de ponderoso et levi

Pseudo Euclid de ponderoso et levi 1537 Paris Herwagen?? la eucli_ponde_056_la_1537.xml 056.xml

~~EVCLIDIS DE LEVI ET PONDEROSO FRAGMENTUM.~~

~~Diffinitiones.~~

~~1 Æqua magnitudine corpora &longs;unt, quæ loca replent æqua.~~ ~~2 Diuer&longs;a magnitudine corpora &longs;unt, quæ loca replent non æqua.~~ ~~3 Grandiora magnitudine dicuntur corpora, quæ loco &longs;unt ampliore.~~ ~~4 Æqua potentia corpora &longs;unt, quorum & tempore & aëre aquáve media æquabilis & per æqualia interualla æquales &longs;unt motus.~~ ~~5 Diuer&longs;a potentia corpora &longs;unt, quorum, tempore diuer&longs;o motus &longs;unt æquales.~~ ~~6 Diuer&longs;orum potentia corporum, maius id potentia dicitur, quod mouendo temporis in&longs;ump&longs;it minus: minus autem potentia, quod temporis amplius.~~ ~~7 Generis eiu&longs;dem corpora &longs;unt, quæ cum æqua magnitudine &longs;int, etiam &longs;unt potentia.~~ ~~8 Diuer&longs;a genere corpora &longs;unt, quæ cum æqua magnitudine &longs;int, potentia non &longs;unt, per idem licet medium moueantur.~~ ~~9 Diuer&longs;orumgenere corporum, potentius id dicitur quod e&longs;t &longs;olidius.~~

~~Theoremata.~~

~~Theorema primum~~

~~Diuer&longs;orum potentia corporum, quod &longs;patium amplius mouetur, habet amplius potentiæ.~~

Sint a & b corpora dio, &longs;int gd & ef, &longs;patia duo, gd maius per quod a, ef, minus per quod b mouetur re&longs;ecabo à &longs;patio gd, gr, &longs;patium, &longs;ic ut &longs;it ef &longs;patio &longs;patium gr æquale. ~~Cætera &longs;ponte patent.~~

~~Theorema &longs;ecundum~~

~~EOrundem genere corporum&longs;i ip&longs;a inter &longs;e erunt multiplicia, erunt æque ip&longs;orum potentiæ multiplices.~~

~~Sit corpus ag, eodem genere corpori d duplum, dico.~~

~~etiam potentia duplum e&longs;&longs;e.~~ Sit enim ag, quidem corporis potentia eh, d uero & ag iuxta multiplicis exce&longs;&longs;um in ab & bg, diuidatur, &longs;ic ut utriu&longs;que potentia,ip&longs;ius d corporis potentiæ quæ erat c æqualis, fiat rur&longs;us ut ag corpus in partes ab, bg corpori d æquas diui&longs;imus. ~~&longs;ic eh, potentiam in partes er & rh, æquas c potentia diuidamus.~~ ~~Liquidum e&longs;t eh potentiam duplum potentiæ c euadere.~~

~~Theorema tertium~~

~~EOrundem genere corporum, proportio, & magnitudine, & potentia e&longs;t eadem.~~

~~Sit à corpuscorporis eodem genere b duplum, dico ut a corpus ad b corpus e&longs;t, &longs;ic corporis a potentia g ad corporis b potentiam d e&longs;&longs;e.~~ ~~Patet &longs;i ut corpora &longs;ic potentias æque utrinque multipliciter diuidamus.~~

~~Theorema quartum~~

QUæ corpora, æqua potentia eiu&longs;dem generis corpori &longs;unt, eiu&longs;dem&longs;unt inter &longs;e generis, ablatis enim æqualibus illi tertio, erunt ip&longs;orum uirtutes æquales, quia potentiæ tertij æquales.

~~Quorum corporum & magnitudo & potentia proportio una e&longs;t, ip&longs;a generis eiu&longs;dem erunt.~~ ~~Sit ut a corpus ad corpus b, &longs;ic corpus a potentia ad corporis b potentiam d, dico a. b. corpora generis eiu&longs;dem e&longs;&longs;e.~~ ~~Statuamus enim a. corpus, æquale corpori cuius potentia &longs;it r.~~ ~~Erunt igitur ut b ad a, &longs;ic r ad potentiam ip&longs;ius a quæ e&longs;t g.~~ ~~Reliqua patent.~~