| version 1.29, 2002/08/09 22:48:34 |
version 1.30, 2002/08/11 00:50:23 |
| |
| | |
| <s><emph type="italics"/>Quo loca Aristotelis Geometrica, in hoc Opere explicata, <lb/>ad Euclidem, &longs;ecundum propo&longs;itionum ordinem refe­<lb/>runtur; vt Mathematicarum Profe&longs;&longs;ores habeant, <lb/>vnde &longs;uas prælectiones aliquando valeant locupletare.<emph.end type="italics"/></s></p><p type="head"> | <s><emph type="italics"/>Quo loca Aristotelis Geometrica, in hoc Opere explicata, <lb/>ad Euclidem, &longs;ecundum propo&longs;itionum ordinem refe­<lb/>runtur; vt Mathematicarum Profe&longs;&longs;ores habeant, <lb/>vnde &longs;uas prælectiones aliquando valeant locupletare.<emph.end type="italics"/></s></p><p type="head"> |
| | |
| <s><emph type="italics"/>In Primo Elem. </s> | <s><emph type="italics"/>In Primo Elem. |
| | |
| <s>Euclidis.<emph.end type="italics"/></s></p><p type="main"> | Euclidis.<emph.end type="italics"/></s></p><p type="main"> |
| | |
| <s>Ad verbum ip&longs;um <emph type="italics"/>(Elementum Euclidis)<emph.end type="italics"/> vide infra tex. </s> | <s>Ad verbum ip&longs;um <emph type="italics"/>(Elementum Euclidis)<emph.end type="italics"/> vide infra tex. </s> |
| | |
| |
| | |
| 3. <lb/>in comm. </s> | 3. <lb/>in comm. </s> |
| | |
| <s>Elem. </s> | <s>Elem. |
| | |
| <s>Euclidis ad primam propo&longs;itionem primi Elementi, pag. <lb/></s> | Euclidis ad primam propo&longs;itionem primi Elementi, pag. <lb/></s> |
| | |
| <s>121. &longs;ic ait, Abductio verò e&longs;t tran&longs;itus à propo&longs;ito problemate, vel theo­<lb/>remate ad aliud, quo cognito, aut comparato Propo&longs;itum quoque per&longs;pi­<lb/>cuum e&longs;t. </s> | <s>121. &longs;ic ait, Abductio verò e&longs;t tran&longs;itus à propo&longs;ito problemate, vel theo­<lb/>remate ad aliud, quo cognito, aut comparato Propo&longs;itum quoque per&longs;pi­<lb/>cuum e&longs;t. </s> |
| | |
| |
| | |
| ait, hoc, quod e&longs;t in &longs;emicir cu­<lb/>lo triangulum, &c. </s> | ait, hoc, quod e&longs;t in &longs;emicir cu­<lb/>lo triangulum, &c. </s> |
| | |
| <s>alludit ad demon&longs;trationem quandam, quam ip&longs;e infe­<lb/>rius in exemplum adducet, & quæ e&longs;t in 3. Elem. </s> | <s>alludit ad demon&longs;trationem quandam, quam ip&longs;e infe­<lb/>rius in exemplum adducet, & quæ e&longs;t in 3. Elem. |
| | |
| <s>Euclidis 31. in qua talis fi­<lb/>gura proponitur qualis e&longs;t præ&longs;ens, in qua vides triangulum A B C. in &longs;e­<lb/><figure id="fig15"></figure><lb/>micirculo. </s> | Euclidis 31. in qua talis fi­<lb/>gura proponitur qualis e&longs;t præ&longs;ens, in qua vides triangulum A B C. in &longs;e­<lb/><figure id="fig15"></figure><lb/>micirculo. </s> |
| | |
