<TEI xmlns="http://www.tei-c.org/ns/1.0" xmlns:py="http://codespeak.net/lxml/objectify/pytype" py:pytype="TREE"><text><body><div type="edition" xml:lang="lat" n="urn:cts:latinLit:stoa0058.stoa007.opp-lat3"><div type="textpart" subtype="book" n="5"><div type="textpart" subtype="chapter" n="15"><head><title>DE COMMVNIBVS DIFFERENTIAE ET PROPRII.</title></head><p>Differentia uero et proprium commune quidem
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habent aequaliter participari ab his quae eorum par-
ticipant; aequaliter enim rationalia rationalia sunt
et risibilia risibilia. et semper et omni adesse com-
<note type="footnote">18—p. 330, 4] Porph. p. 19, 4—9 (Boeth. p. 47, 12—19).</note>
<note type="footnote">1 rationalitatem <hi rend="italic">HN</hi> 2 aero] quis <hi rend="italic">R</hi> rationalitas <hi rend="italic">HLa.c.N</hi> 3 est
<hi rend="italic">om. CEGP</hi> 4 specieqne <hi rend="italic">R</hi> et species <hi rend="italic">C</hi> distant <hi rend="italic">C</hi> distantia est <hi rend="italic">EGP</hi>
species] significationes <hi rend="italic">Em1</hi> 5 differentia est <hi rend="italic">C</hi> 6 saepe <hi rend="italic">om. EGR
post</hi> pluribus <hi rend="italic">add.</hi> uero <hi rend="italic">R</hi> 8 enim] etiam <hi rend="italic">Lm1</hi> igitur <hi rend="italic">Lm2Pm1</hi> 10 asinae
<hi rend="italic">HLm2</hi> 11 perficit <hi rend="italic">GP</hi> 12 perficiant <hi rend="italic">Lm1R</hi> 14 nec.. nec <hi rend="italic">C</hi> neque
permisceri possunt <hi rend="italic">om. EGR</hi> neque aliquid] non aliquid <hi rend="italic">EGR</hi> cogi-
tatione si <hi rend="italic">HN</hi> 18 COMMVNIBVS] d<hi rend="italic">e Porph. cf. ad p. 102, 7</hi> 20 par-
ticipari] praedicari <hi rend="italic">L</hi> ab his—dicitur <hi rend="italic">(p. 330, 2)</hi>] <hi rend="italic">LR<foreign xml:lang="grc">Q</foreign>, om. cett.</hi> ab
<hi rend="italic">om. <foreign xml:lang="grc">Σ</foreign>, del. <foreign xml:lang="grc">A</foreign>m2</hi> 21 post enim <hi rend="italic">s. l.</hi> quae <hi rend="italic"><foreign xml:lang="grc">T</foreign>m2</hi> rationalia rationalia]
<hi rend="italic"><foreign xml:lang="grc">Tk</foreign>m2<foreign xml:lang="grc">&lt;t&gt;W</foreign>m2 edd.</hi> rationalia rationabilia <foreign xml:lang="grc">Π</foreign> rationalia <hi rend="italic"><foreign xml:lang="grc">A2&lt;V</foreign>m1</hi> rationabilia
<hi rend="italic">LR<foreign xml:lang="grc">&amp;</foreign>m1</hi> rationabilia rationabilia <hi rend="italic">Busse</hi> sunt <hi rend="italic">om. R, s. l. <foreign xml:lang="grc">h</foreign>m2</hi> 22 et <hi rend="italic">er.
uid. <foreign xml:lang="grc">Δ</foreign> post.</hi> risibilia <hi rend="italic">om. LR<foreign xml:lang="grc">\2</foreign>, post add.</hi> sunt <hi rend="italic">codd., om. L cum
Porph. p. 19, 6</hi></note>
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mune utriusque est. si enim curtetur qui est bipes,
sed ad id quod natum est semper dicitur; nam et
risibile in eo quod natum est habet id quod est semper,
sed non in eo quod semper rideat.</p><p>Nunc differentiae propriique communia continua ratione per-
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-sequitur. commune enim dicit esse proprio ac differentiae quod
aequaliter participantur — aeque enim omnes homines rationa-
biles sunt, aeque risibiles —, illud, quia substantiam monstrat,
istud, quia est aequum proprium speciei et subiectam speciem
non relinquit. Aliud etiam his commune subiungit : aequa-
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liter enim semper differentia subiectis adest ut proprium;
semper enim homines rationabiles sunt, ut semper quoque
risibiles. sed obici poterat non semper esse bipedem hominem,
cum sit bipes differentia, si unius pedis perfectione curtetur.
quam tali modo soluimus quaestionem. propria et differentiae
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non in eo quod semper habeantur, sed in eo quod semper
naturaliter haberi possunt, semper dicuntur adesse subiectis.
