54 -. LIS RI\ VII . SE C TIO II.
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MOTV TR1VM
inter nostras cxtrenlaS adhibenda est. Sed aliarum men-surarum ad nostram formam traductio, aliquätö est ope-rosior : nam vt Epicyclorum differentia habeatur, opor-tet ex maxima Tquatione orbis ä cuiusq. tabulis posita,tum ad Apogcum tum ad Perigeum Eccentrici, inuenireper triangulorum analyhm semidiametrum Epicycli ma-ximam uc minimam; Anomalia vero Eccentricitatis exaliorum Eccentricitatibus rrgte deducitur; Si quis ta-
men eam desiderat prope veritatem, fumat totius Eccen-tricitatis apud alios repertas pro I? quidem partem 17.pro Tp Z4. & pro a* 14. eamq. tribuat semidiametro cir-celli Anomalia: Eccentricitatis .
V. Coeteriim vt promptius poffint infrascriptas men-sura: applicari cuiusque forma:, visum est litteris ma-iusculis tanquam characteristicis hypothesium vti, qua-rum Regula post tabulam cum vsu illarum tradentur.
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Scmidtameter Epicycli Mactis Longomontano media est6s497.sed Soleae Macte Apogaio 67961.8c Ferigseo vtföq. 63028. NobisautemSemidia-metee Epicycli Mactis media eft 66057. Sc maxima 70357. 6c minima 61157. l
Regula pro Vfapr »cedentis TabttU .
i. Regula VI. T) TOLEMH hypothesis. Pro Eccentricitatepro Vtole. s. JL -Aequantis, consule leter ani A, pro Eccentncita-m&i hypo. te Deferentis , Uter am B , & pro semidiametro Epicycli li~theß. ter am C. Sed Eccentricitates metire d centro Terra.
z. Regula COPERNICI hypothesis i in Prima forma. Pro Ec-pro Coper- centricitate Deferentis vide literam D pro femidiame-
nici formis tro Epicycli liter am E . In secunda vero forma: pro Ec-s.x.&3. centricitate maxi ma liter am Apro Eccentricitate mini-ma liter am B , pro Eccentricitate media Ut er am D , & prosemidiametro circelli variantis Eccentricitatem liter am E-In tertia denique forma, pro Semidiametro Epicycli ma-ioris vide lit er am D, & pro semidiametro Epicycli minorislitaram E; Sed in prioribus duabus formis metire Eccentri-citates dSole, vel dpunflo circa quod Terra motu annuofingitur moueri circa Solem stantem yln tertia autem con-centrici centrum esto Sol aut punclum pradtclum .
4. Regula LANSBERGII hypothesis. Fide secundam formampro halber copermeanoe■bypQthess: Et Eccentricitates metire d So-fft hypothe- [ e frc.
fi ' Re ula TYCHONIS ’i & LONGOMONTANI Hypothe-tr 'hvf U h ' h'ide tertiam formamCopernicaahypothesis, & con-
Tyehonis centr * c * centrum esto. Sol, fid vniuerfi centrum esto cenrLougo. trumTevrjb. onco* h
montani .' - KEPLERI, & BVLLIALDI Hypothesis. ProEcctn-5 Regula tricitate tota % seu distantia Focorum (eu F mhüicorum Es-
lipfis inter sefe , vide liter am A ■, pro distantia vero centri pro hypttk.Ellipsis ab vtrolibet focorum; liter am B ; pro semidiametro Repit" &autem.maiori Ellipsis , Radium iooooo. GT pro femidia- Bullidit .metro minori Ellipsis liter am E. Sed m altero Focorum^esto Sol vt centrum Fniuerfi immobile ,& abeo metire Ec-centricitates .
BVLLIALDI posterior hypothesis. Pro Eccentricita- (,-ReguI*te tota seu distantia puntli equa litatis d centro vniuerfi, idest p re i.h)p°-Sole vide liter am A , pro, Eccentricitate centri Ellipsis ab thesi Bol-vtrolibet vmbilicorum, lit er am B; pro semidiametro mi- lioldi,nori Ellipsis, liter am E ; pro semidiametro Epicycli sfi El-lipsi m m duos circulos resoluas ) liter am G\ & pro semidia-metro circuli maioris lit er am K ,
NOSTRA Hypothesis^ Pro Eccentricitate Adedia con-sule liter am A, & profemidiametro circelli Anomalis. Ec-centricitatis liter am L , & pro semidiametro Epicycli me-dia liter am C\& pro differentia semidiametri Epicycli cal-cem tabula , v t el monitum positum numero 4. petendo ex ta-bula capitis 11. Aequationes, orbis ',maximas adApogeumEccentrici, & habebis Angulum oppositum semidiametroquasita : Radio autem adde femiffem Eccentricitatis apudalios repertae regione liter a B , & habebis Basim: Ergoiunge fimulLogarithmum pradisli anguli, & Logarithmubasis , drsumma erit Logarithmus Semidiametri Epicycliiti' Apogeo Eccentrici constituti . Rursus ex vltima tabulacapitis \ %.accipe orbis Aequationem maximam in Perigeo,
(Jg, habebis angulum oppositum 3 Radio autem deme [emis-