Fabri, Honoré
,
Tractatus physicus de motu locali
,
1646
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<
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id
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N15AC3
">
<
p
id
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N1717C
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type
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main
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<
s
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N17186
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<
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pagenum
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99
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xlink:href
="
026/01/131.jpg
"/>
corpus graue ſuo motu percurrit; </
s
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<
s
id
="
N17193
">& ſecundo tempore æquali BC, quæ
<
lb
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tripla eſt AB, tertio CD quintupla quarto DE ſeptupla, quinto EF
<
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nonecupla; vides primò ſeriem numerorum imparium 1. 3. 5. 7. 9.atque
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ita deinceps. </
s
>
<
s
id
="
N1719D
">Secundò vides ſpatia eſſe in ratione duplicata temporum,
<
lb
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hoc eſt vt temporum quadrata. </
s
>
<
s
id
="
N171A2
">v.g. ſi accipiatur ſpatium AB primo tem
<
lb
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pore peractum, & ſpatium AC duobus temporibus confectum: ratio hu
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ius ad illud eſt vt 4.ad 1.id eſt vt quadratum 2.ad quadratum 1. ſimiliter,
<
lb
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ſi accipiatur ſpatium AD confectum tribus temporibus, erit 9.id eſt qua
<
lb
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dratum 3, ſpatium AE confectum 4.temporibus erit 16.id eſt quadratum
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lb
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4. & AF 25. quadratum 5. </
s
>
</
p
>
<
p
id
="
N171B3
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type
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<
s
id
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N171B5
">Hæc ſententia ingeniosè à Galileo excogitata ex duplici capite à ſuis
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lb
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auctoribus confirmatur; primò experientiâ, ſecundò ratione. </
s
>
<
s
id
="
N171BB
">Experien
<
lb
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tia tribus potiſſimum experimentis fulcitur; primum eſt in motu deor
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lb
/>
ſum per lineam perpendicularem. </
s
>
<
s
id
="
N171C3
">v. g. in linea AF; </
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>
<
s
id
="
N171CB
">nam reuerà multi
<
lb
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ſunt, iique grauiſſimi auctores in rebus tùm philoſophicis, tùm mathe
<
lb
/>
maticis verſatiſſimi, qui ſæpiùs ſenſu ipſo probarunt, repetitis vſque ad
<
lb
/>
nauſeam experimentis, tempore vnius ſecundi minuti corpus graue in
<
lb
/>
libero aëre 12. pedes ſpatij motu naturali deorſum percurrere; in 2.ve
<
lb
/>
rò ſecundis 48. in 3.ſecundis 108.ſed ſpatia iſta ſunt vt temporum qua
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drata, vt conſtat. </
s
>
</
p
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<
p
id
="
N171DB
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type
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main
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<
s
id
="
N171DD
">Secundum experimentum eſt in plano inclinato, in quo corpus graue
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lb
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deſcendit iuxta prædictam progreſſionem, quod expreſſis verbis teſtatur
<
lb
/>
Galileus à ſe fuiſſe probatum ſæpiùs, nec vnquam à vero ne tantillùm
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quidem aberraſſe. </
s
>
<
s
id
="
N171E6
">ſed in perpendiculari deorſum eadem proportione
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lb
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creſcit motus, quâ in plano inclinato; licèt in plano inclinato tardior ſit
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motus, vt demonſtrabimus aliàs. </
s
>
</
p
>
<
p
id
="
N171EE
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type
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">
<
s
id
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N171F0
">Tertium experimentum petitur ex funependulis; </
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>
<
s
id
="
N171F4
">in quibus ſæpiùs
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obſeruatum eſt longitudinem funis, & conſequenter arcum quadrantis
<
lb
/>
longioris funependuli eſſe ad longitudinem, ſeu quadrantem alterius
<
lb
/>
breuioris, vt quadratum temporis, quo perficitur vibratio maioris ad
<
lb
/>
quadratum temporis, quo perficitur vibratio minoris.v.g.ſit longitudo
<
lb
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funependuli maioris, CG minoris verò ſubquadrupla CF; </
s
>
<
s
id
="
N17202
">eleuetur vter
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que funis, cui pondus æquale ſit appenſum vſque ad horizontalem
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lb
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CDE & alterum ex D; </
s
>
<
s
id
="
N1720A
">alterum verò ex E demiſſum cadat deorſum; haud
<
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dubiè funependulum CE duplum temporis collocabit in decurrendo
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quadrante EG, & funependulum ED ſubduplum. </
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>
<
s
id
="
N17212
">v. g. ſi CD conficit
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ſuam vibrationem DF vno ſecundo, EG conficiet ſuam EG duobus, vt
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centies obſeruatum eſt; </
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>
<
s
id
="
N1721E
">ſed EG eſt quadruplus DF, vt patet; igitur EG
<
lb
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& DF ſunt vt quadrata temporum, quibus percurritur EG & DF ſed vt
<
lb
/>
deſcendit graue per DF & EG, ita deſcendit per CF & CG, quippe
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lb
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DF & EG habent rationem plani inclinati deorſum. </
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>
</
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<
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id
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N17228
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main
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<
s
id
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N1722A
">Adde quod, vt ſe habet tempus, quo deſcendit per totum quadrantem
<
lb
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DF, ad tempus, quo deſcendit per totum quadrantem EG. ſic ſe habet
<
lb
/>
tempus, quo deſcendit per arcum DL ſubduplum DF ad tempus, quo
<
lb
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deſcendit per arcum EI ſubduplum EG; </
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>
<
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id
="
N17234
">item tempus, quo deſcendit </
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