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

[Item 1.]

[2.] APOLLONII PERGÆI CONICORVM LIB. V. VI. VII. & ARCHIMEDIS ASVMPTOR VM LIBER.

[3.] APOLLONII PERGÆI CONICORVM LIB. V. VI. VII. PARAPHRASTE ABALPHATO ASPHAHANENSI

[4.] ADDITVS IN CALCE ARCHIMEDIS ASSVMPTORVM LIBER, EX CODICIBVS ARABICIS M.SS. SERENISSIMI MAGNI DVCIS ETRVRIÆ ABRAHAMVS ECCHELLENSIS MARONITA

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[5.] IO: ALFONSVS BORELLVS

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[6.] AD SERENISSIMVM COSMVM III. ETRVRIÆ PRINCIPEM FLORENTIÆ, Ex Typographia Ioſephi Cocchini ad inſigne Stellæ MDCLXI. SVPERIORVM PERMISSV.

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[7.] COSMVM TERTIVM ETRVRIÆ PRINCIPEM. 10: AL FONSVS BORELLIVS F.

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[8.] CAVE CHRISTIANE LECTOR.

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[9.] IN NOMINE DEI MISERICORDIS MISERATORIS. PROOE MIVM ABALPHATHI FILII MAHMVDI, FILII ALCASEMI, FILII ALPHADHALI ASPHAHANENSIS. LAVS DEO VTRIVSQVE SECVLI DOMINO.

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[10.] ABRAHAMI ECCHELLENSIS IN LATINAM EX ARABICIS Librorum Apollonij Pergæi verſionem PRÆFATIO.

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[11.] PRÆFATIO AD LECTOREM.

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[12.] INDEX

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[13.] APOLLONII PERGAEI CONICORVM LIB. V. DEFINITIONES. I.

[14.] II.

[15.] III.

[16.] IV.

[17.] V.

[18.] VI.

[19.] VII.

[20.] VIII.

[21.] IX.

[22.] X.

[23.] XI.

[24.] XII.

[25.] XIII.

[26.] XIV.

[27.] XV.

[28.] XIV.

[29.] NOTÆ.

[30.] SECTIO PRIMA Continens propoſitiones I. II. & III. Apollonij. PROPOSITIO I.

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13496Apollonij Pergæi

Notæ in Propoſ. LXXIV.

ERgo E F per centrum non tranſit, cadat ſuper C D, & quia produ-
11a cti ſunt ex E duo breuiſecantes; ergo C F excedit dimidium erecti,
& E F æqualis eſt Trutinæ (52. ex 5.) patet itaque, vt antea demonſtra-
uimus, quod E G ſit maximus ramorum, & E C minimus, & c.

118[Figure 118] Quoniam in 11. huius oſtenſum eſt, quod ſemiaxis minor ellipſis eſt ramus bre-
uiſsimus, ergo ſi incidentia perpendicularis E F ſuper axim A C, ideſt punctum
F eſt centrum ellipſis educerentur ex concurſu E tres breuiſecantes, nimirum
E H, E G, & E F producta, quæ eſſet axis minor ellipſis: hoc autem eſt con-
tra hypotheſim, cum ducti ſint ex E duo breuiſecantes: ergo eorum vnus E H
menſuram C F ſecat, quæ minor eſſe debet ſemiſſe axis maioris C D; igitur
ex conuerſa propoſitione 50. huius, menſura C F maior erit ſemiſſe lateris re-
cti, & (ex conuerſa propoſ. 52. huius) erit perpendicularis E F æqualis Tru-
tinæ. Demonſtratio huius propoſitionis neglecta ab Apollonio, propterea quod
eodem ferè modo, ac præcedens oſtendi poteſt, breuiſsimè perficietur in hunc
modum.

Quoniam à concurſu E vnicus tantum breuiſecans E H ad quadrantem C B
22Propoſ.
67. huius. ducitur; igitur C E minimus eſt omnium ramorum cadentium ad ſectionis pe-
ripheriam C B, & E C vertici B propinquior minor eſt remotiore E H, & E
H minor, quàm E B: rurſus, quia ramorum cadentium ex E ad peripheriam
33Ex 29. 30.
huius. B G vnus tantummodo breuiſecans E G conſtituit cum tangente N G

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