Archimedes, Archimedis De iis qvae vehvntvr in aqva libri dvo

Table of contents

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[31.] LEMMAI.
[32.] LEMMA II.
[33.] LEMMA III.
[34.] LEMMA IIII.
[35.] PROPOSITIO VII.
[36.] PROPOSITIO VIII.
[37.] COMMENTARIVS.
[38.] PROPOSITIO IX.
[39.] COMMENTARIVS.
[40.] PROPOSITIO X.
[41.] COMMENTARIVS.
[42.] LEMMA I.
[43.] LEMMA II.
[44.] LEMMA III.
[45.] LEMMA IIII.
[46.] LEMMA V.
[47.] LEMMA VI.
[48.] II.
[49.] III.
[50.] IIII.
[51.] V.
[52.] DEMONSTRATIO SECVNDAE PARTIS.
[53.] COMMENTARIVS.
[54.] DEMONSTRATIO TERTIAE PARTIS.
[55.] COMMENTARIVS.
[56.] DEMONSTRATIO QVARTAE PARTIS.
[57.] DEMONSTRATIO QVINT AE PARTIS.
[58.] FINIS LIBRORVM ARCHIMEDIS DE IIS, QVAE IN AQVA VEHVNTVR.
[59.] FEDERICI COMMANDINI VRBINATIS LIBER DE CENTRO GRAVITATIS SOLIDORV M.
[60.] CVM PRIVILEGIO IN ANNOS X. BONONIAE, Ex Officina Alexandri Benacii. M D LXV.
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13311DE CENTRO GRA VIT. SOLID.& per o ducatur o p ad k m ipſi h g æquidiſtans. Itaque li
nea h m bifariã uſque eò diuidatur, quoad reliqua ſit pars
quædam q m, minor o p.
deinde h m, m g diuidantur in
partes æ quales ipſi m q:
& per diuiſiones lineæ ipſi m K
æ quidiſtantes ducantur.
puncta uero, in quibus hæ trian-
gulorum latera ſecant, coniungantur ductis lineis r s, t u,
89[Figure 89] x y;
quæ baſi g h æquidiſtabunt. Quoniam enim lineæ g z,
h α ſunt æ quales:
itemq; æquales g m, m h: ut m g ad g z,
ita erit m h, ad h α:
& diuidendo, ut m z ad z g, ita m α ad
α h.
Sed ut m z ad z g, ita k r ad r g: & ut m α ad α h, ita k s
112. ſexti. ad s h.
quare ut κ r ad r g, ita k s ad s h. æ quidiſtant igitur
22I1. quinti inter ſe ſe r s, g h.
eadem quoque ratione demonſtrabimus
332. ſexti.

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