Alvarus, Thomas
,
Liber de triplici motu
,
1509
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Primi partis
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ex quarta ſuppoſitiõe huius. </
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<
s
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xml:space
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">Et ſic patet concluſio.
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xml:space
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">3. correĺ.</
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xml:space
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">¶ Ex quo ſequitur / vbi aliqua potentia inuaria-
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ta vniformiter continuo remittit motum ſuum .etc̈.
<
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/>
potentia ei equalis idem medium inuariatū tran-
<
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ſeundo valet vniformiter continuo motum ſuum re
<
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mittere per ſui continuam intēſionem. </
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<
s
xml:id
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xml:space
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">Probatur /
<
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ſit b. potena que inuariata totnm c. medii tran-
<
lb
/>
ſeundo vniformiter continuo valet motum ſuū re-
<
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/>
mittere: ſit a. potentia equalis que ponatur ad
<
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/>
punctum initiatiuū vltime quarte magis reſiſten-
<
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/>
tis b. potētia poſita in extremo remiſſiori c. medii /
<
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/>
et manifeſtum eſt / proportio b. ad punctuꝫ in quo
<
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/>
ponitur eſt dupla ad proportionem a. ad punctum
<
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/>
in quo ponitur: incipiant igtur in eodem inſtãti ab
<
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/>
illis punctis continuo moueri a: et b. b potentia cõ-
<
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tinuo in duplo velociꝰ ipſa a. ponã. </
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>
<
s
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xml:space
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poña illã vltimã quartã trãſeundo (quã īuariatã b.
<
lb
/>
potentia inuariata tranſeundo vniformiter contic
<
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/>
nuo remittit motum ſuum) vniformiter cõtinuo re-
<
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mittit motum ſuum per ſue potentie coutinuã intē-
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ſionem. </
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<
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nuo vniformiter remittit motum ſuum / vt conſtat: et
<
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hoc continuo inteudendo potentiam ſuam: igitur
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propoſitum. </
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<
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xml:space
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">Probatur minor: quia ſi ipſa poten-
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tia a. per aliquod tempus ſtat inuariata aut remit
<
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/>
tit potentiam ſuam, ſignetur illud tempus, et ſit g.
<
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/>
in quo b. potentia tranſeat .ef. partem adequate:
<
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/>
et in eodem g. tempore a potentia pertrãſeat d. par
<
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/>
tem adequate: et cõſtat / ipſius .ef. partis ad d. par-
<
lb
/>
tem eſſe duplam proportionem / et ptꝫ ex hypotheſi:
<
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quo poſito arguitur ſic / latitudinis motus deperdi
<
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/>
te ab ipſa potentia b. tranſeundo .ef. partem ad la
<
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/>
titudinem motus deperditam ab eadem potentia
<
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/>
b. tranſeundo d. partem adequate non eſt propor-
<
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tio dupla: igitur latitudinis motus deperdite ab
<
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/>
ipſa b. potentia tranſeundo .ef. partem in g. tempo
<
lb
/>
re adequate ad latitudinem deperditam ab a. po-
<
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/>
tentia tranſeundo d. partem in g. tempore adequa
<
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/>
te non eſt proportio dupla: ſed conſequens eſt fal-
<
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ſum: igitur illud ex quo ſequitur. </
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">Conſequentia ptꝫ
<
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cum falſitate conſequentis ex ſuperius dictis: et ar
<
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/>
guitur antecedens quia ipſius .ef. partis ad ipſam
<
lb
/>
d. partem eſt proportio dupla: et quamlibet parteꝫ
<
lb
/>
exceſſus minorē ipſa d. parte quo exceſſu .ef. pars
<
lb
/>
excedit d. partem tranſeundo b. potentia mouetur
<
lb
/>
cum minori reſiſtentia quam equalem partem ipſi
<
lb
/>
us d. partis tranſeundo: quoniam quelibet pars
<
lb
/>
illius exceſſus: īmo tota .ef. pars minus reſiſtit quã
<
lb
/>
ipſa d. pars: igitur latitudinis motus deꝑerdite a
<
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/>
b. potentia tranſeundo .ef. partem in g. tēpore ade
<
lb
/>
quate ad latitudinem motus deperditã ab eadem
<
lb
/>
potentia b. tranſeundo d. partem non eſt propor-
<
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tio dupla. </
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">Et ſic ptꝫ correlariū. </
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">¶ Patet etiã quibꝰ
<
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modis poña equalis potētie remittēti motū ſuū cõ
<
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/>
tinuo vniformiter īuariatū mediū trãſeundo valet
<
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motū ſuū remittere.
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miter medio īuariato remittēte cõtinuo motū ſuū,
<
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valeat equalis poña cõtinuo vniformiter remitte-
<
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/>
re motū ſuū, aliqñ ītendendo poñam, aliqñ vero re
<
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mittendo: tu ipſe inq̇ras. </
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">Et ſi em̄ michi id īpoſſibi
<
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le eſſe appareat nichilominus demõſtratio efficax
<
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non occurrit.</
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<
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">Ubi aliqua potētia
<
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/>
īuariata mediū īuariatū tranſeundo cõtinuo vni-
<
lb
/>
formiter remittit motū ſuū: aliqua maior valet cõ-
<
lb
/>
tinuo vniformiter: et eque velociter cū eadē motum
<
lb
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ſuū remittere per ſui continuã intenſionē. </
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<
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">Proba-
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tur / ſit b. potentia que īuariata c. mediū inuariatū
<
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Capitulū octauū.
