιον τὸ ΗΘ ἐπιφράσσον τὸ Ζ <lb n="15,7"></lb>τρῆμα τοῦ σωλῆνος καὶ ἀνεχόμενον ὑπὸ περονίων <lb n="15,8"></lb>κωλυμάτια ἐχόντων πρὸς τὸ μηκέτι ἐκπίπτειν τὸ <lb n="15,9"></lb>πλατυσμάτιον. </s> <s id="id.000513">ἕτερος δὲ σωλὴν ὁ ΚΛ διὰ τῆς βάσεως <lb n="15,10"></lb>διώσθω, οὗ τὸ μὲν Κ ἄκρον προσκείσθω τῷ <gap></gap>, δι' <lb n="15,11"></lb>οὗ βουλόμεθα τὸ ὕδωρ ἐκπυτίζεσθαι. </s> <s id="id.000514">τὸ δὲ Λ ἀπεχέτω <pb pagenum="244"></pb><lb n="15,12"></lb>τοῦ πυθμένος ὅσον ὕδατι διάρρυσιν. </s> <s id="id.000515">τὸ δὲ Κ ἄκρον <lb n="15,13"></lb>αὐτοῦ ἐχέτω σμηρισμάτιον, δι' οὗ ἀποκλεισθήσεται τὸ <lb n="15,14"></lb>Κ στόμιον αὐτοῦ λεπτὸν ὑπάρχον. </s> <s id="id.000516">ἐγχέοντες οὖν εἰς <lb n="15,15"></lb>τὴν βάσιν ποσὸν ὑγρὸν διά τινος ὀπῆς, ἣν μετὰ τὴν <lb n="15,16"></lb>ἔγχυσιν ἀποστεγνώσομεν, ἐὰν ἀποκλείσαντες τὸ Κ <lb n="15,17"></lb>στόμιον ἐμφυσήσωμεν διὰ τοῦ ΕΖ σωλῆνος ἀέρα, ὁ <lb n="15,18"></lb>ἐμφυσηθεὶς ἀὴρ παρώσει τὸ πλατυσμάτιον καὶ κατενε<lb n="15,19"></lb>χθήσεται εἰς τὴν βάσιν, καὶ τούτου πλεονάκις γινομένου <lb n="15,20"></lb>πιληθήσεται ὁ ἐν τῇ βάσει ἀὴρ καὶ ἀποκλείσει τὸ <lb n="15,21"></lb>πλατυσμάτιον. </s> <s id="id.000517">ἀνοιχθέντος οὖν τοῦ σμηρίσματος, μετ' <lb n="15,22"></lb>ὀλίγον χρόνον ὁ πιληθεὶς ἀὴρ ἐκθλίψει τὸ ἐν τῇ <lb n="15,23"></lb>βάσει ὑγρὸν διὰ τοῦ Κ στομίου μετὰ πολλῆς βίας, <pb pagenum="246"></pb><lb n="15,24"></lb>ἄχρις ἂν ἤτοι πᾶν ἐκπυτισθῇ τὸ ὑγρὸν καὶ ὁ ἀὴρ <lb n="15,25"></lb>εἰς τὴν κατὰ φύσιν τάξιν κατασταθῇ, τουτέστιν ὅταν <lb n="15,26"></lb>πίλησιν ἐν ἑαυτῷ μηκέτι ἔχῃ. <lb n="15,27"></lb></s> </p> <p n="16"> <s id="id.000518">Ἔνια δὲ ἀγγεῖα κατ' ἀρχὰς ἐγχυθέντος τοῦ ὑγροῦ <lb n="16,1"></lb>ῥέει· διαλείμματος δὲ γενομένου οὐκέτι ῥέει ἐγχυνο<lb n="16,2"></lb>μένου τοῦ ὑγροῦ, ἄχρι δι' ἡμίσους γένηται· καὶ τότε <lb n="16,3"></lb>ἄρχεται ῥέειν· διαλείμματος δὲ γενομένου οὐκέτι ῥέει, <lb n="16,4"></lb>ἄχρις ἂν πληρωθῇ. <lb n="16,5"></lb></s> <s id="id.000519">Ἔστω γὰρ ἀγγεῖον τὸ ΑΒ ἔχον ἐν ἑαυτῷ τρεῖς <lb n="16,6"></lb>καμπύλους σίφωνας τοὺς Γ, Δ, Ε κεκρυμμένους ἐν <lb n="16,7"></lb>τῇ γάστρᾳ, ὧν τὰ μὲν ἕτερα σκέλη πρὸς τῷ πυθμένι <lb n="16,8"></lb>ἔστω τοῦ ἀγγείου, τὰ δὲ ἕτερα ἐκτὸς φερέτω εἰς κρου<lb n="16,9"></lb>νοὺς διεσκευασμένα. </s> <s id="id.000520">τοῖς δὲ ἐκτὸς ἄκροις αὐτῶν <lb n="16,10"></lb>προσκείσθω ἀγγεῖα τὰ Ζ, Η, Θ, ὧν οἱ πυθμένες <lb n="16,11"></lb>ἀπεχέτωσαν ἀπὸ τῶν στομίων ὅσον ὕδατι διάρρυσιν. <lb n="16,12"></lb></s> <s id="id.000521">πάντα δὲ περιειλήφθωσαν ἑτέρῳ ἀγγείῳ καθάπερ βάσει <lb n="16,13"></lb>τῇ ΚΛΜΝ κρουνὸν ἐχούσῃ τὸν Ξ. </s> <s id="id.000522">καὶ ὁ μὲν Γ <lb n="16,14"></lb>διαβήτης τὴν κυρτότητα ἐχέτω πρὸς αὐτῷ τῷ πυθμένι, <lb n="16,15"></lb>ὁ δὲ Δ πρὸς τῷ ἡμίσει τοῦ ὕψους τοῦ ΑΒ ἀγγείου, <lb n="16,16"></lb>ὁ δὲ Ε παρ' αὐτὸν τὸν τράχηλον. </s> <s id="id.000523">ἐὰν οὖν ἐγχέωμεν <lb n="16,17"></lb>ὕδωρ εἰς τὸ ΑΒ ἀγγεῖον, κατ' ἀρχὰς μὲν ῥεύσει διὰ <pb pagenum="248"></pb><lb n="16,18"></lb>τοῦ Γ διαβήτου, ἐπείπερ ἡ κυρτότης αὐτοῦ πρὸς τῷ <lb n="16,19"></lb>πυθμένι ἐστίν· ἐὰν δὲ διαλίπωμεν, κενωθήσεται μὲν <lb n="16,20"></lb>τὸ ὑγρὸν τὸ ἐγχυθὲν διὰ τοῦ Ξ κρουνοῦ, τὸ δὲ Ζ <lb n="16,21"></lb>ἀγγεῖον καταλειφθήσεται πλῆρες ὕδατος· τὸ δὲ λοιπὸν <lb n="16,22"></lb>τοῦ Γ σίφωνος μέρος ἔσται ἀέρος πλῆρες. </s> <s id="id.000524">ὅταν οὖν <lb n="16,23"></lb>πάλιν ἐπιχέωμεν τὸ ὑγρόν, οὐ χωρήσει διὰ τοῦ Γ <lb n="16,24"></lb>σίφωνος διὰ τὸ ἀέρα εἶναι ἐν τῷ Γ σίφωνι μεταξὺ <lb n="16,25"></lb>τοῦ τε ἐγχυνομένου καὶ τοῦ ἐν τῷ Ζ ἀγγείῳ ὕδατος. <lb n="16,26"></lb></s> <s id="id.000525">προσαναβήσεται οὖν τὸ ὑγρὸν ἄχρι τῆς τοῦ Δ δια<lb n="16,27"></lb>βήτου καμπῆς, ἥτις πρὸς τῷ ἡμίσει μέρει ἐστί. </s> <s id="id.000526">καὶ <lb n="16,28"></lb>τότε ἄρχεται ῥέειν. </s> <s id="id.000527">διαλείμματος δὲ γενομένου πάλιν <lb n="16,29"></lb>τὸ αὐτὸ συμβήσεται, ὃ καὶ ἐπὶ τοῦ Γ εἴρηται. </s> <s id="id.000528">τὰ δ' <lb n="16,30"></lb>αὐτὰ καὶ ἐπὶ τοῦ Ε διαβήτου νοείσθω. </s> <s id="id.000529">δεήσει δὲ τὸ <lb n="16,31"></lb>ἐγχυνόμενον ὑγρὸν ἠρέμα ἐγχύνειν πρὸς τὸ μὴ ὑπὸ <lb n="16,32"></lb>τῆς βίας ἐκθλιβῆναι τὸν ἐναπολαμβανόμενον ἐν τοῖς <lb n="16,33"></lb>σίφωσιν ἀέρα. <lb n="16,34"></lb><pb pagenum="250"></pb></s> </p> <p n="17"> <s id="id.000530">Σικύας κατασκευὴ τῆς ἄνευ πυρὸς ἐπισπωμένης. <lb n="17,1"></lb></s> <s id="id.000531">Ἔστω σικύα ἡ ΑΒΓ, οἵα εἴθισται γίνεσθαι τῷ <lb n="17,2"></lb>σχήματι, διάφραγμα μέσον ἔχουσα τὸ ΔΕ· διὰ δὲ τοῦ <lb n="17,3"></lb>πυθμένος σμήρισμα διώσθω, οὗ ὁ μὲν ἐκτὸς αὐλίσκος <lb n="17,4"></lb>ἔστω ὁ ΖΗ, ὁ δὲ <lb n="17,5"></lb>ἐντὸς ὁ ΘΚ. </s> <s id="id.000532">οὗτοι <lb n="17,6"></lb>δὲ ἐχέτωσαν κα<lb n="17,7"></lb>τάλληλα τρήματα <lb n="17,8"></lb>τὰ Λ, Μ ἐκτὸς <lb n="17,9"></lb>ὄντα τῆς σικύας· <lb n="17,10"></lb>τὰ δὲ ἐντὸς αὐτῶν <lb n="17,11"></lb>στόμια ἀνεῳγότα <lb n="17,12"></lb>ἔστω· τοῦ δὲ ΘΚ <lb n="17,13"></lb>τὸ ἐκτὸς ἐπιπε<lb n="17,14"></lb>φράχθω καὶ ἐπι<lb n="17,15"></lb>τόνιον ἐχέτω. </s> <s id="id.000533">ἔστω <lb n="17,16"></lb>δὲ καὶ ὑπὸ τὸ ΔΕ <lb n="17,17"></lb>διάφραγμα σμήρι<lb n="17,18"></lb>σμα τὸ ΝΞ ὅμοιον <lb n="17,19"></lb>τῷ πρὸς τῷ πυθ<lb n="17,20"></lb>μένι εἰρημένῳ. </s> <s id="id.000534">τὰ <lb n="17,21"></lb>μέντοι κατάλληλα τρήματα εἰς τὸ ἐντὸς τῆς σικύας <lb n="17,22"></lb>μέρος [2ἔστω]2 καὶ συντετρημένα τῷ ΔΕ διαφράγματι. <lb n="17,23"></lb></s> <s id="id.000535">τούτων δὴ κατασκευασθέντων ἐπιστρεφέσθω τὰ ἐπιτόνια <lb n="17,24"></lb>τῶν σμηρισμάτων, ὥστε τὰ μὲν ἐν τῷ πυθμένι τρήματα <lb n="17,25"></lb>κατάλληλα κεῖσθαι, τὰ δὲ ὑπὸ τὸ διάφραγμα παρηλ<lb n="17,26"></lb>λαχέναι καὶ ἀποκεκλεῖσθαι. </s> <s id="id.000536">τοῦ ΔΓ ἄρα ἀγγείου <pb pagenum="252"></pb><lb n="17,27"></lb>πλήρους ὄντος ἀέρος, δυνατόν ἐστι προσθέντα τῷ <lb n="17,28"></lb>στόματι τὸ ΛΜ τρῆμα ἐκμυζῆσαί τι μέρος τοῦ ἀέρος, <lb n="17,29"></lb>εἶτα πάλιν ἐπιστρέψαντα τὸ ἐπιτόνιον καὶ μὴ ἀφελόντα <lb n="17,30"></lb>τοῦ στόματος τὸ σμήρισμα ἔχειν ἠραιωμένον τὸν ἐν <lb n="17,31"></lb>τῷ ΓΔ ἀγγείῳ ἀέρα. </s> <s id="id.000537">τοῦτο οὖν πλεονάκις ποιοῦμεν, <lb n="17,32"></lb>μέχρις οὗ πολὺν ἐκμυζήσωμεν ἀέρα. </s> <s id="id.000538">ἔπειτα προσθεὶς <lb n="17,33"></lb>τῇ σαρκὶ τὴν σικύαν, ὡς ἔθος ἐστίν, ἀνοίγω τὰ ἐν <lb n="17,34"></lb>τῷ ΝΞ σμηρίσματι τρήματα διὰ τοῦ ἐπιτονίου. </s> <s id="id.000539">ἀναγ<lb n="17,35"></lb>καῖον οὖν ἐστιν εἰς τὸν τοῦ ἐν τῷ ΓΔ ἀέρος τόπον <lb n="17,36"></lb>μεταχωρῆσαί τι μέρος τοῦ ἐν τῷ ΑΔΕ ἀγγείῳ ἀέρος· <lb n="17,37"></lb>εἰς δὲ τὸν κενούμενον ἀντὶ τούτου τόπον ἐπισπάσεται <lb n="17,38"></lb>τήν τε σάρκα καὶ τὴν ὑπὸ τὴν σάρκα ὕλην διὰ τῶν <lb n="17,39"></lb>ἀραιωμάτων τῆς σαρκός, ἃ δὴ ἀθεωρήτους πόρους <lb n="17,40"></lb>καλοῦμεν. <lb n="17,41"></lb></s> </p> <p n="18"> <s id="id.000540">Καὶ ὁ καλούμενος δὲ πυοῦλκος διὰ ταύτην τὴν <lb n="18,1"></lb>αἰτίαν ἐνεργεῖ. <lb n="18,2"></lb></s> <s id="id.000541">Κατασκευάζεται γὰρ αὐλίσκος κοῖλος ἐπιμήκης ὁ <pb pagenum="254"></pb><lb n="18,3"></lb>ΑΒ, ᾧ ἕτερος συνεσμηρισμένος ὁ ΓΔ, οὗ τὸ μὲν Γ <lb n="18,4"></lb>ἄκρον ἐπιπεπωμάσθω λεπιδίῳ· πρὸς δὲ τῷ Δ ἐπιτόνιον· <lb