| <s>tunc autem dicitur triangulum in <lb/>&longs;emicirculo, quando ba&longs;is ip&longs;ius e&longs;t diameter <lb/>&longs;emicirculi, & reliqua duo latera ita concur­<lb/>runt &longs;imul in angulum B, vt ip&longs;um paricer in <lb/>circumferentia con&longs;tituant, quibus pr&ecedil;mi&longs;sis <lb/>&longs;ic textum explicaueris: quod enim omne <lb/>triangulum habet tres angulos æquales duo­<lb/>bus rectis angulis præ&longs;ciuit vniuer&longs;aliter per <lb/>32. primi; quod autem hoc particulare triangulum A B C, quod e&longs;t in &longs;e­<lb/>micirculo habeat eandem proprietatem, &longs;imul, ac qui&longs;piam animaduertit <lb/>illud e&longs;&longs;e triangulum cogno&longs;cit, <expan abbr="ab&longs;q;">ab&longs;que</expan> vlla demon&longs;tratione, &longs;ed &longs;olum virtu­<lb/>te illius maioris propo&longs;itionis; omne triangulum habet tres, &c.</s></p><p type="main"> | <s>tunc autem dicitur triangulum in <lb/>&longs;emicirculo, quando ba&longs;is ip&longs;ius e&longs;t diameter <lb/>&longs;emicirculi, & reliqua duo latera ita concur­<lb/>runt &longs;imul in angulum B, vt ip&longs;um paricer in <lb/>circumferentia con&longs;tituant, quibus pr&ecedil;mi&longs;sis <lb/>&longs;ic textum explicaueris: quod enim omne <lb/>triangulum habet tres angulos æquales duo­<lb/>bus rectis angulis præ&longs;ciuit vniuer&longs;aliter per <lb/>32. primi; quod autem hoc particulare triangulum A B C, quod e&longs;t in &longs;e­<lb/>micirculo habeat eandem proprietatem, &longs;imul, ac qui&longs;piam animaduertit <lb/>illud e&longs;&longs;e triangulum cogno&longs;cit, <expan abbr="ab&longs;q;">ab&longs;que</expan> vlla demon&longs;tratione, &longs;ed &longs;olum virtu­<lb/>te illius maioris propo&longs;itionis; omne triangulum habet tres, &c.</s></p><p type="main"> |
| | |
| |
| | |
| <s>Hoc eodem cap. | <s>Hoc eodem cap. |
| | |
| plura dicuntur de Principijs Demon&longs;trationis, &longs;iue &longs;cien­<lb/>tiæ, vt &longs;unt Dignitates, Po&longs;itiones, Definitiones, & &longs;imilia, quæ quo modo <lb/>&longs;e habeant, & quo modo illis Demon&longs;trationes innitantur, optimè ex con­<lb/>templatione primi libri Elem. </s> | plura dicuntur de Principijs Demon&longs;trationis, &longs;iue &longs;cien­<lb/>tiæ, vt &longs;unt Dignitates, Po&longs;itiones, Definitiones, & &longs;imilia, quæ quo modo <lb/>&longs;e habeant, & quo modo illis Demon&longs;trationes innitantur, optimè ex con­<lb/>templatione primi libri Elem. |
| | |
| <s>Euclidis percipi pote&longs;t. </s> | Euclidis percipi pote&longs;t. </s> |
| | |
| <s>vt propterea benè ij <lb/>&longs;entiant, inter quos præcipui &longs;unt Toletus, & Zabarella, qui a&longs;&longs;erunt, Ari&longs;t. <lb/></s> | <s>vt propterea benè ij <lb/>&longs;entiant, inter quos præcipui &longs;unt Toletus, & Zabarella, qui a&longs;&longs;erunt, Ari&longs;t. <lb/></s> |
| | |
![[BACK]](http://archimedes.mpiwg-berlin.mpg.de/arch/img/icons/back.gif){kind=icon}
Return to bianc_locam_01_la_1615.xml
CVS log ![[TXT]](http://archimedes.mpiwg-berlin.mpg.de/arch/img/icons/text.gif){kind=icon}
![[DIR]](http://archimedes.mpiwg-berlin.mpg.de/arch/img/icons/dir.gif){kind=icon}
Up to [CVSROOT] / texts / archimedes / xml