vol. I pars III
vol. I pars III vol. I pars III
Con tr adic ti on um Arith4&Geomctf3e,non tnfit caufa trafcendendi degenerein gen 5 legasofnoea, qug copiofc in hoc propofito colligit Auerr. in qu^fito.f.vbi ait, tales propo nes no effe vniuocas q cotinuo GC difcreto coueniunt, licet pox ftea analogice contrahantur, vt cudicimus,fiab£qualibus,nux merisvellineis,£qualia demas, qua: remanent funt equalia. Ad hgc et pertinet id qcJ dicit.i. Pox fte.c.74.fed redeamus vndedix gresfi fumus.ad quintam coftrx * matione diceremq>naturalisfi tranfcenditad perfpedtiuum in quffitodelridejhoccotingit,in eo cafu, cum differetia modi co fiderandi, na de Iride, naturalis cognofcitquod eft, perfpe(fdu 9 vero dat propter quid,ita no eft ide modus &C ratio, pariter chix rurgusno facit tranfitu ad Geo metriam invulneribuscirculax t jbus qm chirurg 9 cognofcit de iJlisA^ulnehbus q> tardefananr, fed Cieometra ex fuis principles dathuiusquaeficicaufamc\lpp quid,id aut non eft tranfccderej fed fubalternari, non q?chirurx gia fit fimpJV fubalternata Geo/metriae, nei-p naturalis fcta per^ fpectiue., fed habent partictilare fubalternationefiueordinejquo adeaqfita,qfi!ntillisc6ia« Cii vero in fexta rone dr, q> ide qfi' tu vr coe Naturali dC Math.qrn Vterqjdignofcit accidctia Solis ££ Lunar, ibi folb hr manifefta, qphgcnoeaderoneconfideranx tur,na naturalis huius cofiderat cfi tranfmutarione/^matei-ia, Mathematic p verovtabillisabx' ftrahunt, Vnde Auer, i.Pofte.c« fp.inquit Phyficus confiderat cceli figura et ee Aftrologusr fed Phyficus eanofcit vticcelu eft finis naturg: Aftrologus vero vt eft a' materia immunis. poftrex mo r.d vltimam rone dicas,licet Logicus S>C Meth.probent prin>» cipia oium fciaru,non ex hoc m fieri trafitu, Na tranfitus eft inx ordinatus motus ronis abvno genere difparato ad aliud, in cjx bus, no eft ordo,vt,v.g«fi proce das a numero adlineas, cu inter hare non fit ordo neceffarius,ob id dr tranfgrelTus: no aut fie res fehabet infcietijsproprijsafce^ detibus, ad coes, qm a proprio ad c5e eft ordo neceflarius,aue ad minus vnlis,itenon eft trafi' tus dum particularis ars dat pir cipia artis coisfub qua cotine^ tur,vtfacitPhyiica d^Mathe* matica qdantprincipia Metax phyficorna Phy licus dat illi fub ftatias abftra
SolutTomitani & Ens vt Ens, Sf itaione obi etfti propria in commune*Item eat dieiturfcIacommunis.Dialedi vna fpeciali & propria fcia ad ea vero &ipfa cofiderat vniuer aliaferimurfifubalterng fuerit, fum Ens,quatenus fub difputax yel (i duae fciae fuerint gtes eiuf> tionecadit, (non.n* hie per diax kcticamLogicamltelligas, fed cam Logicae partem,quae difpu tat dC difputado folamvictoria. demfacuJtatiscomuniSjVtMex dicinae pars quae docet purgare & ilia que/docel alere xgrotanx tes, Addeetiam interdu tranfc^ fibi pro fine.pponit, vtdicitur dere difparatas artes in aliquo i.Pofte,co.S4.) dC iccirco ambf fpeciali theoremate,fed cu diftc funt fcif comunes, applicabiles rentia modi confiderandi, vt in iingulis ali)SjOrdine exiftente in cafu de Iride y 6C de vulneribus ter illas, 8C ob id non efficit tra circularibus dicftum fuit, vbi in fitus, quern Arift.demoltf, Dit ynoconcurritPhyficus & Perx 1 ferunt vero illae facultates inter fpe