n="18,5"></lb>ἐχέτω τὸ ΕΖ. </s> <s id="id.000542">καὶ τοῦ ΑΒ δὲ αὐλίσκου τὸ πρὸς τῷ <lb n="18,6"></lb>Α στόμιον ἐπιπεφράχθω λεπίδι ἐχούσῃ συντετρημένον <lb n="18,7"></lb>λεπτὸν συρίγγιον τὸ ΗΘ. </s> <s id="id.000543">ὅταν οὖν βουλώμεθα πῦον <lb n="18,8"></lb>ἕλκειν, προσθέντες τῷ τόπῳ, ἐν ᾧ τὸ πῦόν ἐστι, τὸ <lb n="18,9"></lb>ἄκρον τοῦ συριγγίου, τὸ Θ στόμιον, ἐπισπώμεθα τὸν <lb n="18,10"></lb>ΓΔ αὐλίσκον διὰ τοῦ ἐπιτονίου εἰς τὸ ἐκτὸς μέρος. <lb n="18,11"></lb></s> <s id="id.000544">γενομένου δὴ τόπου ἐν τῷ ΑΒ αὐλίσκῳ κενοῦ, ἀνάγκη <lb n="18,12"></lb>εἰς τοῦτον ἄλλο τι ἀντικαταστῆναι. </s> <s id="id.000545">μὴ ὄντος οὖν <lb n="18,13"></lb>ἄλλου τόπου ἢ τοῦ στόματος τοῦ συριγγίου, ἀνάγκη <lb n="18,14"></lb>διὰ τούτου τὸ παρακείμενον ὑγρὸν ἐπισπάσασθαι. <lb n="18,15"></lb></s> <s id="id.000546">πάλιν οὖν ὅταν ἐνέσαι τι βουλώμεθα ὑγρόν, ἐμβα<lb n="18,16"></lb>λόντες αὐτὸ εἰς τὸν ΑΒ αὐλίσκον καὶ καταλαβόμενοι <lb n="18,17"></lb>τὸ ΕΖ ὠθοῦντες τὸν ΓΔ αὐλίσκον θλίβομεν, ἄχρις <lb n="18,18"></lb>ἂν ἡμῖν αὐτοῖς δόξῃ ἡ ἔνεσις γενέσθαι. <lb n="18,19"></lb><pb pagenum="256"></pb></s> </p> <p n="19"> <s id="id.000547">Ἀγγείου τινὸς ὄντος πλήρους οἴνου καὶ κρουνὸν <lb n="19,1"></lb>ἔχοντος ῥέοντα, ὅταν ἐπιχέωμεν ἐπὶ τὸν τράχηλον <lb n="19,2"></lb>αὐτοῦ κύαθον ὕδατος, οὐκέτι ῥυήσεται· ἐὰν δὲ ἕτερον <lb n="19,3"></lb>κύαθον ἐπιχέωμεν, τότε ῥυήσεται καὶ αὐτὸς σὺν τῷ <lb n="19,4"></lb>προτέρῳ κυάθῳ ἤτοι καὶ οἱ δύο κύαθοι τοῦ ὕδατος <lb n="19,5"></lb>ἐξ ἑτέρων δύο κρουνῶν. </s> <s id="id.000548">καὶ μετὰ τὸ ἐκρεῦσαι τὸ <lb n="19,6"></lb>ὕδωρ πάλιν ὁ οἶνος ἐκ τοῦ μέσου κρουνοῦ ῥυήσεται· <lb n="19,7"></lb>καὶ τοῦτο ἔσται, ὁσάκις ἂν ἐπιχεόμενος ἐκρυῇ. <lb n="19,8"></lb></s> <s id="id.000549">Ἔστω τι ἀγγεῖον τὸ ΑΒ ἔχον περὶ τὸν πυθμένα <lb n="19,9"></lb>κρουνὸν τὸν Γ καὶ διαπεφράχθω τὸν τράχηλον τῷ <lb n="19,10"></lb>ΔΕ διαφράγματι· ἐκ δὲ τοῦ διαφράγματος σωλὴν <lb n="19,11"></lb>ἀνατεινέτω ὁ ΖΗ, περὶ ὃν ἕτερος περικείσθω ἀπέχων <lb n="19,12"></lb>ἀπὸ τοῦ διαφράγματος ὅσον ὕδατι διάρρυσιν, καθάπερ <lb n="19,13"></lb>ἐπὶ τῶν πνικτῶν διαβητῶν. </s> <s id="id.000550">διώσθω δὲ καὶ ἕτερος <pb pagenum="258"></pb><lb n="19,14"></lb>διὰ τοῦ διαφράγματος σωλὴν ὁ ΘΚ ὑπερέχων εἰς τὸ <lb n="19,15"></lb>ἄνω τοῦ διαφράγματος ἔλασσον ἢ ὁ πρότερος, ἐσχι<lb n="19,16"></lb>σμένος εἰς δύο κρουνοὺς τοὺς Λ, Μ· καὶ τούτῳ δὲ <lb n="19,17"></lb>περικείσθω ἕτερος σωλὴν ἀπέχων τοῦ διαφράγματος <lb n="19,18"></lb>βραχύ. </s> <s id="id.000551">ἐχέτω δὲ τὸ ἀγγεῖον καὶ ὑπὸ τὸ διάφραγμα <lb n="19,19"></lb>διαύγιον τὸ Ν. </s> <s id="id.000552">ἐὰν οὖν καταλαβόμενοι τοὺς κρουνοὺς <lb n="19,20"></lb>ἐγχέωμεν τὸν οἶνον, χωρήσει εἰς τὸ κύτος διὰ τοῦ <lb n="19,21"></lb>ΖΗ σωλῆνος· ὁ γὰρ ἀὴρ ἐκχωρήσει διὰ τοῦ Ν διαυ<lb n="19,22"></lb>γίου· ἐὰν δὲ καταλαβόμενοι τὸ διαύγιον ἀφῶμεν τοὺς <lb n="19,23"></lb>κρουνούς, ἐκ μὲν τῶν Λ, Μ ῥυήσεται τὸ ἐναποληφθὲν <lb n="19,24"></lb>ἐν τῷ ΘΚ σωλῆνι ὑγρόν, ἐκ δὲ τοῦ Γ τὸ ἐν τῷ <lb n="19,25"></lb>κύτει ὑγρόν. </s> <s id="id.000553">ἐὰν οὖν ῥέοντος τοῦ Γ ἐπεγχέωμεν <lb n="19,26"></lb>κύαθον ὕδατος ἐπὶ τὸ διάφραγμα, οὐκέτι ἕξει ὁ ἀὴρ <lb n="19,27"></lb>παρεισπίπτειν διὰ τοῦ ΖΗ σωλῆνος, ἀλλὰ παύσεται <lb n="19,28"></lb>ὁ Γ κρουνὸς ῥέων. </s> <s id="id.000554">ἐὰν δὲ ἕτερον ἐπεγχέωμεν, ὑπερ<lb n="19,29"></lb>βλύσει τὸν ΘΚ σωλῆνα καὶ δι' αὐτοῦ ἐνεχθήσεται <lb n="19,30"></lb>εἰς τοὺς Λ, Μ κρουνούς, καὶ ὅλον ἐπισπάσεται τὸ <pb pagenum="260"></pb><lb n="19,31"></lb>ὕδωρ. </s> <s id="id.000555">εἶτα λαβὼν ἀναπνοὴν ὁ ΖΗ σωλὴν ποιήσει <lb n="19,32"></lb>ὁμοίως τὸν Γ κρουνὸν ῥέειν. </s> <s id="id.000556">καὶ τοῦτο ἔσται, ὁσάκις <lb n="19,33"></lb>ἂν ἐπεγχέωμεν τοὺς κυάθους. <lb n="19,34"></lb></s> </p> <p n="20"> <s id="id.000557">Ἀγγείου ὄντος πλήρους ἀκράτου καὶ κρουνὸν ἔχον<lb n="20,1"></lb>τος ὁτὲ μὲν τὸν οἶνον ἐκρέειν, ὕδατος δὲ ἐγχυνομένου <lb n="20,2"></lb>καθαρὸν τὸ ὕδωρ ἐκρεῖν, εἶτα πάλιν τὸν ἄκρατον· <lb n="20,3"></lb>κἂν βούληταί τις, τοῦ ὕδατος ἐγχυνομένου κρᾶμα <lb n="20,4"></lb>ῥυήσεται. <lb n="20,5"></lb></s> <s id="id.000558">Ἔστω τι ἀγγεῖον τὸ ΑΒ διάφραγμα ἔχον περὶ <lb n="20,6"></lb>τὸν τράχηλον τὸ ΓΔ, δι' οὗ καθείσθω σωλὴν ὁ ΕΖ <lb n="20,7"></lb>ἔξω τοῦ πυθμένος φέρων, ὃς ἔσται κρουνός. </s> <s id="id.000559">ἐχέτω <lb n="20,8"></lb>δὲ ὁ ΕΖ σωλὴν τρυπημάτιον ἐντὸς τοῦ ἀγγείου παρὰ <lb n="20,9"></lb>τὸν πυθμένα τὸ Η. </s> <s id="id.000560">ἔστω δὲ καὶ διαύγιον ὑπὸ τὸν <lb n="20,10"></lb>τράχηλον τὸ Θ. </s> <s id="id.000561">ἐὰν οὖν καταλαβόμενοι τὸν κρουνὸν <lb n="20,11"></lb>τὸν Ζ ἐγχέωμεν τὸν οἶνον, χωρήσει εἰς τὸ κύτος, <lb n="20,12"></lb>τοῦ ἀέρος ἐκχωροῦντος διὰ τοῦ Θ διαυγίου. </s> <s id="id.000562">ἐὰν δὲ <lb n="20,13"></lb>καταλαβόμενοι τὸ διαύγιον ἀφῶμεν τὸν κρουνόν, οὐ <lb n="20,14"></lb>ῥυήσεται, εἰ μὴ μόνον τὸ ἐναπολειφθὲν ἐν τῷ ΖΕ <lb n="20,15"></lb>σωλῆνι. </s> <s id="id.000563">ἐὰν οὖν ἐπεγχέωμεν ὕδωρ, καθαρὸν ῥυήσεται, <pb pagenum="262"></pb><lb n="20,16"></lb>ἐὰν δὲ ἀνῶμεν τὸ διαύγιον, κρᾶμα, ἐὰν δὲ μηκέτι <lb n="20,17"></lb>ἐγχύνωμεν, καθαρὸς ὁ οἶνος. <lb n="20,18"></lb></s> </p> <p n="21"> <s id="id.000564">Βωμοῦ ἀναπτομένου τὰ μὲν παριδρυμένα ζῴδια <lb n="21,1"></lb>σπένδειν, τὸν δὲ δράκοντα συρίζειν. <lb n="21,2"></lb></s> <s id="id.000565">Ἔστω τις βάσις κοίλη ἡ ΑΒ, ἐφ' ἧς βωμὸς ὁ Γ <lb n="21,3"></lb>ἔχων αὐλὸν μέσον ἐπὶ τὴν βάσιν καθιέμενον ἀπὸ τοῦ <lb n="21,4"></lb>ἐπιπύρου τὸν ΔΕ, ὃς εἰς τρεῖς ἐσχίσθω σωλῆνας τὸν <lb n="21,5"></lb>μὲν ΕΖ ἐπὶ τὸ στόμα τοῦ δράκοντος φέροντα, τὸν δὲ <lb n="21,6"></lb>ΕΗΘ ἐπὶ οἰνοδόχον ἀγγεῖον τὸ ΚΛ, οὗ ὁ πυθμὴν <lb n="21,7"></lb>ἀνωτέρω ἔστω τοῦ Μ ζῳδίου, προσηνωμένον τῷ ἐπι<lb n="21,8"></lb>φράγματι τοῦ ΚΛ ἀγγείου χαρακοειδῶς· ἕτερος δὲ ὁ <pb pagenum="264"></pb><lb n="21,9"></lb>ΕΝΞ καὶ αὐτὸς ὁμοίως ἀνηκέτω εἰς ἕτερον οἰνοδόχον <lb n="21,10"></lb>ἀγγεῖον τὸ ΟΠ καὶ αὐτὸς χαρακοειδῶς· συνεστεγνώ<lb n="21,11"></lb>σθωσαν δὲ καὶ ἀμφότεροι τοῖς πυθμέσι τῶν ἀγγείων. <lb n="21,12"></lb></s> <s id="id.000566">ἔστωσαν δὲ ἐν ἑκατέρῳ τῶν οἰνοδόχων [2ἀγγείων]2 καμ<lb n="21,13"></lb>πύλοι σίφωνες ὅ τε ΡΣ καὶ ὁ ΤΥ, ὧν αἱ μὲν ἀρχαὶ <lb n="21,14"></lb>ἔστωσαν ἐν τῷ οἴνῳ, τὰ δὲ τέλη διήκοντα πνικτῶς <lb n="21,15"></lb>διὰ τοῦ περιφράγματος τῶν οἰνοδοχείων, καθ' ὧν δεῖ <lb n="21,16"></lb>γίνεσθαι τὰς σπενδούσας χεῖρας τῶν ζῳδίων. </s> <s id="id.000567">ὅταν <lb n="21,17"></lb>οὖν μέλλῃς ἐξάπτειν, προεμβάλλων τοῖς σωλῆσιν ὑδά<lb n="21,18"></lb>τιον βραχύ, ὥστε μὴ διαρραγῆναι τοὺς σωλῆνας ὑπὸ <lb n="21,19"></lb>ξηροῦ τοῦ πυρός, ἀπόφραξον ἅπαντα, ὡς μὴ διαπνέειν. <lb n="21,20"></lb></s> <s id="id.000568">τὸ δὲ τοῦ πυρὸς πνεῦμα ἐγκαταμιγὲν τῷ ὕδατι διὰ <lb n="21,21"></lb>τῶν σωλήνων ἀνελεύσεται ἐπὶ τοὺς χάρακας καὶ δι' <lb n="21,22"></lb>αὐτῶν θλῖψαν τὸν οἶνον ἀνοίσει ἐπὶ τοὺς καμπύλους <lb n="21,23"></lb>σίφωνας τόν τε ΡΣ καὶ τὸν ΤΥ, ὥστε διὰ τῶν χειρῶν <lb n="21,24"></lb>τῶν ζῳδίων ῥέοντα σπένδειν, ἐφ' ὅσον ὁ βωμὸς καίεται· <lb n="21,25"></lb>ὁ δὲ ἕτερος σωλὴν τὸ πνεῦμα ἀνενεγκὼν ἐπὶ τὸ στό<lb n="21,26"></lb>μιον τοῦ δράκοντος συρίζειν ποιήσει τὸν δράκοντα. <lb n="21,27"></lb></s> </p> <p n="22"> <s