"/>
trãſeundo cõtinuo vniformiter remittit motū ſuuꝫ
<
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/>
ſit a. potentia maior que ad aliquē punctū intrī-
<
lb
/>
ſecū ipſius c. medii habeat equalē proportionē illi
<
lb
/>
ꝓportioni quã habet b. potentia ad punctū initia-
<
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/>
tiuū c. medii in extremo remiſſiori: et moueãtur ille
<
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potentie cõtinuo ab eadē ꝓportione: et tunc dico /
<
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/>
ipſa a. potentia cõtinuo vniformiter et eque veloci-
<
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/>
ter cū b. potentia remittit motū ſuū illam partē c.
<
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/>
medii tranſeundo que intercipitur inter punctū ter
<
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/>
minatiuū c. medii in extremo intenſiori et punctum
<
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a quo incipit ipſa a. potentia moueri. </
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">Quod ſic ꝓ-
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batur / q2 a. potentia continuo vniformiter motum
<
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ſuū: et continuo eque velociter remittit ſicut b. potē
<
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tia tranſeundo illam partē c. medii que ſignatur in
<
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hypotheſi. </
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<
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">Et cõtinuo intendit potentiã ſuã: igitur
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ꝓpoſitū. </
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<
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<
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eſt equalis motui ipſiꝰ b. ex hypotheſi: et b. cõtinuo
<
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vniformiter remittit motū ſuū datã partē c. medii
<
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/>
quã etiã pertranſit a. trãſeuudo: igitur a. continuo
<
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/>
vniformiter et eque velociter remittit motū ſuū cuꝫ
<
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ipſa b. potentia tranſeundo datam partē c. medii.
<
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</
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<
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lia demas remanētia ſunt equalia. </
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<
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">Et demo rema
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nentes motus a. motibus deperditis. </
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<
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">Iam ꝓbatur
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minor: quoniã ſi per aliquod tēpus a. potentia ſtat
<
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inuariata, aut remittit potentiã ſuã: ſignetur illud
<
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et ſit g. in quo b. potentia pertranſeat adequate d.
<
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partē c. medii et a. potentia in eodē g. tēporē pertrã
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ſeat e. partē adequate. </
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<
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xml:id
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xml:space
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">Et manifeſtū eſt / ipſius e.
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ad d. eſt ꝓportio equalitatis / vt patet ex hypotheſi
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</
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<
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N189F6
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">Quo poſito arguitur ſic / latitudinis motus deper
<
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dite ab ipſa b. potentia tranſeundo e. partē ad la-
<
lb
/>
titudinē motus deperditam ab eadem b. potentia
<
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/>
tranſeundo d. partem in g. tēpore adequate non eſt
<
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/>
ꝓportio equalitatis: igitur latitudinis motus de-
<
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/>
perdite ab a. poteutia ſtante aut remittente poten
<
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/>
tiam ſuã tranſeundo e. partē in g. tēpore adequate
<
lb
/>
ad latitudinē motus deperditã a b. potentia tran-
<
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/>
ſeundo d. partē in eodem g. tēpore adequate nõ eſt
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proportio equalitatis. </
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<
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">Conſequens eſt falſum: vt
<
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patet ex probatione maioris: igitur illud ex quo
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ſequitur. </
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<
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">Conſequentia patet per locum a maiori
<
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auxiliante quarto argumento ſexti capitis huius
<
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tractatus: vbi habetur / omnes potentie inuari-
<
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ate idem medium inuariatum tranſeuntes .etc̈. </
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>
<
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N18A1B
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xml:space
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">An-
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tecedens autem patet manifeſte ex ſecunda ſuppo-
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ſitione huius capitis: hoc addito / e. pars magis
<
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/>
reſiſtit ꝙ̄ d. quia a. continuo mouetur in parte ma-
<
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/>
gis reſiſtente ex hypotheſi. </
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<
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xml:id
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N18A26
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xml:space
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preserve
">Et ſic patet concluſio.</
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</
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<
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xml:id
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N18A2A
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xml:space
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">¶ Ex quo ſequitur / vbi aliqua potentia non va-
<
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riata continuo vniformiter remittit motum ſuum
<
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/>
ad non gradum medium inuariatum tranſeundo:
<
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/>
omnis potentia maior per ſui continuam intenſi-
<
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/>
onem idem medium inuariatum tranſeundo valet
<
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/>
motum ſuum continuo vniformiter remittere. </
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<
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xml:id
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N18A37
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xml:space
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">Et
<
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hoc continuo ꝙ̄ data potentia inuariata velocius
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remittendo. </
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">Prima pars huius correlarii eſt pri-
<
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mum correlarium prime concluſionis huius capi-
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tis. </
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<
s
xml:id
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N18A45
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xml:space
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">Et ſecunda probatur: ſuppoſſto hypotheſi pre
<
lb
/>
dicti correlarii videlicet / a. potentia maior ipſa
<
lb
/>
b. potentia continuo moueatur velocius in h. pro-
<
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/>
portione ꝙ̄ eadem b. potentia. </
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<
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xml:id
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N18A4E
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xml:space
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preserve
">Et tunc dico / a. po
<
lb
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tentia continuo velocius remittit motum ſuum ̄
<
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/>
ipſa b. potentia. </
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<
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N18A55
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xml:space
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">Quod ſic probatur: quia a. potē-
<
lb
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tia continuo velocius in h. ꝓportione remittit mo
<
lb
/>
tum ſuū ꝙ̄ b. / igitur continuo velocius remittit mo-
<
lb
/>
tum ſuū ꝙ̄ b. ↄ̨ña patet. </
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>
<
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xml:id
="
N18A5E
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xml:space
="
preserve
">Et probatur añs / q2 motus
<
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b. et a. continuo remittuntur cõtinuo ſe habentes </
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>
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