- Page 692 and 693: G opinionem,fiquidem habitude' fini
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Con tr adic ti on um<br />
Arith4&Geomctf3e,non tnfit<br />
caufa trafcendendi degenerein<br />
gen 5 legasofnoea, qug copiofc<br />
in hoc propofito colligit Auerr.<br />
in qu^fito.f.vbi ait, tales propo<br />
nes no effe vniuocas q cotinuo<br />
GC difcreto coueniunt, licet pox<br />
ftea analogice contrahantur, vt<br />
cudicimus,fiab£qualibus,nux<br />
merisvellineis,£qualia demas,<br />
qua: remanent funt equalia. Ad<br />
hgc et pertinet id qcJ dicit.i. Pox<br />
fte.c.74.fed redeamus vndedix<br />
gresfi fumus.ad quintam coftrx<br />
* matione diceremq>naturalisfi<br />
tranfcenditad perfpedtiuum in<br />
quffitodelridejhoccotingit,in<br />
eo cafu, cum differetia modi co<br />
fiderandi, na de Iride, naturalis<br />
cognofcitquod eft, perfpe(fdu 9<br />
vero dat propter quid,ita no eft<br />
ide modus &C ratio, pariter chix<br />
rurgusno facit tranfitu ad Geo<br />
metriam invulneribuscirculax<br />
t jbus qm chirurg 9 cognofcit de<br />
iJlisA^ulnehbus q> tardefananr,<br />
fed Cieometra ex fuis principles<br />
dathuiusquaeficicaufamc\lpp<br />
quid,id aut non eft tranfccderej<br />
fed fubalternari, non q?chirurx<br />
gia fit fimpJV fubalternata Geo/metriae,<br />
nei-p naturalis fcta per^<br />
fpectiue., fed habent partictilare<br />
fubalternationefiueordinejquo<br />
adeaqfita,qfi!ntillisc6ia« Cii<br />
vero in fexta rone dr, q> ide qfi'<br />
tu vr coe Naturali dC Math.qrn<br />
Vterqjdignofcit accidctia Solis<br />
££ Lunar, ibi folb hr manifefta,<br />
qphgcnoeaderoneconfideranx<br />
tur,na naturalis huius cofiderat<br />
cfi tranfmutarione/^matei-ia,<br />
Mathematic p verovtabillisabx'<br />
ftrahunt, Vnde Auer, i.Pofte.c«<br />
fp.inquit Phyficus confiderat<br />
cceli figura et ee Aftrologusr fed<br />
Phyficus eanofcit vticcelu eft<br />
finis naturg: Aftrologus vero vt<br />
eft a' materia immunis. poftrex<br />
mo r.d vltimam rone dicas,licet<br />
Logicus S>C Meth.probent prin>»<br />
cipia oium fciaru,non ex hoc m<br />
fieri trafitu, Na tranfitus eft inx<br />
ordinatus motus ronis abvno<br />
genere difparato ad aliud, in cjx<br />
bus, no eft ordo,vt,v.g«fi proce<br />
das a numero adlineas, cu inter<br />
hare non fit ordo neceffarius,ob<br />
id dr tranfgrelTus: no aut fie res<br />
fehabet infcietijsproprijsafce^<br />
detibus, ad coes, qm a proprio<br />
ad c5e eft ordo neceflarius,aue<br />
ad minus vnlis,itenon eft trafi'<br />
tus dum particularis ars dat pir<br />
cipia artis coisfub qua cotine^<br />
tur,vtfacitPhyiica d^Mathe*<br />
matica qdantprincipia Metax<br />
phyficorna Phy licus dat illi fub<br />
ftatias abftra