id="id.000569">Λυχνίας κατασκευή, ὥστε λύχνου ἐπικειμένου, ὅταν <lb n="22,1"></lb>ἐλλιπὴς ἐλαίου γένηται, ἐκ τοῦ ὠτὸς αὐτοῦ ἐπιχεῖσθαι <lb n="22,2"></lb>ἔλαιον εἰς τὸν λύχνον, ὅσον ἂν προαιρώμεθα, μηδενὸς <pb pagenum="266"></pb><lb n="22,3"></lb>ἀγγείου ἐπὶ τοῦ λύχνου ἐπικειμένου, ἐξ οὗ τὸ ἔλαιον <lb n="22,4"></lb>ἐπιρρέει. <lb n="22,5"></lb></s> <s id="id.000570">Κατασκευαζέσθω ἡ λυχνία κοίλην ἔχουσα βάσιν <lb n="22,6"></lb>τρίγωνον καθάπερ πυραμίδα γίνεσθαι. </s> <s id="id.000571">καὶ ἔστω βάσις <lb n="22,7"></lb>ἡ ΑΒΓΔ κοίλη διάφραγμα ἔχουσα τὸ ΕΖ. </s> <s id="id.000572">ὁ δὲ τῆς <lb n="22,8"></lb>λυχνίας καυλὸς ἔστω ὁ ΗΘ καὶ αὐτὸς κοῖλος, ὑπὲρ <lb n="22,9"></lb>δὲ τὸν καυλόν, ὡς εἴρηται, κοῖλος κάλαθος ὁ ΚΛ <lb n="22,10"></lb>δυνάμενος πλέον ἔλαιον χωρεῖν. </s> <s id="id.000573">καὶ ἐκ μὲν τοῦ ΕΖ <lb n="22,11"></lb>διαφράγματος ἀνατεινέτω σωλὴν ὁ ΜΝ συντετρημένος <lb n="22,12"></lb>τῷ διαφράγματι καὶ ἀπέχων ἀπὸ τοῦ ΚΛ ἐπιφράγ<lb n="22,13"></lb>ματος τοῦ καλάθου, ἐφ' ὃ δὴ καὶ ἐπίκειται ὁ λύχνος, <lb n="22,14"></lb>ὅσον ἀέρι διέξοδον. </s> <s id="id.000574">ἕτερος δὲ σωληνίσκος ὁ ΞΟ <lb n="22,15"></lb>καθείσθω διὰ τοῦ ΚΛ ἐπιφράγματος ἀπέχων ἀπὸ τοῦ <lb n="22,16"></lb>πυθμένος τοῦ καλάθου ὅσον ὕδατι διάρρυσιν. </s> <s id="id.000575">ὑπερε<lb n="22,17"></lb>χέτω δὲ ὁ ΞΟ σωλὴν τοῦ ΚΛ ἐπιφράγματος βραχύ. <lb n="22,18"></lb></s> <s id="id.000576">τῇ δὲ ὑπεροχῇ συνεσμηρίσθω ἕτερον σωληνάριον τὸ <lb n="22,19"></lb>Π ἐπιπεφραγμένον τὸ ἄνω στόμιον, ὃ διὰ τοῦ πυθ<lb n="22,20"></lb>μένος τοῦ λύχνου %διωθει συνηνώσθω τῷ λύχνῳ μηδὲν <lb n="22,21"></lb>%ἔχων εἰς τὸ ἐκτὸς τοῦ λύχνου. </s> <s id="id.000577">τῷ δὲ Π σωλῆνι <lb n="22,22"></lb>συγκεκολλήσθω ἕτερον σωληνάριον λεπτὸν ἀνατεῖνον <lb n="22,23"></lb>εἰς τὸ ἄκρον τοῦ ὠτὸς καὶ συντετρήσθω αὐτῷ, ὥστε <lb n="22,24"></lb>ἐπιρρεῖν ἐν τῷ κοιλάσματι τοῦ λύχνου, ἔχον τρῆμα <lb n="22,25"></lb>ὥσπερ καὶ οἱ ἄλλοι. </s> <s id="id.000578">ὑπὸ δὲ τὸ ΕΖ διάφραγμα <lb n="22,26"></lb>ὑποκεκολλήσθω κλειδίον φέρον εἰς τὴν ΓΔΕΖ χώραν, <lb n="22,27"></lb>ὥστε, ἐὰν ἀνοιχθῇ, τὸ ἐκ τῆς ΑΒΕΖ χώρας ὕδωρ <lb n="22,28"></lb>μεταβαίνειν εἰς τὴν ΓΔΕΖ. </s> <s id="id.000579">ἔστω δὲ ἐν τῷ ΑΒ <pb pagenum="268"></pb><lb n="22,29"></lb>ἐπιφράγματι τρημάτιον, δι' οὗ πληρώσομεν τὴν ΑΒΕΖ <lb n="22,30"></lb>χώραν ὕδατος, καὶ ὁ ἐν αὐτῇ [2ἀὴρ]2 ἐκχωρήσει διὰ <lb n="22,31"></lb>τοῦ εἰρημένου τρήματος. </s> <s id="id.000580">ἀφαιρεθέντος οὖν τοῦ <lb n="22,32"></lb>λύχνου πληρώσομεν ἐλαίου τὸν κάλαθον διὰ τοῦ ΞΟ <lb n="22,33"></lb>σωληναρίου, τοῦ ἐν τῷ καλάθῳ ἀέρος ἐκχωροῦντος <lb n="22,34"></lb>διὰ τοῦ ΜΝ σωληνίσκου καὶ ἔτι διὰ τῆς ἐν τῷ ΓΔ <lb n="22,35"></lb>πυθμένι κλειδὸς ἀνοιχθείσης, ὅτε δὴ καὶ τὸ ἐν τῇ <lb n="22,36"></lb>ΓΔΕΖ χώρᾳ ὕδωρ ἐκρυήσεται. </s> <s id="id.000581">ἐπιτεθέντος οὖν τοῦ <lb n="22,37"></lb>λύχνου διὰ τοῦ Π σμηρίσματος, ὅταν δέῃ ἔλαιον <lb n="22,38"></lb>ἐπιχέειν, ἀνοίξωμεν τὸ ἐν τῷ ΓΔ πυθμένι κλειδίον. <lb n="22,39"></lb></s> <s id="id.000582">μεταχωροῦντος οὖν τοῦ ἐν τῇ ΑΒΕΖ χώρᾳ ὕδατος <lb n="22,40"></lb>εἰς τὴν ΓΔΕΖ, ὁ ἐν τῇ ΓΔΕΖ ἀὴρ διὰ τοῦ ΜΝ <lb n="22,41"></lb>σωληνίσκου εἰς τὸν κάλαθον ἀφικνούμενος θλίψει τὸ <lb n="22,42"></lb>ἐν αὐτῷ ἔλαιον, ὃ δὴ διὰ τοῦ ΞΟ σωλῆνος καὶ τοῦ <lb n="22,43"></lb>συνεχοῦς αὐτῷ εἰς τὸν λύχνον χωρήσει. </s> <s id="id.000583">ὅταν δὲ <lb n="22,44"></lb>μηκέτι βουλώμεθα ῥέειν, ἀποκλείσεται τὸ κλειδίον καὶ <lb n="22,45"></lb>παύσεται. </s> <s id="id.000584">καὶ πάλιν ὅταν δέῃ, [2τὸ]2 αὐτὸ ποιήσομεν. <lb n="22,46"></lb></s> </p> <p n="23"> <s id="id.000585">Δύναται δὲ καὶ ἄλλως ἐπὶ τῆς αὐτῆς καταγραφῆς <lb n="23,1"></lb>προχειρότερον, ὥστε [2μὴ]2 βάσιν κατασκευάζειν, ἐν ᾗ <lb n="23,2"></lb>τὸ ὕδωρ ἐστί· τὰ μὲν οὖν ἄλλα τὰ αὐτὰ ἔστω χωρὶς <lb n="23,3"></lb>τῆς βάσεως καὶ τοῦ ἐν αὐτῇ ὕδατος. <lb n="23,4"></lb><pb pagenum="270"></pb></s> <s id="id.000586">Ὁ δὲ ΜΝ σωλὴν τὸ Μ <lb n="23,5"></lb>στόμιον ἐχέτω συντετρημένον <lb n="23,6"></lb>τῷ τεύχει τοῦ καυλοῦ, ὥστε εἰς <lb n="23,7"></lb>τὸ ἐκτὸς φαίνεσθαι τοῦ καυλοῦ, <lb n="23,8"></lb>καὶ περιεστεγνώσθω. </s> <s id="id.000587">ἐὰν οὖν <lb n="23,9"></lb>τις προσαγαγὼν τὸ στόμα ἐμ<lb n="23,10"></lb>φυσήσῃ εἰς τὸ ἐκτὸς στόμιον, <lb n="23,11"></lb>χωρήσει τὸ πνεῦμα εἰς τὸν <lb n="23,12"></lb>κάλαθον καὶ θλίψει τὸ ἔλαιον <lb n="23,13"></lb>διὰ τοῦ ΞΟ σωλῆνος. </s> <s id="id.000588">καὶ ἔσται <lb n="23,14"></lb>τὸ αὐτὸ τῷ πρότερον· ὁσάκις <lb n="23,15"></lb>γὰρ ἐὰν ἐμφυσῶμεν, ἐπιχυθή<lb n="23,16"></lb>σεται εἰς τὸν λύχνον ἔλαιον. <lb n="23,17"></lb></s> <s id="id.000589">δεήσει δὲ τὸ τοῦ ὠτὸς ἄκρον <lb n="23,18"></lb>ἐπικεκάμφθαι κατὰ κάθετον τῷ <lb n="23,19"></lb>λύχνου τρήματι, ὥστε μὴ ἔξω <lb n="23,20"></lb>ἀκοντίζειν τὸ ἔλαιον. <lb n="23,21"></lb></s> </p> <p n="24"> <s id="id.000590">[2Λυχνίας κατασκευή, ὥστε <lb n="24,1"></lb>τοῦ ἐλαίου μειουμένου ἐν τῷ <lb n="24,2"></lb>τὸν λύχνον ἅπτειν ὕδατος ἐγ<lb n="24,3"></lb>χυνομένου προσαναπληροῦσθαι <lb n="24,4"></lb>τὴν λυχνίαν ἐλαίου.]2 <lb n="24,5"></lb>Ἔστω γὰρ ὑπὸ τὴν λυχνίαν <lb n="24,6"></lb>ἀγγεῖον στεγνὸν πάντοθεν τὸ <lb n="24,7"></lb>ΑΒ ἤτοι συμφυὲς αὐτῇ ἢ καὶ <lb n="24,8"></lb>ἰδίᾳ κείμενον. </s> <s id="id.000591">ἐκ δὲ τούτου ἀνατεινέτωσαν δύο σωλῆνες <pb pagenum="272"></pb><lb n="24,9"></lb>οἱ ΓΔ, ΕΖ συντετρημένοι τῷ ΑΒ ἀγγείῳ. </s> <s id="id.000592">τὸ δὲ Γ <lb n="24,10"></lb>στόμιον τοῦ σωλῆνος ἀπεχέτω ἀπὸ τοῦ πυθμένος τοῦ <lb n="24,11"></lb>ΑΒ ἀγγείου ὅσον ὕδατι διάρρυσιν· καὶ ὁ μὲν ΓΔ <lb n="24,12"></lb>ἄχρι τῆς ἐπιφανείας ἔστω τοῦ λύχνου φιάλιον ἔχων <lb n="24,13"></lb>πρὸς τῷ Δ ἄκρῳ, δι' οὗ ἔσται ἡ ἔγχυσις τοῦ ὕδατος. <lb n="24,14"></lb></s> <s id="id.000593">ὁ δὲ ΕΖ σωλὴν συντετρήσθω τῷ πυθμένι τοῦ λύχνου. <lb n="24,15"></lb></s> <s id="id.000594">ἐὰν οὖν τις διὰ τοῦ ὀμφαλοῦ τοῦ λύχνου ἐγχύνῃ <lb n="24,16"></lb>ἔλαιον, χωρήσει πρῶτον εἰς τὸ ΑΒ ἀγγεῖον, εἶτα <lb n="24,17"></lb>πληρωθέντος αὐτοῦ πληρωθήσονται καὶ οἱ ΓΔ, ΕΖ <lb n="24,18"></lb>σωλῆνες καὶ ὁ λύχνος. </s> <s id="id.000595">καιόμενος οὖν ὁ λύχνος ἀπό<lb n="24,19"></lb>κενος ἔσται. </s> <s id="id.000596">ὅταν οὖν ἐγχέωμεν διὰ τοῦ πρὸς τῷ <lb n="24,20"></lb>Δ φιαλίου ὕδωρ, χωρήσει εἰς τὸ ΑΒ ἀγγεῖον μιγνύ<lb n="24,21"></lb>μενον τῷ ἐλαίῳ, τὸ δὲ ἐν τῷ ΑΒ ἀγγείῳ ἔλαιον <lb n="24,22"></lb>προσαναβὰν πληρώσει τὸ ἐλλιπὲς τοῦ λύχνου, ἄχρις <pb pagenum="274"></pb><lb n="24,23"></lb>ἂν πρὸς τὴν μύξαν γένηται τὸ ἔλαιον. </s> <s id="id.000597">εἶτα πάλιν ἐὰν <lb n="24,24"></lb>ὑποκαθίσῃ τὸ ἔλαιον, τὸ αὐτὸ ποιήσομεν καὶ τοῦτο, <lb n="24,25"></lb>ἄχρις ἂν τὸ ἔλαιον δαπανηθῇ. </s> <s id="id.000598">ἐὰν δὲ δέῃ ἔτι κατα<lb n="24,26"></lb>λειφθέντος ἐλαίου εἰς <lb n="24,27"></lb>τὸν λύχνον ἀφελεῖν τὸ <lb n="24,28"></lb>ΑΒ ἀγγεῖον, ἔσται σμη<lb n="24,29"></lb>ρισμάτια ἐν τοῖς ΓΔ, <lb n="24,30"></lb>ΕΖ σωλῆσι πρὸς τῷ <lb n="24,31"></lb>ΑΒ ἀγγείῳ καὶ πρὸς <lb n="24,32"></lb>τῷ λύχνῳ κλειδία, ὥστε <lb n="24,33"></lb>ἐπιστραφέντων αὐτῶν <lb n="24,34"></lb>συνέχεσθαι τό τε ἐν τῷ <lb n="24,35"></lb>λύχνῳ ἔλαιον καὶ τὸ ἐν <lb n="24,36"></lb>τοῖς σωλῆσι, καὶ οὕτως <lb n="24,37"></lb>ἀφαιρετὸν ἔσται. </s> <s