Livre, Chap. |
[3, 4] |
ἢ
τὰ
πρῶτα·
τοῦτο
δ᾽
|
ὅτι |
ἀδύνατον
ἄρτι
διηπορήσαμεν.
Ἔτι
εἰ |
[3, 2] |
τέλος
ἐστὶν
(καὶ
οὕτως
αἴτιον
|
ὅτι |
ἐκείνου
ἕνεκα
καὶ
γίγνεται
καὶ |
[3, 5] |
τις
οὖσα.
Ὁμοίως
δὲ
δῆλον
|
ὅτι |
ἔχει
καὶ
περὶ
τὰς
στιγμὰς |
[3, 2] |
τῆς
γεωδαισίας
ἡ
γεωμετρία
μόνον,
|
ὅτι |
ἡ
μὲν
τούτων
ἐστὶν
ὧν |
[3, 3] |
τί
ἄν
τις
ὑπολάβοι,
πλὴν
|
ὅτι |
καθόλου
κατηγορεῖται
καὶ
κατὰ
πάντων; |
[3, 2] |
αἰσθητὰ
μεταξὺ
καὶ
αἰσθήσεις,
δῆλον
|
ὅτι |
καὶ
ζῷα
ἔσονται
μεταξὺ
αὐτῶν |
[3, 2] |
ἡ
δ᾽
οὐκ
αἰσθητῶν,
δῆλον
|
ὅτι |
καὶ
παρ᾽
ἰατρικὴν
ἔσται
τις |
[3, 2] |
ἔχειν
οὕτω
μόνον,
ἀλλὰ
δῆλον
|
ὅτι |
καὶ
τὰ
εἴδη
ἐνδέχοιτ᾽
ἂν |
[3, 3] |
Πρὸς
δὲ
τούτοις
εἰ
καὶ
|
ὅτι |
μάλιστα
ἀρχαὶ
τὰ
γένη
εἰσί, |
[3, 4] |
ἀδύνατον
ἄρτι
διηπορήσαμεν.
Ἔτι
εἰ
|
ὅτι |
μάλιστα
ἔστι
τι
παρὰ
τὸ |
[3, 5] |
μὴν
εἰ
τοῦτο
μὲν
ὁμολογεῖται,
|
ὅτι |
μᾶλλον
οὐσία
τὰ
μήκη
τῶν |
[3, 2] |
(οἷον
τί
ἐστι
τὸ
τετραγωνίζειν,
|
ὅτι |
μέσης
εὕρεσις·
ὁμοίως
δὲ
καὶ |
[3, 4] |
ὄντος
τοῦ
ἑνὸς
οὐσίας,
(δῆλον
|
ὅτι |
οὐδ᾽
ἂν
ἀριθμὸς
εἴη
ὡς |
[3, 4] |
αἴτιον
οὐθὲν
λέγει
ἀλλ᾽
ἢ
|
ὅτι |
οὕτως
πέφυκεν·
Ἀλλ᾽
ὅτε
δὴ |
[3, 2] |
ἐξ
ὧν
ἅπαντες
δεικνύουσιν)
οἷον
|
ὅτι |
πᾶν
ἀναγκαῖον
ἢ
φάναι
ἢ |
[3, 4] |
ὁ
λόγος,
τοῦτό
γε
φανερόν,
|
ὅτι |
(συμβαίνει
αὐτῷ
τὸ
νεῖκος
μηθὲν |
[3, 3] |
τὰ
καθόλου
μᾶλλον
ἀρχαί,
φανερὸν
|
ὅτι |
τὰ
ἀνωτάτω
τῶν
γενῶν·
ταῦτα |
[3, 2] |
αὐτὰς
φάναι
τοῖς
αἰσθητοῖς
πλὴν
|
ὅτι |
τὰ
μὲν
ἀΐδια
τὰ
δὲ |
[3, 6] |
εἴδη.
Εἰ
γὰρ
διὰ
τοῦτο,
|
ὅτι |
τὰ
μὲν
μαθηματικὰ
(τῶν
δεῦρο |
[3, 6] |
καὶ
ἀνάγκη
ταῦτα
λέγειν
αὐτοῖς,
|
ὅτι |
τῶν
εἰδῶν
οὐσία
τις
ἕκαστόν |