Theodosius <Bithynius>; Clavius, Christoph
,
Theodosii Tripolitae Sphaericorum libri tres
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_
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B,_ verò maior quàm _
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C;_ </
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B,
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E,_ æquales Item _
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H,_ minor quàm _
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I;_ </
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H_
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_
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K,_ æquales. </
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tertij.</
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pothcſi, erit quoque arcus _
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A,_ omnium maximus, & </
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D,_ minimus: </
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B,_ mater,
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quàm _
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C;_ </
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H,_ minor quàm _
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I:_ </
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B,
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E,_ nec non _
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H,
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K,_ æqua-
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les inter ſe. </
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">_PERSPICVVM_ autem eſt in proximis duobus theorematibus arcus ſingulorũ
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ex
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, ductos non debere eſſe maiores ſemicirculo: </
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maiores arcus, & </
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circulum tangat, alium vero ei parallelum ſecet,
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poſitum inter ſphæræ centrum, & </
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<
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">eum circulum,
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quem tangit maximus circulus, polus autem maxi
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mi circuli fuerit inter vtrumque parallelorum, de-
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ſcribanturque maximi circuli tangentes duorum
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parallelorum maiorem: </
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ad maximum circulum, & </
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">eorum rectiſſimus qui-
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dem eritille, cuius contactus erit in eo puncto, in
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quo maius ſegmentum paralleli maioris bifariam
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diuiditur; </
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tus, cuius contactus eritin eo puncto, in quo mi-
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nus ſegmentum bifariã diuiditur; </
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tem illi quidem, quiæqualiter diſtant ab alterutro
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eorum punctorum, in quibus fegmenta bifariam
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ſecantur, ſunt ſimiliter inclinati: </
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ctum remotiorem habet à puncto, in quo maius
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ſegmentum bifariam ſecatur, inclinatior perpetuo
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eſt, quam qui contactum eidem puncto propio-
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rem habet. </
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erunt in vno circulo, qui & </
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