id="id.000599">καὶ <lb n="24,38"></lb>ὅταν βουλώμεθα, πάλιν <lb n="24,39"></lb>προστεθέντων αὐτῶν <lb n="24,40"></lb>ἀνοίξομεν τὰ κλειδία. </s> <s id="id.000600">βέλτιον δὲ τὸ μὲν ΕΖ σωλη<lb n="24,41"></lb>νάριον εἰς τὸ οὖς τοῦ λύχνου φέρειν, τὸ δὲ ΓΔ ὀπίσω <lb n="24,42"></lb>τοῦ ὠτὸς μικρὸν μετεωρότερον ἔχον προσκείμενόν τι <lb n="24,43"></lb>ἄνω φιαλοειδὲς συντετρημένον αὐτῷ, δι' οὗ ἐγχυθήσε<lb n="24,44"></lb>ται τὸ ὕδωρ, ὥστε ἅμα τῇ ἐγχύσει τοῦ ὕδατος ἐκ τοῦ <lb n="24,45"></lb>ὠτὸς τὸ ἔλαιον ἐπιρρεῖν. <lb n="24,46"></lb><pb pagenum="276"></pb></s> </p> <p n="25"> <s id="id.000601">Ἀγγείου ὄντος στεγνοῦ καὶ κρουνὸν ἔχοντος ἀνεῳ<lb n="25,1"></lb>γότα καὶ θύρσου παρακειμένου, ᾧ ὑπόκειται ποτήριον <lb n="25,2"></lb>πλῆρες ὕδατος, ἐὰν ἀποσπάσῃ τις τὸ ποτήριον, μικρὸν <lb n="25,3"></lb>ῥεύσει ὁ κρουνός, ἐφ' ὅσον ἂν τὸ ποτήριον εἴη <lb n="25,4"></lb>ὑπεσπασμένον. </s> <s id="id.000602">ἀνωσθέντος οὖν τοῦ ποτηρίου, οὐκέτι <lb n="25,5"></lb>ῥεύσει ὁ κρουνός. <lb n="25,6"></lb></s> <s id="id.000603">Ἔστω τὸ εἰρημένον ἀγγεῖον τὸ ΑΒ διαπεφραγμένον <lb n="25,7"></lb>τὸν τράχηλον τῷ ΓΔ διαφράγματι. </s> <s id="id.000604">ἐκ δὲ τοῦ ΓΔ <lb n="25,8"></lb>σωλὴν ἀνατεινέτω συντετρημένος αὐτῷ ὁ ΕΖ. </s> <s id="id.000605">τούτῳ <lb n="25,9"></lb>δὲ περικείσθω ἕτερος ὁ ΚΛ, ὥστε εἶναι πνικτὸν δια<lb n="25,10"></lb>βήτην. </s> <s id="id.000606">τῷ δὲ ΚΛ συντετρήσθω ἕτερος σωλὴν ὁ ΜΝ <lb n="25,11"></lb>ἀνεῳγὸς ἔχων τὸ Μ· τὸ δὲ ἐκτὸς σκέλος τοῦ ΜΝ <lb n="25,12"></lb>σωλῆνος ἔστω ἔν τινι ποτηρίῳ τῷ ΟΞ, εἰς ὃ ἐγκεχύσθω <pb pagenum="278"></pb><lb n="25,13"></lb>ὕδωρ, ὥστε πλῆρες εἶναι. </s> <s id="id.000607">συμπληρωθήσεται δὴ καὶ <lb n="25,14"></lb>τὸ ἐν τῷ ποτηρίῳ σκέλος τοῦ σωλῆνος. </s> <s id="id.000608">ἐγκεχύσθω <lb n="25,15"></lb>δὲ καὶ εἰς τὸν τράχηλον τοῦ ΑΒ ἀγγείου ὕδωρ ὀλίγον, <lb n="25,16"></lb>ὥστε ἐπιφράξαι τὴν ἀναπνοήν. </s> <s id="id.000609">πλήρους ὄντος τοῦ <lb n="25,17"></lb>ΑΒ ἀγγείου, οὐ ῥεύσει ὁ Π κρουνὸς καίτοι ἀνεῳγώς, <lb n="25,18"></lb>ἐπειδήπερ ὁ ἀὴρ οὐκ ἔχει παρείσδυσιν διὰ τὸ ἐγχυθὲν <lb n="25,19"></lb>εἰς τὸν τράχηλον ὕδωρ. </s> <s id="id.000610">ὑποσπασθέντος δὲ τοῦ ποτη<lb n="25,20"></lb>ρίου ἀνάγκη κενωθῆναί τι μέρος τοῦ ἐν τῷ ποτηρίῳ <lb n="25,21"></lb>σκέλους τοῦ σίφωνος· εἰς δὲ τὸν κενούμενον τόπον <lb n="25,22"></lb>ἐπισπασθήσεται ὁ συνεχὴς ἀήρ. </s> <s id="id.000611">οὗτος δὲ τὸ ἐγχυθὲν <lb n="25,23"></lb>εἰς τὸν τράχηλον ὑδάτιον συνεπισπάσεται, ὥστε ὑπερ<lb n="25,24"></lb>βῆναι τὸ Ζ στόμιον. </s> <s id="id.000612">καὶ διὰ τοῦτο τοῦ ἀέρος ἐσχη<lb n="25,25"></lb>κότος παρείσδυσιν, ῥεύσει ὁ Π κρουνός, ἄχρις ἂν τὸ <lb n="25,26"></lb>ΞΟ ποτήριον ἀνωσθὲν τὸ ἐν τῷ τραχήλῳ ὕδωρ ποιήσῃ <lb n="25,27"></lb>ἐπιφράξαι τὴν ἀναπνοήν· πάλιν γὰρ εἰς τὸν ἐξ ἀρχῆς <pb pagenum="280"></pb><lb n="25,28"></lb>τόπον ἀποκατασταθήσεται· καὶ οὐκέτι ῥεύσει ὁ Π <lb n="25,29"></lb>κρουνός. </s> <s id="id.000613">καὶ τοῦτο, ὁσάκις ἂν ὑποσπᾶται καὶ προσ<lb n="25,30"></lb>φέρηται τὸ ποτήριον. </s> <s id="id.000614">δεῖ δὲ αὐτὸ μὴ ὅλον ὑποσπάσαι, <lb n="25,31"></lb>ἵνα μὴ ὅλον γυμνωθῇ τὸ σκέλος τοῦ σίφωνος. </s> <s id="id.000615">ὁ μὲν <lb n="25,32"></lb>οὖν ΜΝ σωλὴν εἰς θύρσον διεσκευάσθω, ὁ δὲ ΡΝ <lb n="25,33"></lb>εἰς τὴν περὶ τοῦτον διάμετρον, ἵνα εὐδιάθετον ᾖ τὸ <lb n="25,34"></lb>ὅραμα. <lb n="25,35"></lb></s> </p> <p n="26"> <s id="id.000616">Λαγύνου κατασκευὴ τῆς φθεγγομένης, ὅταν προί̈η<lb n="26,1"></lb>ται ὑγρόν. <lb n="26,2"></lb></s> <s id="id.000617">Ἔστω ἡ ὑπογεγραμμένη λάγυνος διαπεφραγμένη <lb n="26,3"></lb>τὸν μὲν τράχηλον τῷ ΑΒ, τὸ δὲ στόμα τῷ ΓΔ. </s> <s id="id.000618">διὰ <lb n="26,4"></lb>δὲ ἀμφοτέρων τῶν διαφραγμάτων σωλὴν διώσθω ὁ <lb n="26,5"></lb>ΕΖ συντετρημένος ἀμφοτέροις τοῖς διαφράγμασι. </s> <s id="id.000619">τὸ <lb n="26,6"></lb>δὲ τῆς λαγύνου ὠτίον ἔστω τὸ ΗΘ. </s> <s id="id.000620">ἐκ δὲ τοῦ <lb n="26,7"></lb>ἑτέρου μέρους τοῦ ὠτὸς σωλὴν ἔστω ὁ ΚΛ συντετρη<lb n="26,8"></lb>μένος μὲν τῷ ΑΒ διαφράγματι, ἀπὸ δὲ τοῦ ΓΔ <pb pagenum="282"></pb><lb n="26,9"></lb>ἀπέχων ὅσον ὕδατι διάρρυσιν. </s> <s id="id.000621">πρὸς δὲ τῷ ΓΔ <lb n="26,10"></lb>συρίγγιον ἔστω τὸ Μ δυνάμενον φθέγγεσθαι. </s> <s id="id.000622">πληρω<lb n="26,11"></lb>θήσεται οὖν ἡ λάγυνος διὰ τοῦ ΕΖ σωλῆνος, τοῦ <lb n="26,12"></lb>ἀέρος ἐκχωροῦντος διά τε τοῦ ΚΛ σωλῆνος καὶ διὰ <lb n="26,13"></lb>τοῦ Μ συριγγίου. </s> <s id="id.000623">ὅταν οὖν κατασχόντες τὸ ὠτίον <lb n="26,14"></lb>τῆς λαγύνου ἐπικλίνωμεν, ὥστε προέσθαι, προήσεται <lb n="26,15"></lb>μὲν διὰ τοῦ ΕΖ σωλῆνος εἰς τὸ ἐκτὸς μέρος· διὰ δὲ <lb n="26,16"></lb>τοῦ ΚΛ τὸ ὑγρὸν χωρήσει εἰς τὸν ΒΓ τράχηλον· <lb n="26,17"></lb>ὁ δὲ ἐν αὐτῷ ἀὴρ ἐκκρουόμενος διὰ τοῦ Μ συριγγίου <lb n="26,18"></lb>φθέγξεται. </s> <s id="id.000624">ἔστω δὲ καὶ ἐν τῷ ΑΒ διαφράγματι <lb n="26,19"></lb>τρύπημα ἕτερον, δι' οὗ ὀρθωθείσης τῆς λαγύνου τὸ <lb n="26,20"></lb>ἐν τῷ τραχήλῳ ἀπολειφθὲν ὑγρὸν πάλιν χωρήσει εἰς <lb n="26,21"></lb>τὸ κύτος τῆς λαγύνου τοῦ ἀέρος ἀντιμεταχωροῦντος. <lb n="26,22"></lb></s> </p> <p n="27"> <s id="id.000625">Ἐπί τινος βάσεως ἀγγείου ὄντος οἶνον ἔχοντος καὶ <lb n="27,1"></lb>κρουνὸν ἀνεῳγότα παραφερομένης λείας ποιῆσαι ῥέειν <lb n="27,2"></lb>τὸν κρουνὸν πρὸς μέτρον, οἷον ὁτὲ μὲν ἡμικοτύλιον, <lb n="27,3"></lb>ὁτὲ δὲ κοτύλην καὶ καθόλου ὅσον ἐάν τις προαιρῆται. <lb n="27,4"></lb><pb pagenum="284"></pb></s> <s id="id.000626">Ἔστω τὸ μὲν ἀγγεῖον τὸ ΑΒΓ, ἐν ᾧ ὁ οἶνος <lb n="27,5"></lb>ἐγχυθήσεται, κρουνὸς δὲ ἐν αὐτῷ παρὰ τὸν πυθμένα <lb n="27,6"></lb>ἔστω ὁ Δ· διαπεφράχθω δὲ τὸν τράχηλον τῷ ΕΖ <lb n="27,7"></lb>διαφράγματι. </s> <s id="id.000627">διὰ δὲ τοῦ ΕΖ διαφράγματος διώσθω <lb n="27,8"></lb>σωλὴν ὁ ΗΘ ἀπέχων ἀπὸ τοῦ πυθμένος τοῦ ἀγγείου <lb n="27,9"></lb>ὅσον ὕδατι διάρρυσιν. </s> <s id="id.000628">ἡ δὲ ὑποκειμένη τῷ ἀγγείῳ <lb n="27,10"></lb>βάσις ἔστω ἡ ΚΛΜΝ. </s> <s id="id.000629">ἕτερος δὲ σωλὴν ἔστω ὁ ΞΟ <lb n="27,11"></lb>ἀπέχων μὲν ἀπὸ τοῦ διαφράγματος βραχύ, διήκων δὲ <lb n="27,12"></lb>διὰ τῆς βάσεως. </s> <s id="id.000630">ἔστω δὲ καὶ ἐν τῇ βάσει ὕδωρ <lb n="27,13"></lb>ἐπιφράσσον τὸ στόμιον τοῦ ΞΟ σωλῆνος. </s> <s id="id.000631">ἔστω δὲ <lb n="27,14"></lb>καὶ κανὼν ὁ ΠΡ ἔχων τὸ μὲν ἥμισυ μέρος ἐντὸς τῆς <lb n="27,15"></lb>βάσεως, τὸ δὲ ἥμισυ ἐκτὸς κηλωνευόμενον περὶ τὸ <lb n="27,16"></lb>Σ σημεῖον. </s> <s id="id.000632">ἐκκρεμάσθω δὲ ἐκ τοῦ Π ἄκρου τοῦ <lb n="27,17"></lb>κανόνος κλεψύδρα ἡ Τ τρύπημα ἔχουσα ἐν τῷ πυθ<lb n="27,18"></lb>μένι. </s> <s id="id.000633">τὸ μὲν οὖν ἀγγεῖον πληρώσομεν διὰ τοῦ ΗΘ <lb n="27,19"></lb>σωλῆνος, πρὶν ἐγχυθῆναι τὸ ἐν τῇ βάσει ὕδωρ, τοῦ <lb n="27,20"></lb>ἀέρος ἐκχωροῦντος διὰ τοῦ ΞΟ σωλῆνος, καταλαβόμενοι <lb n="27,21"></lb>τὸν Δ κρουνόν. </s> <s id="id.000634">εἶτα ἐμβαλοῦμεν ἐν τῇ βάσει τὸ <lb n="27,22"></lb>ὕδωρ διά τινος ὀπῆς, ἄχρις οὗ ἐπιφράξωμεν τὸ Ο <pb pagenum="286"></pb><lb n="27,23"></lb>στόμιον, καὶ ἀφῶμεν τὸν Δ κρουνόν. </s> <s id="id.000635">φανερὸν οὖν <lb n="27,24"></lb>ὅτι οὐ ῥεύσει ὁ οἶνος διὰ τὸ μηδαμόθεν ἀέρα δύνασθαι <lb n="27,25"></lb>εἰσκριθῆναι. </s> <s id="id.000636">ὅταν δὲ κατάξωμεν τὸ Ρ ἄκρον τοῦ <lb