| version 1.12, 2002/08/08 23:25:28 |
version 1.37, 2002/08/18 17:00:59 |
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| <lang>la</lang> | <lang>la</lang> |
| <cvs_file>carda_propo_01_la_1570</cvs_file> | <cvs_file>carda_propo_01_la_1570</cvs_file> |
| <cvs_version></cvs_version> | <cvs_version></cvs_version> |
| <locator></locator> | <locator>0000000015.xml</locator> |
| </info> <text> <front> </front> <body> <chap> <pb/><pb/><pb/><p type="head"> | </info> <text> <front> </front> <body> <chap> <pb/><pb/><pb/><p type="head"> |
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| <s>HIERONYMI <lb/>CARDANI MEDIO <lb/>LANENSIS, CIVISQV'E BONO­<lb/>NIENSIS, PHILOSOPHI, MEDICI ET <lb/>Mathematici clari&longs;simi,</s></p><p type="head"> | <s>HIERONYMI <lb/>CARDANI MEDIO <lb/>LANENSIS, CIVISQV'E BONO­<lb/>NIENSIS, PHILOSOPHI, MEDICI ET <lb/>Mathematici clari&longs;simi,</s></p><p type="head"> |
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| <s><margin.target id="marg122"></margin.target>C<emph type="italics"/>o<emph.end type="italics"/>^{m}.</s></p><p type="main"> | <s><margin.target id="marg122"></margin.target>C<emph type="italics"/>o<emph.end type="italics"/>^{m}.</s></p><p type="main"> |
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| <s>Sint duo mobilia a & b in eodem pun­<lb/><figure id="fig28"></figure><lb/>cto, quæ æqualiter uer&longs;us candem partem <lb/>moueantur æqualibus in temporibus, inui <lb/>cem tamen in æqualiter, ita quod a in f & b <lb/>in g temporibus ab&longs;oluant circulum, & ho <lb/>rum differentia &longs;it h. </s> | <s>Sint duo mobilia a & b in eodem pun­<lb/><figure id="fig28"></figure><lb/>cto, quæ æqualiter uer&longs;us eandem partem <lb/>moueantur æqualibus in temporibus, inui <lb/>cem tamen in æqualiter, ita quod a in f & b <lb/>in g temporibus ab&longs;oluant circulum, & ho <lb/>rum differentia &longs;it h. </s> |
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| <s>Dum ita que a perficit <lb/>circulum b perueniat in c, igitur c d b e&longs;t dif <lb/>ferentia, quæ &longs;uperanda e&longs;t, & proportio <lb/>circuli ad b c ut g ad f, quare reliqui ad reli­<lb/>quum, ut re&longs;idui ad re&longs;iduum, &longs;cilicet circu­<lb/>li ad c d b, ut g ad h, & b c ad c d b ut f ad h, coniungantur igitur in k <lb/>tempore, eruntque k f g h omiologa, ut productum ex circulo in b c <lb/>diui&longs;o per certam quantitatem & cum circulo & b c & c d b diffe­<lb/>rentia, & &longs;it &longs;productum exfin g, dico quod diui&longs;a &longs; per h exibit k <lb/>tempus coniunctionis primæ, &longs;it itaque d locus coniunctionis, dico <lb/>igitur quod differentia &longs;patij pertran&longs;iti a b, a & a, b in reditu ex con <lb/>iunctione prima ad d e&longs;t unus circulus completus, non enim po&longs;­<lb/>&longs;unt e&longs;&longs;e plures, nam &longs;equeretur, quòd a aliquando pertran&longs;i&longs;&longs;et b, <lb/>et &longs;ic non e&longs;&longs;et prima coniunctio, nec pote&longs;t e&longs;&longs;e minus, nam &longs;ic cum <lb/>a & b &longs;int in d ultra perfectas circulationes uterque eorum pertran <lb/>&longs;iuit arcum b c, igitur nullo modo differentia pote&longs;t e&longs;&longs;e minor cir­<lb/>culo, neque maior, ut declaratum e&longs;t, igitur e&longs;t unus circulus ad un­<pb pagenum="37"/>guem. </s> | <s>Dum ita que a perficit <lb/>circulum b perueniat in c, igitur c d b e&longs;t dif <lb/>ferentia, quæ &longs;uperanda e&longs;t, & proportio <lb/>circuli ad b c ut g ad f, quare reliqui ad reli­<lb/>quum, ut re&longs;idui ad re&longs;iduum, &longs;cilicet circu­<lb/>li ad c d b, ut g ad h, & b c ad c d b ut f ad h, coniungantur igitur in k <lb/>tempore, eruntque k f g h omiologa, ut productum ex circulo in b c <lb/>diui&longs;o per certam quantitatem & cum circulo & b c & c d b diffe­<lb/>rentia, & &longs;it &longs;productum exfin g, dico quod diui&longs;a &longs; per h exibit k <lb/>tempus coniunctionis primæ, &longs;it itaque d locus coniunctionis, dico <lb/>igitur quod differentia &longs;patij pertran&longs;iti a b, a & a, b in reditu ex con <lb/>iunctione prima ad d e&longs;t unus circulus completus, non enim po&longs;­<lb/>&longs;unt e&longs;&longs;e plures, nam &longs;equeretur, quòd a aliquando pertran&longs;i&longs;&longs;et b, <lb/>et &longs;ic non e&longs;&longs;et prima coniunctio, nec pote&longs;t e&longs;&longs;e minus, nam &longs;ic cum <lb/>a & b &longs;int in d ultra perfectas circulationes uterque eorum pertran <lb/>&longs;iuit arcum b c, igitur nullo modo differentia pote&longs;t e&longs;&longs;e minor cir­<lb/>culo, neque maior, ut declaratum e&longs;t, igitur e&longs;t unus circulus ad un­<pb pagenum="37"/>guem. </s> |
