Apollonius <Pergaeus>, Apollonii Pergaei Conicorvm Lib. V. VI. VII. paraphraste Abalphato Asphahanensi : nunc primum editi ; additvs in calce Archimedis assvmptorvm liber, ex codibvs arabicis mss Abrahamus Ecchellensis Maronita latinos reddidit, Jo. Alfonsvs Borellvs curam in geometricis versione contulit & [et] notas vberiores in vniuersum opus adiecit

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199161Conicor. Lib. VI.
LEMMAV.
IN eiſdem figuris rurſus G B ad B D maiorem proportionem habeat,
qnàm K F ad F 1 :
Dico quod minimè reperiri poſſunt axium ab-
ſcißæ erectis proportionales, quæ habeant eandem rationem ad contermi-
nas potentiales.
Secentur quælibet abſciſſæ, B C, F H ita vt C B ad B D ſit vt H F ad F I,
&
ducantur ordinatim ad axes applicatæ A C, E H, quæ productæ ſecent, con-
iunctas G D, K I in P, L, atque fiat γ B ad B D vt K F ad F I, iungatur-
que γ D ſecans A P in M.
Manifeſtum eſt rectam C M inæqualem eſſe C P,
(propterea quod γ B minor eſt, quàm G B, cum ad eandem B D minorem pro-
portionem habeat, quàm G B, ideoque punctum Y, &
recta γ D cadent intra,
triangulum G B D, &
punctum M intra ipſum cadet, aut extra G D pro-
ductam).
Quoniam D B ad B γ eſt vt I F ad F K, & erat C B ad B D vt
H F ad F I ;
ergo ex æquali C B ad B γ erit vt H F ad F K, & comparando
terminorum ſummas in hyperbola, &
differentias in ellipſi ad antecedentes, γ C
ad C B erit vt K H ad H F;
eſt verò M C ad C R vt L H ad H K (eoquod
triãgula M C R, &
L H K ſimilia ſunt triangulis ſimilibus B D Y, I F K,) ergo
ex æquali M C ad C B erit vt L H ad H F, &
rectangulum M C B ad quadra-
tum C B eandem proportionem habebit, quàrn rectangulum L H F ad quadra-
tũ H F;
ſed rectangulũ M C B æquale nõ eſt rectangulo P C B (cum M C oſtenſa
ſit inæqualis P C);
ergo rectangulum P C B, ſeu quadratum A C ad quadratum
1112. 13.
lib. 1.
C B non eandem proportionem habet, quàm rectangulum L H F, ſeu quadratum
E H ad quadratum H F;
& propterea A C ad C B non eandem proportionem
habebit quàm E H ad H F.
Idem oſtendetur in reliquis omnibus abſciſſis ſimi-
liter poſitis.
Quare patet propoſitum.
COROLLARIVM I.
MAnifeſtum eſt in coniſectionibus non ſimilibus duci poſſe duas ſeries appli-
catarum ad axes, itaut abſciſſæ ſimiles, ſeu proportionales inter ſe adcõ-
terminas potentiales non ſint in ijſdem rationibus.
COROLLARIVM II.
Colligitur pariter conuertendo, quod in duabus ſectionibus eiuſdem nominis
ſi duæ ſeries abſciſſarum ſimilium in axibus poſitæ fuerint, &
in vna ſe-
rie abſciſſæ ad conterminas potentiales maiorem proportionem habeant, quàm in
altera ſerie, fieri poteſt vt ſiguræ axium non ſint inter ſe ſimiles:
Quod verifi-
catur ſaltem in caſu præcedentis propoſitionis.
His præmiſſis, quoniam paſſo in definitione poſita eſſentialiter conuenit defini-
to eſt impoſſibile, vt eidem ſubiecto definito competant duæ paſſiones diuerſæ, &

inter ſe oppoſitæ, exempli gratia, fieri non poteſt, vt in triangulis ſimilibus

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