n="27,26"></lb>κανόνος, ἐπαρθήσεται μέρος τι τῆς κλεψύδρας ἐκ τοῦ <lb n="27,27"></lb>ὕδατος, καὶ γυμνωθείσης τῆς Ο ἀναπνοῆς ῥεύσει ὁ Δ <lb n="27,28"></lb>κρουνός, ἄχρις ἂν τὸ μετεωρισθὲν τῇ κλεψύδρᾳ ὕδωρ <lb n="27,29"></lb>ἀπορρεῦσαν ἐπιφράξῃ τὴν Ο ἀναπνοήν. </s> <s id="id.000637">ἐὰν δὲ πάλιν <lb n="27,30"></lb>πληρωθείσης τῆς κλεψύδρας κατάγωμεν τὸ Ρ ἄκρον <lb n="27,31"></lb>πλέον ἢ τὸ πρότερον, πλείονα χρόνον ἐκρεύσει τὸ ἐν <lb n="27,32"></lb>τῇ κλεψύδρᾳ μετεωρισθὲν ὑγρόν, ὥστε καὶ ἐκ τοῦ <lb n="27,33"></lb>κρουνοῦ πλέον ῥυήσεται. </s> <s id="id.000638">ἐὰν δὲ καὶ ὅλη ἡ κλεψύδρα <lb n="27,34"></lb>μετεωρισθῇ, πολλῷ πλέον ῥυήσεται. </s> <s id="id.000639">ἵνα οὖν μὴ τῇ <lb n="27,35"></lb>χειρὶ κατάγωμεν τὸ Ρ ἄκρον τοῦ κανόνος, ἔσται τις <lb n="27,36"></lb>λεία ἡ Φ παραφερομένη ἐν τῷ ἐκτὸς μέρει τοῦ κανόνος <pb pagenum="288"></pb><lb n="27,37"></lb>τῷ ΡΧ. </s> <s id="id.000640">καὶ ὅταν μὲν ἐγγὺς ᾖ τοῦ Ρ, ὅλην ἀνάξει <lb n="27,38"></lb>τὴν κλεψύδραν· ὅταν δὲ ἀπώτερον, ἔλαττον. </s> <s id="id.000641">πείρᾳ <lb n="27,39"></lb>οὖν εὑρόντες τὰ μέτρα ἃ βουλόμεθα ῥεῖν τὸν Δ <lb n="27,40"></lb>κρουνόν, ἐντομὰς ποιήσωμεν ἐν τῷ ΡΧ κανόνι καὶ <lb n="27,41"></lb>ἐπιγραφὰς τῶν μέτρων, ὥστε ὁπόταν βουλώμεθα μέρος <lb n="27,42"></lb>τι ἐκρεῦσαι, ἐπ' ἐκείνην τὴν ἐντομὴν παράγοντες τὴν <lb n="27,43"></lb>λείαν ἀφῶμεν ῥεῖν. <lb n="27,44"></lb></s> </p> <p n="28"> <s id="id.000642">Ῥυτοῦ κατασκευή, ὥστε ἐν ἀρχῇ μὲν κρᾶμα ῥέειν, <lb n="28,1"></lb>ὅταν δὲ βουλώμεθα ἐπεγχυνομένου ὕδατος, τὸ ὕδωρ <lb n="28,2"></lb>αὐτὸ καθ' αὑτὸ ἐκρέειν, καὶ πάλιν κρᾶμα. <lb n="28,3"></lb></s> <s id="id.000643">Ἔστω ῥυτὸν τὸ ΑΒ διαπεφραγμένον τὸν τράχηλον <lb n="28,4"></lb>τῷ ΓΔ [2διαφράγματι]2, δι' οὗ σωλὴν διώσθω ὁ ΕΖ <lb n="28,5"></lb>φέρων εἰς τὴν ἔκρυσιν, τρημάτιον ἔχων ἐντὸς τοῦ <lb n="28,6"></lb>ῥυτοῦ τὸ Η. </s> <s id="id.000644">διαύγιον δὲ ἔστω ἐν τῷ ῥυτῷ ὑπὸ τὸ <lb n="28,7"></lb>διάφραγμα, τὸ Θ. </s> <s id="id.000645">ἐὰν οὖν καταλαβόμενοι τὴν Ζ <lb n="28,8"></lb>ἔκρυσιν ἐγχέωμεν τὸ κρᾶμα, εἰσελεύσεται εἰς τὸ ῥυτὸν <lb n="28,9"></lb>διὰ τοῦ Η τρηματίου· ὅταν δὲ ἀφῶμεν τὴν ἔκρυσιν, <pb pagenum="290"></pb><lb n="28,10"></lb>ῥεύσει τὸ κρᾶμα, τοῦ ἀέρος εἰσπίπτοντος διὰ τοῦ Θ <lb n="28,11"></lb>διαυγίου. </s> <s id="id.000646">ὅταν δὲ καταλαβόμενοι τὸ Θ διαύγιον ὕδωρ <lb n="28,12"></lb>καθαρὸν ἐπεγχέωμεν, τὸ μὲν κρᾶμα οὐ ῥυήσεται διὰ <lb n="28,13"></lb>τὸ μὴ ἔχειν παρείσδυσιν τὸν ἀέρα, ὕδωρ δὲ καθαρόν. <lb n="28,14"></lb></s> <s id="id.000647">ὅταν δὲ ἀνῶμεν τὸ Θ, ἀμφότερα ῥυήσεται, τό τε ὕδωρ <lb n="28,15"></lb>καὶ τὸ κρᾶμα, ὃ δὴ ἐξ ἀμφοτέρων πάλιν γίνεται <lb n="28,16"></lb>κρᾶμα. <lb n="28,17"></lb></s> </p> <p n="29"> <s id="id.000648">Ἀγγείου ὄντος ἐπὶ βάσεως καὶ κρουνὸν ἔχοντος <lb n="29,1"></lb>ὑπεράνω τοῦ πυθμένος <gap></gap> καὶ ἐγχυνομένου εἰς αὐτὸ <lb n="29,2"></lb>ὕδατος, ὁτὲ μὲν καθαρὸν τὸ ὕδωρ ἐκρέειν, ὁτὲ δὲ <lb n="29,3"></lb>κρᾶμα, ὁτὲ δὲ μόνον ἄκρατον. <lb n="29,4"></lb></s> <s id="id.000649">Ἔστω ἀγγεῖον τὸ ΑΒ ἐπὶ βάσεως κρουνὸν ἔχον <lb n="29,5"></lb>τὸν ΓΔ, οὗ τὸ Γ στόμιον ὑπεράνω ἔστω τοῦ πυθμένος <lb n="29,6"></lb>τοῦ ἀγγείου. </s> <s id="id.000650">διαπεφράχθω δὲ τὸν τράχηλον τῷ ΕΖ <lb n="29,7"></lb>διαφράγματι, δι' οὗ καθείσθω σωλὴν ὁ ΗΘ μικρὸν <lb n="29,8"></lb>ὑπερέχων τοῦ διαφράγματος εἰς τὸ ἄνω μέρος, ἀπέχων <lb n="29,9"></lb>δὲ ἀπὸ τοῦ πυθμένος τοῦ ἀγγείου ὅσον ὕδατι διάρ<lb n="29,10"></lb>ρυσιν. </s> <s id="id.000651">ἔστω δὲ καὶ ἕτερος σωλὴν πρὸς τῇ γάστρᾳ τοῦ <lb n="29,11"></lb>ἀγγείου ὁ ΚΛ ἐκτός, ᾧ ὑποκείσθω ἀγγεῖον ἀκράτου <lb n="29,12"></lb>τὸ ΚΜ. </s> <s id="id.000652">ἔστω δὲ καὶ ἐν τῷ ΕΖ διαφράγματι λεπτὸν <lb n="29,13"></lb>τρύπημα τὸ Ν. </s> <s id="id.000653">τούτων οὖν ὄντων ἐὰν ἐγχέωμεν <pb pagenum="292"></pb><lb n="29,14"></lb>ὕδωρ εἰς τὸ ἀγγεῖον διὰ τοῦ τραχήλου, τὸ μὲν περὶ <lb n="29,15"></lb>τὴν ὑπεροχὴν τοῦ σωλῆνος ἐν τῷ τραχήλῳ μενεῖ, τὸ <lb n="29,16"></lb>δὲ ὑπὲρ τοῦτον εἰς τὸ κύτος ἐνεχθήσεται, ἄχρις ἂν <lb n="29,17"></lb>ἐπὶ τὸ Γ στόμιον τοῦ κρουνοῦ παραγένηται. </s> <s id="id.000654">καὶ οὕτως <lb n="29,18"></lb>καθαρὸν τὸ ὕδωρ ἐκρυήσεται. </s> <s id="id.000655">ἀρξαμένου δὲ ῥέειν <lb n="29,19"></lb>τοῦ κρουνοῦ, καθάπερ ἐπὶ τοῦ διαβήτου συνεπισπάσεται <lb n="29,20"></lb>καὶ τὸν ἐν τῷ ΚΜ ἀγγείῳ ἄκρατον, καὶ ἐκρυήσεται <lb n="29,21"></lb>κρᾶμα. </s> <s id="id.000656">ὅταν δὲ δαπανηθῇ τὸ ὕδωρ, τότε ἄκρατος <lb n="29,22"></lb>μόνος ῥυήσεται, εἰ μὴ παρ' ὅσον τὸ παρὰ τὸ ΕΖ <lb n="29,23"></lb>διάφραγμα ὕδωρ συνεπισπάσεται. </s> <s id="id.000657">ὅταν δὲ διὰ τοῦ <lb n="29,24"></lb>Ν τρυπήματος πᾶν ἐκρεύσῃ τὸ περὶ τὸ διάφραγμα <lb n="29,25"></lb>ὑδάτιον, τότε παρεισελθὼν ὁ ἀὴρ διαλύσει τε τὴν <lb n="29,26"></lb>συνέχειαν, καὶ οὐδὲν ἔτι ῥεύσει. <lb n="29,27"></lb></s> </p> <p n="30"> <s id="id.000658">Ἀγγείου ὄντος πλήρους οἴνου καὶ κρουνὸν ἔχοντος, <lb n="30,1"></lb>ᾧ ὑπόκειται ποτήριον, πρὸς μέτρον τὸ δοθὲν τὸν <lb n="30,2"></lb>οἶνον εἰς τὸ ποτήριον ἐπιρρέειν. <lb n="30,3"></lb></s> <s id="id.000659">Ἔστω τὸ τὸν οἶνον ἔχον ἀγγεῖον τὸ ΑΒ κρουνὸν <lb n="30,4"></lb>ἔχον τὸν ΓΔ· τὸ δὲ πρὸς τῷ Γ στόμιον τοῦ κρουνοῦ <lb n="30,5"></lb>λείαν ἐχέτω τὴν ἄνω ἐπιφάνειαν, ὥστε τυμπανίου <pb pagenum="294"></pb><lb n="30,6"></lb>ἐπιτεθέντος τοῦ ΕΖ στέγειν τὸ ὕδωρ. </s> <s id="id.000660">ἔστω δὲ καὶ <lb n="30,7"></lb>κανόνιον ὀρθὸν πεπηγὸς ἐπὶ τοῦ ὠτὸς τὸ ΗΘ, ἀφ' <lb n="30,8"></lb>οὗ ἕτερον κηλωνευέσθω τὸ ΚΛ. </s> <s id="id.000661">ἔστω δὲ καὶ ἕτερος <lb n="30,9"></lb>κανὼν ὑπὸ τὴν βάσιν τοῦ ἀγγείου ὁ ΜΝ κηλωνευ<lb n="30,10"></lb>όμενος περὶ τὸ Ξ· ἕτεροι δὲ δύο κανόνες οἱ ΚΟ, ΛΠ <lb n="30,11"></lb>προσήφθωσαν ἐν περόναις κινούμενοι, ὥστε ὁπόταν <lb n="30,12"></lb>κατάγῃ τις τὸ Μ ἄκρον τοῦ κανόνος, ἐπαιρομένου τοῦ <lb n="30,13"></lb>ΕΖ τυμπάνου ἀνοίγεσθαι τὸν κρουνὸν καὶ ἐκρεῖν, <lb n="30,14"></lb>ἀφεθέντος δὲ πάλιν κατακλείεσθαι. </s> <s id="id.000662">ἐπικείσθω οὖν <lb n="30,15"></lb>τῷ ΜΝ κανόνι ποτήριον, εἰς ὃ βουλόμεθα τὸ πρὸς <lb n="30,16"></lb>μέτρον ὑγρὸν δέξασθαι, καὶ ἔσται τὸ Ρ ὑποκείμενον <lb n="30,17"></lb>τῷ κρουνῷ. </s> <s id="id.000663">ἔστω δὲ καὶ λεία τις ἡ Σ δυναμένη διὰ <lb n="30,18"></lb>κρίκου παράγεσθαι εἰς τὴν ὑπεροχὴν τοῦ κανόνος τὴν <lb n="30,19"></lb>ΜΟ. </s> <s id="id.000664">ἐὰν οὖν παράξω εἰς τὸ πρὸς τῷ Μ μέρος, <lb n="30,20"></lb>ἀνοιχθήσεται ὁ κρουνὸς καὶ ῥεύσει εἰς τὸ ποτήριον, <lb n="30,21"></lb>καὶ βαρουμένου τοῦ ποτηρίου πάλιν ἀνανεύσει ἡ λεία <lb n="30,22"></lb>καὶ ἀποκλείσει τὸν κρουνόν. </s> <s id="id.000665">ἵνα οὖν πρὸς μέτρον <lb n="30,23"></lb>ἀπορρέῃ, ἐμβεβλήσθω εἰς τὸ ποτήριον, εἰ τύχοι, κοτύλη. <lb n="30,24"></lb></s> <s id="id.000666">τὸ δ' ἐκ τοῦ κρουνοῦ ἐκρέον ἐν ἄλλῳ ἀγγείῳ λαμβα<lb n="30,25"></lb>νέσθω, καὶ παραγέσθω ἡ λεία, ἕως οὗ πρώτως μηκέτι <pb pagenum="296"></pb><lb n="30,26"></lb>ῥέῃ ὁ κρουνός, καὶ σεσημειώσθω ἐπὶ τοῦ κανόνος καὶ <lb n="30,27"></lb>ἐπιγεγράφθω κοτύλη· ὁμοίως δὲ καὶ ἡμικοτύλη καὶ <lb n="30,28"></lb>δύο κοτυλῶν· καὶ οὗ ἐὰν βουλώμεθα μέτρου, τὰ αὐτὰ <lb n="30,29"></lb>ποιήσομεν καὶ ἕξομεν τῶν μέτρων τὰ σημεῖα, καθ' ἃ <lb n="30,30"></lb>δεῖ παραγομένην