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| <s>Velut <02> 7/100 quater &longs;um­<lb/>pta efficit <02> 112/100. Et hoc e&longs;t potentia rhete, &longs;ed &longs;i quis auferat mona­<lb/>dem fiet <02> 112/100 m: 1, & hoc e&longs;t reci&longs;um 1, &longs;cilicet 1 p: <02> v: 23/25 m: <02> 28/25, &longs;ed ta <lb/>men uerè e&longs;t linea media.</s></p><p type="main"> | <s>Velut <02> 7/100 quater &longs;um­<lb/>pta efficit <02> 112/100. Et hoc e&longs;t potentia rhete, &longs;ed &longs;i quis auferat mona­<lb/>dem fiet <02> 112/100 m: 1, & hoc e&longs;t reci&longs;um 1, &longs;cilicet 1 p: <02> v: 23/25 m: <02> 28/25, &longs;ed ta <lb/>men uerè e&longs;t linea media.</s></p><p type="main"> |
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| <s>Quod uerò non contingat coniungi in alio loco, neque tem­<lb/>pore &longs;it, ut a b iungantur in c, & &longs;it reuolutio a triplex integra, & b <pb pagenum="42"/>&longs;excuplex, & tempus totum decem annorum: ita ut a c &longs;it tertia <lb/>pars circuitus, & a circuitus tres anni, & quia circuitus b funt fex <lb/>cum tertia, diuidemus decem per 6 1/3 exit <lb/>1 11/29, dico quod non prius, neque in alio <lb/><figure id="fig31"></figure><lb/>puncto. </s> | <s>Quod uerò non contingat coniungi in alio loco, neque tem­<lb/>pore &longs;it, ut a b iungantur in c, & &longs;it reuolutio a triplex integra, & b <pb pagenum="42"/>&longs;excuplex, & tempus totum decem annorum: ita ut a c &longs;it tertia <lb/>pars circuitus, & a circuitus tres anni, & quia circuitus b &longs;unt fex <lb/>cum tertia, diuidemus decem per 6 1/3 exit <lb/>1 11/29, dico quod non prius, neque in alio <lb/><figure id="fig31"></figure><lb/>puncto. </s> |
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| <s>Si enim primùm in eodem pun­<lb/>cto, &, gratia exempli, in quatuor annis <lb/>congruit enim, & b dicamus quod per­<lb/>egerit duas reuolutiones cum tertia, hoc <lb/>enim e&longs;t nece&longs;&longs;arium, &longs;i debet perueni­<lb/>re ad c, & erunt anni tres, & 23/19, non ergo <lb/>anni quatuor. </s> | <s>Si enim primùm in eodem pun­<lb/>cto, &, gratia exempli, in quatuor annis <lb/>congruit enim, & b dicamus quod per­<lb/>egerit duas reuolutiones cum tertia, hoc <lb/>enim e&longs;t nece&longs;&longs;arium, &longs;i debet perueni­<lb/>re ad c, & erunt anni tres, & 23/19, non ergo <lb/>anni quatuor. </s> |
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| <s><margin.target id="marg649"></margin.target>C<emph type="italics"/>o<emph.end type="italics"/>^{m}.</s></p><p type="main"> | <s><margin.target id="marg649"></margin.target>C<emph type="italics"/>o<emph.end type="italics"/>^{m}.</s></p><p type="main"> |
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| <s>Sit a b proportio ad partes c d quæ &longs;int c e, & c d componens f, <lb/>dic<gap/> quod non poterit c d aliàs diuidi, ut proportio a b ad illas <lb/>componat candem proportionem f. </s> | <s>Sit a b proportio ad partes c d quæ &longs;int c e, & c d componens f, <lb/>dic<gap/> quod non poterit c d aliàs diuidi, ut proportio a b ad illas <lb/>componat eandem proportionem f. </s> |
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| <s>Aliter &longs;it diui&longs;a in g, & erit mi­<pb pagenum="203"/>nor c g, minor aut maior c d minore, capiam ergo c d minorem, erit <lb/>igitur proportio a b ad c d maioris exce&longs;&longs;us ad proportionem a b <lb/>ad c g, quàm &longs;it proportio a b ad g d, ma­<lb/><figure id="fig161"></figure><lb/>ior proportione a b ad c e, propterea quod <lb/>g e communis differentia maiorem habet <lb/>proportionem ad e d quam g c, igitur ma­<lb/>ius e&longs;t aggregatum proportionum a b ad <lb/>c e, & e d, <expan abbr="quã">quam</expan> eiu&longs;dem a b ad c g & g d, quod erat demon&longs;trandum.</s></p><p type="main"> | <s>Aliter &longs;it diui&longs;a in g, & erit mi­<pb pagenum="203"/>nor c g, minor aut maior c d minore, capiam ergo c d minorem, erit <lb/>igitur proportio a b ad c d maioris exce&longs;&longs;us ad proportionem a b <lb/>ad c g, quàm &longs;it proportio a b ad g d, ma­<lb/><figure id="fig161"></figure><lb/>ior proportione a b ad c e, propterea quod <lb/>g e communis differentia maiorem habet <lb/>proportionem ad e d quam g c, igitur ma­<lb/>ius e&longs;t aggregatum proportionum a b ad <lb/>c e, & e d, <expan abbr="quã">quam</expan> eiu&longs;dem a b ad c g & g d, quod erat demon&longs;trandum.</s></p><p type="main"> |
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