<note type="footnote">1 utrisque <foreign xml:lang="grc">ΓΛΣΦ</foreign> si] sine <hi rend="italic">R<foreign xml:lang="grc">ΓΦ</foreign></hi> qui est] quies <hi rend="italic">R</hi> quidem <hi rend="italic">L<foreign xml:lang="grc">A</foreign>
post</hi> bipes <hi rend="italic">add.</hi> non substantiam <hi rend="italic">(</hi>substantia <foreign xml:lang="grc">ΑΦ</foreign><hi rend="italic">)</hi> perimit <hi rend="italic">(</hi>perimitur <foreign xml:lang="grc">Ψ</foreign><hi rend="italic">)
L<foreign xml:lang="grc">ΑΨ</foreign> Busse (in adn. deleri mauult)</hi>, non substantia perit <hi rend="italic">(</hi>peribit <foreign xml:lang="grc">Σ</foreign><hi rend="italic">)</hi>
<hi rend="italic"><foreign xml:lang="grc">ΓΠΣΦ</foreign>p</hi>, <hi rend="italic">om. Rbrm, Porph. p. 19, 8, Boeth. in comment.</hi> 2 sed] ta-
men <hi rend="italic">R</hi> ad id quod] ad quod <hi rend="italic">L<foreign xml:lang="grc">AΠ</foreign> (post</hi> est <hi rend="italic">repet.</hi> ad id<hi rend="italic">)</hi> <foreign xml:lang="grc">Σ</foreign> <hi rend="italic">Busse</hi>
ad id ad quod <foreign xml:lang="grc">Ψ</foreign>, ad id <hi rend="italic">post</hi> est <hi rend="italic"><foreign xml:lang="grc">h</foreign>m1 post</hi> est <hi rend="italic">add.</hi> habet et id
quod est <hi rend="italic">L<foreign xml:lang="grc">A</foreign> (del. m2) <foreign xml:lang="grc">2</foreign>, ‘fortasse</hi> id quod est <hi rend="italic">recipiendum’ Russe :
Porph. p. 19, 8</hi> <foreign xml:lang="grc">αλλά πρός το πεοοχένοι το</foreign> <hi rend="italic">(<foreign xml:lang="grc">το</foreign> om. Μ)</hi> <foreign xml:lang="grc">άει λέγεται</foreign> nam
<hi rend="italic">-om. R</hi> 3 in eo] eo <hi rend="italic">EGLR<foreign xml:lang="grc">A</foreign>m1</hi> ad <hi rend="italic">C<foreign xml:lang="grc">72</foreign></hi> id <hi rend="italic">Ρ<foreign xml:lang="grc">Π</foreign></hi> ad id <foreign xml:lang="grc">*F</foreign> aliquod <hi rend="italic">N</hi>
habet id quod est semper] <hi rend="italic">C (</hi>id <hi rend="italic">s. l. m1?) L<foreign xml:lang="grc">hA</foreign> (</hi>"habet—est <hi rend="italic">del. m2),
pro</hi> id <hi rend="italic">exhib.</hi> hoc <hi rend="italic">H</hi> et id <foreign xml:lang="grc">Σ</foreign>, est <hi rend="italic">om. N</hi> habet semper <hi rend="italic">Ρ<foreign xml:lang="grc">Π</foreign></hi> habet <hi rend="italic">EG</hi>
semper dicitur <foreign xml:lang="grc">ΓΦΨ</foreign>, <hi rend="italic">om. R</hi> 4 sed—rideat] in <hi rend="italic">om. C, in mg. Hm2,</hi>
in quod semper rideat <hi rend="italic">EG</hi> non quod semper rideat <hi rend="italic">R<foreign xml:lang="grc">Ψ</foreign>; Porph.</hi> <foreign xml:lang="grc">έπε'ι
ναι τό γελαστικόν τώ πεφυχέναι έχει τό αεί, άλλ' ο όχι τώ γελάν άει</foreign> 6 enim]
autem <hi rend="italic">Lm2P</hi> dicitur <hi rend="italic">CEGR</hi> proprii <hi rend="italic">C</hi> 7 rationales <hi rend="italic">Cm2ELm2P</hi>
8 atque <hi rend="italic">NR</hi> 9 istud] illud <hi rend="italic">EGHN (add.</hi> risibilis<hi rend="italic">) P</hi> aequum
<hi rend="italic">om. H</hi> aeque <hi rend="italic">EG, recte?</hi> propriae <hi rend="italic">EGLPR</hi> et <hi rend="italic">om. EG</hi> ac <hi rend="italic">N</hi>
subiectam <hi rend="italic">om. C</hi> subiectum <hi rend="italic">EGPm1</hi> 10 reliquit <hi rend="italic">ELa.c.</hi> etiam his]
hic etiam <hi rend="italic">HN</hi> 11 subiectis <hi rend="italic">s. l. Gm2</hi> 12 rationales <hi rend="italic">Cm2HN</hi>
15 <hi rend="italic">ante</hi> propria <hi rend="italic">add.</hi> et <hi rend="italic">HNP (del. m2), s. l. Lm2</hi> propriae <hi rend="italic">CEGPm2</hi>
proprii <hi rend="italic">R</hi> et <hi rend="italic">om. CE, del. Pm2</hi> 16 <hi rend="italic">post</hi> in] ex <hi rend="italic">HN</hi></note>
<pb n="331"/>
si enim quis curtetur pede, nihil attinet ad naturam, sicut
nihil ad detrahendum proprium ualet, si homo non rideat.
haec enim non in eo quod adsint, sed in eo quod per naturam
adesse possint, semper adesse | dicuntur. ipsum enim semper;
<note type="marginal">p. 107</note>
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non actu esse dicimus, sed natura. numquam enim fieri potest,
ut per naturae ipsius proprietatem non semper homo bipes
sit, etiamsi potest fieri, ut pede curtetur, etiam si deminuto
pede sit natus; in his enim non speciei atque substantiae,
sed nascenti indiuiduo derogatur.</p></div></div></div></body></text></TEI>