τὴν λείαν τὰ μέτρα ἀποδιδόναι. <lb n="30,31"></lb></s> <s id="id.000667">δυνατὸν δὲ ἀντὶ τοῦ ΕΖ τυμπανίου περιτίθεσθαι τῷ <lb n="30,32"></lb>κρουνῷ ὡς στεγνόν τι ἀγγεῖον, ὥστε διαστελλομένου <lb n="30,33"></lb>τοῦ ὑγροῦ ὑπὸ τοῦ ἐν αὐτῷ ἀέρος μηκέτι ῥέειν τὸν <lb n="30,34"></lb>κρουνόν. <lb n="30,35"></lb></s> </p> <p n="31"> <s id="id.000668">Ἀγγείου οἶνον ἔχοντος καὶ κρουνὸν καὶ ὑποκειμένου <lb n="31,1"></lb>κρατῆρος, ὅσον ἄν τις τοῦ κρατῆρος ἀφέληται, τοσοῦτον <lb n="31,2"></lb>εἰς αὐτὸν ἐπιρρέειν οἶνον ἐκ τοῦ κρουνοῦ. <lb n="31,3"></lb></s> <s id="id.000669">Ἔστω τὸ τοῦ οἴνου ἀγγεῖον τὸ ΑΒ [1κρουνὸς δὲ <lb n="31,4"></lb>ὁ ΓΔ]1 ἔχον τὸ ΕΖ τυμπάνιον καὶ τοὺς ΗΘ, ΚΛ, <lb n="31,5"></lb>ΚΟ, ΛΜ κανόνας ὡς καὶ ἐπάνω· ὑποκείσθω δὲ τῷ <lb n="31,6"></lb>κρουνῷ ποτήριον τὸ Π· τῷ δὲ ΚΟ κανονίῳ προσφυὲς <lb n="31,7"></lb>ἔστω λεβητάριον τὸ Ρ ἐνὸν ἐν ἀγγείῳ τῷ ΣΤ. </s> <s id="id.000670">σωλὴν <lb n="31,8"></lb>δὲ ὁ ΥΦ συντετρήσθω τοῖς ΣΤ, Π ἀγγείοις. </s> <s id="id.000671">τούτων <lb n="31,9"></lb><gap></gap> ὄντων καὶ κενῶν ὄντων τῶν Π, ΣΤ ἀγγείων τὸ <pb pagenum="298"></pb><lb n="31,10"></lb>Ρ λεβητάριον πρὸς τῷ πυθμένι ἔσται τοῦ ΣΤ ἀγγείου <lb n="31,11"></lb>καὶ ἀνοίξει τὸν ΓΔ κρουνόν. </s> <s id="id.000672">ῥέοντος δὲ αὐτοῦ εἰς <lb n="31,12"></lb>ἀμφότερα τὰ ΤΣ, Π ἀγγεῖα, προσαναβαῖνον τὸ λεβη<lb n="31,13"></lb>τάριον πάλιν κλείσει τὸν κρουνόν, ἕως οὗ πάλιν <lb n="31,14"></lb>ἀφέλωμεν ἀπὸ τοῦ κρατῆρος. </s> <s id="id.000673">καὶ τοῦτο ἔσται, ὁσάκις <lb n="31,15"></lb>ἂν ἀφέλωμεν. <lb n="31,16"></lb></s> </p> <p n="32"> <s id="id.000674">Θησαυροῦ κατασκευὴ τροχὸν ἔχοντος στρεφόμενον <lb n="32,1"></lb>χάλκεον, ὃς καλεῖται ἁγνιστήριον· τοῦτο γὰρ εἰώθασιν <pb pagenum="300"></pb><lb n="32,2"></lb>οἱ εἰς τὰ ἱερὰ εἰσιόντες στρέφειν. </s> <s id="id.000675">ἔστω οὖν τοῦ <lb n="32,3"></lb>τροχοῦ στραφέντος μελαγκορύφου γίνεσθαι φωνήν, <lb n="32,4"></lb>καὶ αὐτὸ δὲ τὸ ὀρνύφιον ἐφεστὼς στρέφεσθαι, σταθέν<lb n="32,5"></lb>τος δὲ τοῦ τροχοῦ μηκέτι φθέγγεσθαι τὸν μελαγκόρυφον <lb n="32,6"></lb>μήτε στρέφεσθαι. <lb n="32,7"></lb></s> <s id="id.000676">Ἔστω θησαυρὸς μὲν ὁ ΑΒΓΔ, ἄξων δὲ διακείμενος <lb n="32,8"></lb>ἐν αὐτῷ ὁ ΕΖ εὐλύτως δυνάμενος στρέφεσθαι, ᾧ <lb n="32,9"></lb>συμφυὴς ἔστω ὁ ΘΚ τροχός, ὃν δεῖ στρέφειν. </s> <s id="id.000677">ἔστωσαν <lb n="32,10"></lb>δὲ τῷ ἄξονι δύο τροχοὶ συμφυεῖς ἐντὸς οἱ Λ, Μ, ὧν <lb n="32,11"></lb>ὁ μὲν Λ ἐξελίκτραν ἐχέτω, ὁ δὲ Μ ἀκτινωτὸς ἔστω. <lb n="32,12"></lb></s> <s id="id.000678">περὶ δὲ τὴν ἐξελίκτραν σπάρτος ἐπειλήσθω, ἧς ἀπὸ <lb n="32,13"></lb>τοῦ ἄκρου ἐκκρεμάσθω πνιγεὺς ὁ Ν σωλῆνα ἔχων τὸν <lb n="32,14"></lb>ΞΟ καὶ συρίγγιον ἔχων ἐπ' ἄκρου μελαγκορυφίζον. <lb n="32,15"></lb></s> <s id="id.000679">ὑποκείσθω δὲ τῷ πνιγεῖ ὕδατος ἀγγεῖον τὸ ΠΡ. <lb n="32,16"></lb></s> <s id="id.000680">καθείσθω δὲ καὶ ἀξονίσκος ὁ ΣΤ ἀπὸ τῆς κορυφῆς <lb n="32,17"></lb>τοῦ θησαυροῦ εὐλύτως δυνάμενος στρέφεσθαι, πρὸς <lb n="32,18"></lb>μὲν τῷ Σ ἔχων τὸν μελαγκόρυφον, πρὸς δὲ τῷ Τ <lb n="32,19"></lb>ἀκτινωτὸν τύμπανον ἐμπεπλεγμένον τῷ Μ τυμπάνῳ. <lb n="32,20"></lb></s> <s id="id.000681">συμβήσεται οὖν ἐπιστραφέντος τοῦ ΘΚ τροχοῦ ἐπει<lb n="32,21"></lb>λεῖσθαι τὴν σπάρτον περὶ τὴν ἐξελίκτραν καὶ ἀνέχειν <lb n="32,22"></lb>τὸν πνιγέα, ἀφεθέντος δὲ τοῦ τροχοῦ τῷ βάρει κατα<pb pagenum="302"></pb><lb n="32,23"></lb>φερόμενον τὸν πνιγέα εἰς τὸ ὕδωρ τὸν ἦχον ἀποτελεῖν <lb n="32,24"></lb>τοῦ ἀέρος ἐκθλιβομένου, ἅμα δὲ καὶ τὸν μελαγκόρυφον <lb n="32,25"></lb>ἐπιστρέφεσθαι διὰ τῆς τῶν τυμπάνων ἐπιστροφῆς. <lb n="32,26"></lb></s> </p> <p n="33"> <s id="id.000682">Ἔνιοι ἐν τοῖς ἀγγείοις ἐμβαλλόμενοι σίφωνες ῥέουσιν, <lb n="33,1"></lb>ἕως ἂν ἢ κενωθῇ τὰ ἀγγεῖα ἢ ἡ τοῦ ὕδατος ἐπιφάνεια <lb n="33,2"></lb>γένηται κατὰ <lb n="33,3"></lb>τὸ ἐκτὸς στό<lb n="33,4"></lb>μιον τοῦ σίφω<lb n="33,5"></lb>νος· δέον ἔστω <lb n="33,6"></lb>ῥέοντος αὐτοῦ, <lb n="33,7"></lb>ὅτε βουλόμεθα, <lb n="33,8"></lb>μηκέτι ῥέειν. <lb n="33,9"></lb></s> <s id="id.000683">Ἔστω τι ἀγ<lb n="33,10"></lb>γεῖον τὸ ΑΒ, <lb n="33,11"></lb>ἐν ᾧ σίφων <lb n="33,12"></lb>[2ἔστω]2 ὁ ΓΔΕ <lb n="33,13"></lb>ἔχων τὸ μὲν ἐν<lb n="33,14"></lb>τὸς σκέλος ἀνα<lb n="33,15"></lb>κεκαμμένον ὡς <lb n="33,16"></lb>τὸ ΓΖΗ. </s> <s id="id.000684">ἔστω <lb n="33,17"></lb>δὲ καὶ κανόνιον <lb n="33,18"></lb>ὀρθὸν πεπηγὸς <lb n="33,19"></lb>τὸ ΘΚ, πρὸς <lb n="33,20"></lb>ὃ ἕτερον κη<lb n="33,21"></lb>λωνευέσθω τὸ <lb n="33,22"></lb>ΛΜ, ἐξ οὗ ἕτε<lb n="33,23"></lb>ρον κανόνιον ἐν περόνῃ κινούμενον τὸ ΜΝ ἔχον πρὸς <lb n="33,24"></lb>τῷ Ν ἄκρῳ ἀγγεῖον δυνάμενον περιβαίνειν τὴν ΖΗ <lb n="33,25"></lb>τοῦ σίφωνος ἀνακαμπήν· ἐχέτω δὲ τὸ ΛΜ κανόνιον <pb pagenum="304"></pb><lb n="33,26"></lb>βάρος ἐκκρεμάμενον πρὸς τῷ Λ, ὥστε τὸ περιβαῖνον <lb n="33,27"></lb>ἀγγεῖον τὴν τοῦ σίφωνος ἀνακαμπὴν ὑπεράνω εἶναι <lb n="33,28"></lb>τοῦ στομίου καὶ ῥεῖν τὸν σίφωνα. </s> <s id="id.000685">ὅταν δὲ βουλώ<lb n="33,29"></lb>μεθα μηκέτι ῥέειν, ἀφελοῦμεν τὸ πρὸς τῷ Λ βάρος, <lb n="33,30"></lb>ὥστε καταχθῆναι τὸ πρὸς τῷ Ν ἀγγεῖον καὶ περιβῆναι <lb n="33,31"></lb>τὴν ΖΗ ἀνακαμπήν. </s> <s id="id.000686">καὶ οὕτως οὐκέτι ῥεύσει ὁ δια<lb n="33,32"></lb>βήτης. </s> <s id="id.000687">ὅταν δὲ βουλώμεθα ῥέειν, πάλιν ἐκκρεμάσομεν <lb n="33,33"></lb>τὸ βάρος. <lb n="33,34"></lb></s> </p> <p n="34"> <s id="id.000688">Μιλιαρίου κατασκευή, ὥστε ἐπικειμένου ζῳδαρίου <lb n="34,1"></lb>διεσκευασμένου εἰς φυσῶντος τρόπον αὐτό τε τὸ ζῴδιον <lb n="34,2"></lb>φυσᾶν εἰς τοὺς ἄνθρακας καὶ οὕτως καίεσθαι τὸ <lb n="34,3"></lb>μιλιάριον ἔτι τε κρουνοῦ προσκειμένου παρὰ τὸν <lb n="34,4"></lb>τράχηλον τοῦ μιλιαρίου καὶ ἀνεῳγότος μὴ ῥέειν, εἰ <lb n="34,5"></lb>μὴ πρότερον ψυχρὸν [ἂν] ἐγχέομεν εἴς τι κρατήριον, <lb n="34,6"></lb>τὸ δὲ ψυχρὸν μὴ πρότερον συναναμίγνυσθαι τῷ θερμῷ, <lb n="34,7"></lb>εἰ μὴ εἰς τὸν πυθμένα χωρήσει, ἐκ δὲ τοῦ κρουνοῦ <lb n="34,8"></lb>τὸ θερμότατον ἐκρέειν. <lb n="34,9"></lb></s> <s id="id.000689">Ἔστω τὸ μὲν σχῆμα τοῦ μιλιαρίου οἷον ἄν τις <lb n="34,10"></lb>προαιρῆται. </s> <s id="id.000690">ἐν δὲ τῇ χώρᾳ τῇ τὸ ὕδωρ δεχομένῃ <pb pagenum="306"></pb><lb n="34,11"></lb>ἀπολαμβάνεταί τις χώρα μικρὰ δυσὶ διαφράγμασιν <lb n="34,12"></lb>ὀρθίοις, ὡς πάντοθεν εἶναι στεγνήν, ἐξ ἧς παρὰ τὸν <lb n="34,13"></lb>πυθμένα σωλὴν συντέτρηται εἷς ὢν τῶν ὑποκειμένων <lb n="34,14"></lb>τοῖς ἄνθραξιν, οὗ τὸ ἕτερον μέρος ἀποπεφράχθω, <lb n="34,15"></lb>ὥστε μὴ εἰσιέναι εἰς αὐτὸν ὕδωρ ἐκ τοῦ μιλιαρίου. <lb n="34,16"></lb></s> <s id="id.000691">οἱ δὲ λοιποὶ σωλῆνες εἰς τὴν λοιπὴν χώραν, ἐν ᾗ τὸ <lb n="34,17"></lb>ὕδωρ, φέρουσιν, ὥστε καιομένους τοὺς ἄνθρακας διὰ <lb n="34,18"></lb>μὲν τοῦ ἑνὸς σωλῆνος τοῦ εἰς τὴν μικρὰν ἔχοντος <lb n="34,19"></lb>φέρειν χώραν ἀτμὸν ἐγγεν[2ν]2ᾶν. </s> <s id="id.000692">οὗτος δὲ διά τινος <lb n="34,20"></lb>σωλῆνος συντετρημένου τῷ ἐπιφράγματι τοῦ μιλιαρίου <lb n="34,21"></lb>φέρεται διὰ τοῦ στόματος τοῦ ζῳδαρίου εἰς τοὺς <lb n="34,22"></lb>ἄνθρακας· ἐπινένευκε γὰρ τὸ ζῴδιον, ὥστε κάτω <lb n="34,23"></lb>φυσᾶν. </s> <s id="id.000693">ἀεὶ οὖν ἀτμοῦ ἐγγεν[2ν]2ωμένου ἀεὶ καὶ φυσᾷ. <lb n="34,24"></lb></s> <s