Viviani, Vincenzo - De maximis et minimis, geometrica divinatio : in qvintvm Conicorvm Apollonii Pergaei

Viviani, Vincenzo, De maximis et minimis, geometrica divinatio : in qvintvm Conicorvm Apollonii Pergaei

Table of contents

[201.] THEOR. IL. PROP. IIC.

Page: 172 (148)

[202.] THEOR. L. PROP. IC.

Page: 172 (148)

[203.] THEOR. LI. PROP. C.

Page: 173 (149)

[204.] PRIMI LIBRI FINIS.

Page: 174 (150)

[205.] ADDENDA LIB. I.

Page: 175 (151)

[206.] Pag. 74. ad finem Prim. Coroll.

Page: 175 (151)

[207.] Ad calcem Pag. 78. COROLL. II.

Page: 175 (151)

[208.] Pag. 87. ad finem Moniti.

Page: 175 (151)

[209.] Pag. 123. poſt Prop. 77. Aliter idem, ac Vniuerſaliùs.

Page: 175 (151)

[210.] COROLL.

Page: 177 (153)

[211.] Pag. 131. poſt Prop. 84.

Page: 177 (153)

[212.] Pag. 144. ad calcem Prop. 93.

Page: 177 (153)

[213.] SCHOLIVM.

Page: 177 (153)

[214.] Pag. 147. ad finem Prop. 97.

Page: 178 (154)

[215.] FINIS.

Page: 178 (154)

[216.] DE MAXIMIS, ET MINIMIS GEOMETRICA DIVINATIO In Qvintvm Conicorvm APOLLONII PERGÆI _IAMDIV DESIDERATVM._ AD SER ENISSIMVM PRINCIPEM LEOPOLDVM AB ETRVRIA. LIBER SECVNDVS. _AVCTORE_ VINCENTIO VIVIANI.

[217.] FLORENTIÆ MDCLIX. Apud Ioſeph Cocchini, Typis Nouis, ſub Signo STELLÆ. _SVPERIORVM PERMISSV._

[218.] SERENISSIMO PRINCIPI LEOPOLODO AB ETRVRIA.

[219.] VINCENTII VIVIANI DE MAXIMIS, ET MINIMIS Geometrica diuinatio in V. conic. Apoll. Pergæi. LIBER SECVNDVS. LEMMA I. PROP. I.

[220.] LEMMA II. PROP. II.

[221.] THEOR. I. PROP. III.

[222.] LEMMA III. PROP. IV.

[223.] THEOR. II. PROP. V.

[224.] THEOR. III. PROP. VI.

[225.] LEMMA IV. PROP. VII.

[226.] THEOR. IV. PROP. VIII.

[227.] THEOR. V. PROP. IX.

[228.] SCHOLIVM.

[229.] THEOR. VI. PROP. X.

[230.] THEOR. VII. PROP. XI.

20826 in F, G (nam Parabole A B C eſt _MINIMA_ Ellipſi F B G 11ibidem. ptibilium) è quorum altero F ducta ſit ordinata F H I communem axem
222. primi
huius. in H, regulam verò ſecante in I; ſitque F L Parabolen contingens ad F, axemque ſecans in L.

3324. pri-
mi conic.

169[Figure 169]

Iam, in triangulo E B D cum ſit E B dupla B D, erit I H dupla H D,
ſed eſt quoque L H dupla H B, quare vt L H ad H B, ita I H ad H D:
rectangulum ergo L H D æquale eſt rectangulo B H I, ſiue quadrato 44Coroll.
primæ 1.
huius. H, eſtque F H ipſi L D perpendicularis, quare angulus D F L rectus & F L Parabolen contingit in F: vnde D F eſt _MINIMA_ ducibilium 55203. Se-
pt. Pappi. dato puncto D ad peripheriam Parabolæ F B G. Conſimili ratione oſten-
detur, quamlibet aliam inſcriptam P B R Ellipſis peripheriam B F G D
6611. huius
ad nu. 1. ſecare, vt in P, R, & iunctam D P, vel D R eſſe _MINIMAM_, & c. Qua-
re ſemita _MINIMARV M_ ex D ad huiuſmodi Parabolarum peripherias, eſt
prædictæ Ellipſis perimeter. Quod oſtendere propoſitum fuit.

PROBL. II. PROP. XXII.

A dato puncto, ad datę Hyperbolæ peripheriam, MINI-
MAM rectam lineam ducere.

170[Figure 170]

SIt data Hyperbole A B C,
cuius axis B D, rectum B E
tranſuerfum verò B G, centrum
H, & datum vbicunque ſit pun-
ctum F. Oportet ex F ad Hyper-
bolæ peripheriam A B C _MINI-_
_MAM_ rectam lineam ducere.

Si primò datum punctum F,
in prima figura fuerit in axe pro-
ducto, extra Hyperbolen, ipſa
F B erit _MINIMA_.

7710. h.

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