id="id.000694">ἐὰν δὲ καὶ μικρὸν <lb n="34,25"></lb>ὑδάτιον ἐγχέωμεν εἰς τὴν μικρὰν χώραν, πλέονα τὸν <lb n="34,26"></lb>ἀτμὸν γεννήσομεν, ὥστε ὑπὲρ μέτρον φυσῶν τὸ ζῴδιον <lb n="34,27"></lb>πλεῖον ἐκθερμαίνειν τὸ μιλιάριον, καθάπερ ὁρῶμεν <lb n="34,28"></lb>ἐπὶ τῶν καιομένων λεβήτων ἀναφερόμενον καπνὸν ἐκ <lb n="34,29"></lb>τοῦ ὕδατος. </s> <s id="id.000695">ἔσται δὲ ἀφαιρετὸν τὸ ζῳδάριον διά <lb n="34,30"></lb>τινος σμηρισματίου πρὸς τὸ ἐγχύνεσθαι τὸ μικρὸν <lb n="34,31"></lb>ὑγρόν. </s> <s id="id.000696">ἅμα δὲ καὶ ἐὰν μὴ βουλώμεθα τὸ ζῴδιον <lb n="34,32"></lb>φυσᾶν εἰς τοὺς ἄνθρακας, ἀποστρέφομεν αὐτὸ διὰ <lb n="34,33"></lb>τοῦ σμηρίσματος εἰς τὸ ἔξω μέρος. </s> <s id="id.000697">ἔστω δὲ καὶ <lb n="34,34"></lb>κρατηρίδιον ἐπικείμενον τῷ ἐπιφράγματι, ἐξ οὗ σωλὴν <lb n="34,35"></lb>φερέτω παρὰ τὸν πυθμένα τοῦ μιλιαρίου, ὥστε δι' <pb pagenum="308"></pb><lb n="34,36"></lb>αὐτοῦ τὸ ὕδωρ τὸ ψυχρὸν ἐγχυνόμενον εἰς τὸν πυθ<lb n="34,37"></lb>μένα χωρεῖν. </s> <s id="id.000698">ἵνα δὲ καὶ δύνηται τὸ μιλιάριον πληροῦ<lb n="34,38"></lb>σθαι ἐγχυνομένου τοῦ ὕδατος καὶ ἅμα τὸ ὑπερκαχλάζον <pb pagenum="310"></pb><lb n="34,39"></lb>ὕδωρ μὴ ἔξω ἐκχύνηται, ἕτερον σωληνίδιον συντετρήσθω <lb n="34,40"></lb>εἰς τὸ κρατηρίδιον διὰ τῆς ἐντὸς αὐτοῦ ἐπιφανείας, <lb n="34,41"></lb>ὥστε μὴ τραχύτητα τῇ ὄψει παρέχειν. </s> <s id="id.000699">τὴν δὲ τοῦ <lb n="34,42"></lb>μιλιαρίου κατασκευὴν ὑπ' ὄψιν ἐκθησόμεθα. <lb n="34,43"></lb></s> <s id="id.000700">Ἐκκείσθω δὴ κύλινδρος κοῖλος, οὗ ἕδρα μὲν ἡ <lb n="34,44"></lb>ΑΒ, ἐφέδρα δὲ ἡ ΓΔ· ἄλλος δέ τις κύλινδρος κοῖλος <lb n="34,45"></lb>κατεσκευάσθω περὶ τὸν αὐτὸν ἄξονα τῷ προειρημένῳ, <lb n="34,46"></lb>οὗ ἡ μὲν ἕδρα ἔστω ἡ ΕΖ, ἐφέδρα δὲ ἡ ΗΘ. </s> <s id="id.000701">ταῖς <lb n="34,47"></lb>δὲ ἴτυσι τῶν ἔξω τῶν κοίλων ἐπικείσθω ἐπιφράγματα <lb n="34,48"></lb>δυνάμενα συνέχειν τοὺς κυλίνδρους καὶ ἐπιφράσσοντα <lb n="34,49"></lb>τὰς ἴτυας. </s> <s id="id.000702">ἐχέτω δὲ ὁ ΕΖΗΘ κύλινδρος σωλῆνας <lb n="34,50"></lb>τοὺς ΟΚ, ΛΞ, ΜΝ, ὧν ὁ μὲν ΛΞ συντετρήσθω ἐκ <pb pagenum="312"></pb><lb n="34,51"></lb>τοῦ ἑνὸς μέρους τοῦ πρὸς τῷ Ξ· οἱ δὲ λοιποὶ ἐξ <lb n="34,52"></lb>ἑκατέρου μέρους διατετρήσθωσαν, καὶ ἔστωσαν αὗται <lb n="34,53"></lb>αἱ ἀρχαὶ ἐξ ἑκατέρου εἰς τὴν χώραν τὴν ἐν μέσῳ τῶν <lb n="34,54"></lb>κυλίνδρων. </s> <s id="id.000703">καθείσθω δὲ εἰς τὴν χώραν τὴν ἀπολαμβανο<lb n="34,55"></lb>μένην ὑπὸ τῶν δύο κυλίνδρων δύο διαφράγματα τὰ <lb n="34,56"></lb>ΕΗ, ΖΘ ἀπολαμβάνοντα χώραν τὴν ΗΘΕΖ, εἰς ἣν <lb n="34,57"></lb>τετρήσθω τὸ εἰρημένον σωληνάριον τὸ ἐκ τοῦ ἑνὸς <lb n="34,58"></lb>μέρους τετρημένον. </s> <s id="id.000704">ἐπικείσθω δὲ τῷ ἐπιφράγματι, <lb n="34,59"></lb>τουτέστι τῷ ΗΘ, σωληνάριον ἔχον τὸ ζῳδάριον ἐπι<lb n="34,60"></lb>κείμενον καὶ συντετρημένον· καὶ διόλου δὲ τὸ ζῳδα<lb n="34,61"></lb>ρίδιον τετρήσθω καὶ ἐπικεκάμφθω πρὸς τὸ ἐννεύειν <lb n="34,62"></lb>εἰς τὴν τῶν ἀνθράκων χώραν. </s> <s id="id.000705">πρὸς δὲ τὸ ὁπόταν <lb n="34,63"></lb>βουλώμεθα μὴ φυσᾶν τὸ ζῳδάριον ὁ σωλήν, ἐφ' ᾧ <lb n="34,64"></lb>κάθηται, συνεσμηρισμένος ἔστῳ ἑτέρῳ, ὡς ὅταν ἐπι<lb n="34,65"></lb>στρέψωμεν αὐτὸν εἰς τὸ ἔξω μέρος, οὐκέτι φυσήσῃ <pb pagenum="314"></pb><lb n="34,66"></lb>εἰς τὸν τῶν ἀνθράκων τόπον, ἀλλ' ἐκτός. </s> <s id="id.000706">πρὸς δὲ <lb n="34,67"></lb>τὸ βάλλειν ἡμᾶς ὕδωρ εἰς τὴν ΗΖΕΘ χώραν ἔσται <lb n="34,68"></lb>ἡμῖν χρήσιμον αὐτὸ τὸ σωληνάριον τὸ συνεσμηρισμένον· <lb n="34,69"></lb>ἀρθέντος γὰρ τοῦ ζῳδίου ἐκ τοῦ σωλῆνος, ᾧ ἐπίκειται, <lb n="34,70"></lb>ἐγχέομεν δι' αὐτοῦ τὸ ὑδάτιον· πλείων γὰρ ἀτμὸς <lb n="34,71"></lb>διαδοθήσεται εἰς τὸ ζῳδάριον. </s> <s id="id.000707">ἐπικείσθω δὴ τῷ ΘΓ <lb n="34,72"></lb>ἐπιφράγματι κρατὴρ ὁ ΡΣ συντετρημένος αὐτῷ καὶ <lb n="34,73"></lb>ἔχων πρὸς τὸ ἄκρον σωλῆνα διήκοντα μέχρι τοῦ πυθ<lb n="34,74"></lb>μένος τοῦ μιλιαρίου, ἀπέχοντα δὲ ἀπὸ τοῦ πυθμένος <lb n="34,75"></lb>ὅσον ὕδατι διάρρυσιν. </s> <s id="id.000708">ὅταν οὖν βουλώμεθα προέσθαι <lb n="34,76"></lb>θερμόν, ἐμβαλοῦμεν διὰ τοῦ ΡΣ ψυχρόν. </s> <s id="id.000709">τὸ δὲ <lb n="34,77"></lb>διελεύσεται διὰ τοῦ σωλῆνος τοῦ συντετρημένου εἰς <lb n="34,78"></lb>τὴν χώραν τοῦ θερμοῦ· καὶ ὑπεραναβὰν τὸ θερμὸν <lb n="34,79"></lb>ἐκρεύσει διὰ τοῦ περὶ τὸν τράχηλον κρουνοῦ· οὐδέπω <lb n="34,80"></lb>γὰρ τὸ εἰσκριθὲν ψυχρὸν διὰ τοῦ σωλῆνος συνεμίγη <lb n="34,81"></lb>τῷ ὑποκειμένῳ θερμῷ. </s> <s id="id.000710">καὶ τοῦτο ἀεὶ ποιοῦντες ἕξομεν <lb n="34,82"></lb>θερμὸν ἀντὶ [2τοῦ]2 ἐπιβαλλομένου ψυχροῦ. </s> <s id="id.000711">ὑπὲρ δὲ <pb pagenum="316"></pb><lb n="34,83"></lb>τοῦ γινώσκειν ἡμᾶς, πότε τὸ μιλιάριον ἀναβράσει, <lb n="34,84"></lb>κατασκευάζεται τὸ χασμάτιον τετρημένον διόλου· καὶ <lb n="34,85"></lb>τρηθέντος τοῦ ἐπιφράγματος ἐπικαθήσθω τῷ τραχήλῳ <lb n="34,86"></lb>ἔχον σωλῆνα μικρόν. </s> <s id="id.000712">οὗτος δὲ ἀποβλέψει εἰς τὸν ΡΣ <lb n="34,87"></lb>κρατῆρα, ὅπως παραγινομένου τοῦ θερμοῦ ἡ προφορὰ <lb n="34,88"></lb>εἰς τὸν κρατῆρα γίνηται. </s> <s id="id.000713">ἡ μὲν οὖν κατασκευὴ τοιαύτη. <lb n="34,89"></lb></s> <s id="id.000714">ἐὰν μέντοι προαιρώμεθα μὴ διόλου τὴν ΖΗΕΘ χώραν <lb n="34,90"></lb>ἀπολαμβάνειν, ἀλλὰ μέχρι μέρους, κατασκευάζεται τὰ <lb n="34,91"></lb>διαφράγματα μέχρι τοῦ ἡμίσους. </s> <s id="id.000715">καὶ ἐπιτίθεται αὐτοῖς <lb n="34,92"></lb>ἕτερον διάφραγμα καὶ σωλῆνα λαμβάνει διήκοντα μέχρι <lb n="34,93"></lb>τοῦ ζῳδίου, καὶ ἐπικαιομένου ἔσται ἡ προφορὰ τῆς <lb n="34,94"></lb>ἀτμίδος ἐκ τῆς μικρᾶς χώρας. </s> <s id="id.000716">ὁμοίως δὲ καὶ εἰς αὐτὴν <lb n="34,95"></lb>τὸ ὕδωρ ἐμβληθήσεται. <lb n="34,96"></lb></s> </p> <p n="35"> <s id="id.000717">Χρῶνται δὲ καὶ ἑτέρᾳ κατασκευῇ τοιαύτῃ πρὸς τὸ <lb n="35,1"></lb>σαλπίζειν καὶ κοσσύφου φωνὴν ἀποτελεῖν. <lb n="35,2"></lb></s> <s id="id.000718">Πάλιν γὰρ τὸ αὐτὸ μιλιάριον κατασκευάζεται ἔχον <lb n="35,3"></lb>πάντας τοὺς σωλῆνας τοὺς ἐν τῇ ἕδρᾳ συντετρημένους <lb n="35,4"></lb>εἰς τὰ παρ' ἑκάτερα μέρη. </s> <s id="id.000719">περὶ δὲ τὴν ἐφέδραν ἔστω <pb pagenum="318"></pb><lb n="35,5"></lb>τις σωλὴν ὁ ΦΕ θῆλυς ἔχων ἕτερον συνεσμηρισμένον <lb n="35,6"></lb>τὸν ΚΛ διηνοιγμένον εἰς τὴν χώραν τοῦ θερμοῦ καὶ <lb n="35,7"></lb>κινούμενον περὶ τὴν περόνην τὴν ΚΛ. </s> <s id="id.000720">τοῦτο δὲ <lb n="35,8"></lb>τιτρᾶται εἰς τρία τρήματα κατὰ τὰ Μ, Ν, Ξ· ὁμοίως <lb n="35,9"></lb>καὶ ὁ ΦΕ σωλὴν τιτρᾶται εἰς τρία τρήματα κατάλληλα <lb n="35,10"></lb>τοῖς Μ, Ν, Ξ, καὶ πρὸς μὲν τῷ Ξ τιτρᾶται βάσις τις <lb n="35,11"></lb>ἔχουσα ἐν αὑτῇ σωλῆνα συνεστεγνωμένον τῷ Ξ, ἐφ' <lb n="35,12"></lb>ὃν κεῖται τὸ ζῳδάριον ὁμοίως, ὥσπερ καὶ ἐπάνω <lb n="35,13"></lb>εἰρήκαμεν. </s> <s id="id.000721">ἐκ δὲ τῶν Μ, Ν σωλῆνές εἰσι διήκοντες <lb n="35,14"></lb>οἱ ΜΟ, ΝΠ ἔχοντες τὰ μὲν ἄνω ἄκρα κεκαμμένα· <lb n="35,15"></lb>τούτοις δὲ συντετρήσθω καὶ συνεστεγνώσθω ἡ ἐφέδρα <lb n="35,16"></lb>τοῦ μιλιαρίου. </s> <s id="id.000722">διὰ δὲ τῶν τρημάτων διήκουσιν ἕτεροι <lb n="35,17"></lb>σωλῆνες συνεσμηρισμένοι τοῖς Π, Ο, οἷς ἐπικάθηται <lb n="35,18"></lb>τάδε· ἐφ' ἑνὶ μὲν στρουθίον ἔχον τὰ ἐντὸς κενὰ πρὸς <pb pagenum="320"></pb><lb n="35,19"></lb>τὸ δύνασθαι δέξασθαι ὕδωρ. </s> <s id="id.000723">αὐτὸς οὖν ὁ σωλήν, ᾧ <lb n="35,20"></lb>ἐπικάθηται, κέκαμπται ἔχων φθογγάριον τῶν γινο<lb n="35,21"></lb>μένων πρὸς τὸ τὰς φωνὰς παρίεσθαι· καὶ ἡ ἀνακαμπὴ <lb n="35,22"></lb>διήκουσα μέχρι τοῦ ὕδατος ἐν τῷ στρουθίῳ. </s> <s id="id.000724">ὅταν <lb n="35,23"></lb>μὲν οὖν ἡ φωνὴ τοῦ φθογγαρίου προί̈ῃ εἰς τὸ ὕδωρ, <lb n="35,24"></lb>τότε ἦχον κοσσύφου ποιεῖ. </s> <s id="id.000725">πάλιν δὲ ὁ ἕτερος σωλὴν <lb n="35,25"></lb>ἔχει καὶ αὐτὸς ἕτερον σωλῆνα συνεσμηρισμένον, ᾧ <lb n="35,26"></lb>ἐπικάθηται ζῳδάριον ἐσχηματισμένον εἰς Τρίτωνα καὶ <lb n="35,27"></lb>ἔχον ἐν τῷ στόματι σάλπιγγα. </s> <s id="id.000726">πάλιν δὲ αὐτὸς οὗτος <lb n="35,28"></lb>ὁ σωλήν, ᾧ ἐπικάθηται, ἕξει τὴν γλωσσίδα καὶ τὸν <lb n="35,29"></lb>κώδωνα, ὡς εἰώθει γίγνεσθαι. </s> <s id="id.000727">προϊοῦσα οὖν ἡ ἀτμὶς <lb n="35,30"></lb>καὶ συναντῶσα τῇ τε γλωσσίδι καὶ τῷ κώδωνι τὴν <lb n="35,31"></lb>φωνὴν ἀποτελέσει τῆς σάλπιγγος. </s> <s id="id.000728">πείρᾳ οὖν σκεψώ<lb n="35,32"></lb>μεθα, πότε μὲν κατάλληλον τὸ τρῆμα τῷ ΜΟ σωλῆνι, <lb n="35,33"></lb>πότε δὲ τῷ ΝΠ, πότε δὲ τῷ Ξ ἐπὶ Ζ τῷ ἐπικειμένῳ <pb pagenum="322"></pb><lb n="35,34"></lb>ζῳδαρίῳ. </s> <s id="id.000729">καὶ ταῦτα γνόντες σημεῖά τινα ἐν αὐτοῖς <lb n="35,35"></lb>παρασημειωσόμεθα παρὰ τὴν ΚΛ περόνην πρὸς τὸ <lb n="35,36"></lb>ὁπόταν μὲν προαιρώμεθα σαλπίζειν, ὅταν δὲ πάλιν <lb n="35,37"></lb>βουλώμεθα φυσᾶν, αὐτὸ φυσᾶν, ὁπόταν δὲ βουλώμεθα, <lb n="35,38"></lb>κοσσυφίζειν. </s> <s id="id.000730">τὸ δὲ τοῦ κρατῆρος καὶ τῆς τοῦ θερμοῦ <lb n="35,39"></lb>ἀναβάσεως, ὥσπερ καὶ ἐπάνω εἰρήκαμεν, οὕτως γίγνεται. <lb n="35,40"></lb></s> </p> <p n="36"> <s id="id.000731">Ζῷον τέμνεσθαί τε καὶ πίνειν. <lb n="36,1"></lb></s> <s id="id.000732">Ἔστω γὰρ ἐν τῷ στόματι αὐτοῦ σωλὴν ὁ ΑΒ, ἐν <lb n="36,2"></lb>δὲ τῷ τραχήλῳ ὁ ΓΔ διήκων δι' ἑνὸς τῶν ἐκτὸς <lb n="36,3"></lb>ποδῶν· μέσος δὲ ἀμφοτέρων ἄρρην κύλινδρος ἔστω <lb n="36,4"></lb>ὁ ΕΖ, ᾧ προσκεκολλήσθωσαν κανόνες ὀδοντωτοὶ οἱ <lb n="36,5"></lb>Η, Θ. </s> <s id="id.000733">καὶ τοῦ μὲν Η ὑπερκείσθω τυμπάνου ὀδοντω<lb n="36,6"></lb>τοῦ μέρος τὸ Κ· τῷ δὲ Θ ὑποκείσθω ὁμοίως μέρος <lb n="36,7"></lb>τυμπάνου ὀδοντωτοῦ τὸ Λ· ὑπερκείσθω δὲ πάντων τὸ <lb n="36,8"></lb>Μ τρόχιον ἔχον τὴν ἐντὸς ἄντυγα παχυτέραν τῆς ἐκτός. <lb n="36,9"></lb><pb pagenum="324"></pb></s> <s id="id.000734">ἐκτετμήσθω κύκλοις τρισὶ τοῖς Μ, Ν, Ξ, ὥστε ἕκαστον <lb n="36,10"></lb>διάστημα τῶν τομῶν ἴσον εἶναι τῇ ἐκ τοῦ κέντρου <lb n="36,11"></lb>τοῦ τυμπάνου· τοῖς δὲ κύκλοις συντετμήσθω καὶ ἡ <lb n="36,12"></lb>ἄντυξ, ὥστε μηκέτι κύκλον εἶναι τὴν τοῦ τροχοῦ περι<lb n="36,13"></lb>φέρειαν. </s> <s id="id.000735">διατετμημένου δὲ ἐπάνωθεν τοῦ τραχήλου <lb n="36,14"></lb>τῇ ΟΠ τομῇ καὶ ἐντὸς τῆς τομῆς κεχωρισμένης τῆς <pb pagenum="326"></pb><lb n="36,15"></lb>κεφαλῆς, ἐγκεκολάφθω ἐν αὐτῇ κοιλότης περιφερὴς τὰ <lb n="36,16"></lb>ἐν βάθει πλατύτερα ἔχουσα τῶν ἐκτὸς μερῶν, ἵνα ᾖ <lb n="36,17"></lb>ὥσπερ θῆλυς πελεκινοειδὴς σωλήν, ὅσπερ ἕξει δύο <lb n="36,18"></lb>πλευρὰς τοῦ ἐγγραφομένου ἑξαγώνου εἰς τὸν τύμπανον· <lb n="36,19"></lb>ἔστω δὲ ἡ ΡΣ, εἰς ἣν ἐμβᾶσα πᾶσα τροχάσει ἡ ΜΝΞ <lb n="36,20"></lb>ἄντυξ, ὥστε πρὶν ἐκφανῆναι τὸ τέλος τοῦ ἑνὸς μέρους, <lb n="36,21"></lb>ἀντεισελθεῖν τὴν ἀρχὴν τοῦ δευτέρου καὶ οὕτως τὸ <lb n="36,22"></lb>τρίτον, ὥστε βληθέντος περονίου διὰ τοῦ τυμπάνου <lb n="36,23"></lb>στρέφεσθαι μὲν τὸν τροχόν, συνέχεσθαι δὲ τὴν κεφαλὴν <lb n="36,24"></lb>τῷ σώματι. </s> <s id="id.000736">ἐὰν οὖν καθῇ τις μαχαίριον διὰ τῆς <lb n="36,25"></lb>ΟΠ τομῆς, ἐμβὰν εἰς μίαν τοῦ τροχίου περιφερῆ <lb n="36,26"></lb>ἐντομήν, τὴν Ξ, %παρακλεῖσθαι αὐτὸ τῇ ΟΠ κοίλῃ <lb n="36,27"></lb>κεκολαμμένῃ περιφερείᾳ· καταβὰν δὲ ἐπιβήσεται τῇ <lb n="36,28"></lb>ἐξεχούσῃ κεραίᾳ τοῦ Κ μέρους τοῦ τυμπάνου, ὅπερ <lb n="36,29"></lb>μέρος καταγόμενον ἐναρμόσει τοὺς ἰδίους ὀδόντας τοῖς <lb n="36,30"></lb>ὀδοῦσι τοῦ Η κανόνος, ὅσπερ εἰς τὸ ὀπίσω παραγενό<lb n="36,31"></lb>μενος ἐκδύσεται τοῦ ΑΒ σωλῆνος τὸν κύλινδρον, <lb n="36,32"></lb>ὥστε διὰ τοῦ γενομένου διαστήματος ἐκχωρῆσαν καὶ <lb n="36,33"></lb>κατελθὸν τὸ μαχαίριον ἐμπεσεῖν τῇ ἐξεχούσῃ κεραίᾳ <lb n="36,34"></lb>τοῦ *λ μέρους τοῦ τυμπάνου. </s> <s id="id.000737">τοῦτο δὲ καταγόμενον <lb n="36,35"></lb>καὶ ἐναρμόζον τοὺς ὀδόντας τῷ Θ ὀδοντωτῷ κανόνι <lb n="36,36"></lb>ἐξάξει τὸν ἄρρενα κύλινδρον ἐκ τοῦ ΓΛ [ἔστι δὲ <pb pagenum="328"></pb><lb n="36,37"></lb>σωλὴν μέσος ἐναρμοζόμενος δύο σωλήνων ὁ κύλινδρος <lb n="36,38"></lb>τοῦ τε ἐν τῷ στόματι τοῦ ζῳδίου καὶ τοῦ ἐν τῷ ἀπὸ <lb n="36,39"></lb>τῆς τομῆς τοῦ τραχήλου διήκοντος εἰς τὸν ὀπίσω <lb n="36,40"></lb>πόδα] σωλῆνος καὶ ἁρμόσει τῷ ΑΒ θήλει. </s> <s id="id.000738">διελθόντος <lb n="36,41"></lb>δὴ τοῦ μαχαιρίου δι' ὅλου τοῦ τραχήλου καὶ τοῦ ΕΖ <lb n="36,42"></lb>σωλῆνος ἐφαψαμένου ἀμφοτέρων τοῦ τε ΑΒ καὶ τοῦ <lb n="36,43"></lb>ΓΔ, εἰ προσενέγκοι τις ὕδωρ τῷ ζῴῳ καὶ ἐπιστρέψει <lb n="36,44"></lb>τὸ ὑποκείμενον τῷ βουκόλῳ σμήρισμα, δι' οὗ στρα<lb n="36,45"></lb>φέντος καταρρεύσει τὸ ἐν τῇ ἄνω χώρᾳ ὑγρὸν εἰς τὴν <lb n="36,46"></lb>κάτω, διὰ τοῦ ΓΔΕΖΑΒ σωλῆνος τὸ πνεῦμα τὸ <lb n="36,47"></lb>ἑλκόμενον ὑπὸ τοῦ καταρρέοντος ὕδατος ἐπισπάσεται <lb n="36,48"></lb>τὸ προσενεχθὲν τῷ στόματι ὑγρόν. </s> <s id="id.000739">νῦν μέντοι τὸ <lb n="36,49"></lb>σμήρισμα κατασκευάζεται οὕτως, ὥστε ἐπιστραφέντος <lb n="36,50"></lb>τοῦ βουκόλου κατάλληλα γίγνεσθαι τὰ τρυπήματα. <lb n="36,51"></lb></s> </p> <p n="37"> <s id="id.000740">Δύναται δὲ καὶ ἄλλως μὴ ὑπάρχοντος ἐπιρρύτου <lb n="37,1"></lb>ὕδατος τὸ αὐτὸ γίνεσθαι οὕτως. <lb n="37,2"></lb></s> <s id="id.000741">Ἔστω βάσις πάλιν στεγνὴ πάντοθεν ἡ ΑΒΓΔ, <lb n="37,3"></lb>διάφραγμα μέσον ἔχουσα τὸ ΕΖ, ὁ δὲ ἐκ τοῦ στόματος <pb pagenum="330"></pb><lb n="37,4"></lb>σωλὴν φέρων εἰς τὴν βάσιν ὁ ΗΘΚ, ἕτερος δὲ σωλὴν <lb n="37,5"></lb>διά τε τῆς ΑΔ ἐφέδρας τῆς βάσεως καὶ διὰ τοῦ ΕΖ <lb n="37,6"></lb>διαφράγματος ὁ ΛΜΝ τρύπημα ἔχων ὑπὲρ τὸ ΕΖ <lb n="37,7"></lb>διάφραγμα τὸ Ξ. </s> <s id="id.000742">ἕτερος δὲ σωλὴν συνεσμηρισμένος <lb n="37,8"></lb>αὐτῷ ἔστω ὁ Π καὶ οὗτος τρύπημα ἔχων κατὰ τὸ Ξ <lb n="37,9"></lb>κείμενον τὸ Ρ, ᾧ συμφυὴς ἔστω ἤτοι Πὰν ἢ ἄλλο τι <lb n="37,10"></lb>ζῴδιον ῥάβδον ἔχον. </s> <s id="id.000743">ὅταν μὲν οὖν ἐπεστραμμένον ᾖ <lb n="37,11"></lb>τὸ ζῴδιον πρὸς τὸ ζῷον, οὐ μὴ πίῃ καθάπερ ὑπὸ <lb n="37,12"></lb>φόβου κωλυόμενον· ὅταν δὲ ἀποστραφῇ, τότε πίεται. <lb n="37,13"></lb></s> <s id="id.000744">ἐὰν οὖν ἐμβάλωμεν εἰς τὸ ΑΔΕΖ ἀγγεῖον διά τινος <lb n="37,14"></lb>τρυπήματος τοῦ Φ ὕδωρ καὶ πάλιν ἐπιστεγνώσωμεν <pb pagenum="332"></pb><lb n="37,15"></lb>τὸ τρύπημα κηρῷ ἢ ἄλλῳ τινί, συμβήσεται καταλλήλων <lb n="37,16"></lb>κειμένων τῶν Ρ, Ξ τρυπημάτων τὸ ἐμβληθὲν ὕδωρ <lb n="37,17"></lb>μεταχωρεῖν εἰς τὸ ΕΒΓΖ ἀγγεῖον· κενούμενον δὲ τὸ <lb n="37,18"></lb>ΑΔΕΖ ἐπισπάσεται διὰ τοῦ στόματος τοῦ ζῴου τὸν <lb n="37,19"></lb>ἀέρα, καὶ τηνικαῦτα προσενεχθέντος αὐτῷ ποτηρίου <lb n="37,20"></lb>πίεται. <lb n="37,21"></lb><pb pagenum="334"></pb></s> </p> </chap> </body> <back></back> </text> </archimedes>