Clavius, Christoph
,
Geometria practica
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# cuti ad ei{us} partem dicto ſegmento la-
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# teris oppoſitam. # 295
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Recta linea diuiſa in quotuis part{es} æqua-
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# l{es}, quot eiuſmodi part{es} in quauis alia
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# recta contineantur, ope inſtrumẽti par-
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# tium, cognoſcere. # 6
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Recta data, quamuis minima, partem, vel
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# part{es} imperat{as} ex ea auferre. # 355
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Recta connectens duos angulos oppoſitos in
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# duob{us} triangulis æqualib{us} lat{us} com-
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# mune habentib{us}, & in diuer ſ{as} part{es}
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# vergentib{us}, à communi latere bifari-
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# am diuiditur. # 260
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Recta cuiuis circũferentiæ æqualis, quo pa-
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# cto facile reperiatur ex ꝓpria figura. # 327
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Rectæ duæ tangent{es} circulum, & in vno
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# puncto coeunt{es}, maior{es} ſunt omnib{us}
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# chordis interceptum arcum diuidenti-
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# b{us} in quotcunque part{es} æqual{es}. # 332
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Rectæ lineæ adiungere rectam, ita vt qua-
<
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# dratum toti{us} compoſitæ æquale ſit qua-
<
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# dato rectæ adiunctæ, vna cum quadra-
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# torectæ, quæ ex adiuncta, & proxi@o ſe-
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# gmento prioris lineæ conflatur. # 351
<
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Rectæ tr{es} circulum tangent{es}, & in duo-
<
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# b{us} punctis coeunt{es}, maior{es} ſuntomni-
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# b{us} chordis arc{us} duos interceptos in
<
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# part{es} æqual{es} ſecantib{us}. # 332
<
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Rectæ lineæ circumferentiam æqualem re-
<
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# perire. # 329
<
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Rectæ quamuis minimæ exhibere multi-
<
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# plicem quamcunque, etiamſi circino i-
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# pſa non accipiatur. # 355
<
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Rectæ lineæ ſub dimenſionem cadent{es} quæ
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# ſint. # 51
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Rectam lineã tranſuerſam in Horizonte,
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# cui{us} vtrum extremũ inſpici poteſt,
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# per quadrantem notam efficere. # 69
<
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Rectam linem tranſuerſam in Horizon-
<
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# te, cui{us} vtrum extremum videri po-
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# teſt, per quadratum metiri. # 127
<
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Rectam lineam ad cui{us} extrema accede-
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# re non liceat, dummodo ea appareant,
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# & ipſarecta linea producta ad ped{es} mẽ-
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# ſoris perting at, ex altitudine aliqua no-
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# ta, per quadratem metiri. # 69
<
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Rectam lineam in Horizonte per quadra-
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# tum m{et}iri, quando menſor in vno ei{us}
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# extremo exiſtens alterum extremũ vi@
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# dere non poteſt neque altitudo in prom-
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# ptu eſt, ſed ſolum ad dextram, vel ſi-
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# niſtram per lineam perpendicularem
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# recedere poteſt ad locum, è quo alterum
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# extremum appareat. # 121
<
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Rectam lineam, quando menſor in vno e-
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# i{us}extremo, vel in aliquo altitudine no-
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# ta ad planum, in quo eſt recta, perpen-
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# diculari exiſtens alterum extremũ vi-
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# dere poteſt, per quadrantem metiri. # 68
<
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Rectam lineam è directo menſoris poſitam,
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# cui{us} vtrum extremum, vel alterum
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# non appareat, niſi ad dextram, vel ſini-
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# ſtram menſor accedat, per quadrantem
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# comprehendere. # 71
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Rectam lineam in Horizonte è directo mẽ-
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# ſoris iacentem, per quadratum cogno-
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# ſcere, ad cui{us} extremane accedere li-
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# ceat, neque è loco menſoris eam dim{et}i-
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# ri: dummodo ad dextram, vel ſin@ſtrã
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# per lineam perpendicularem ad locum
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# aliquemire poſſit menſor, ex quo vtrũ-
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# que extremum appareat. # 122
<
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Rectam lineam in Horizonte inter turrim
<
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# aliquam, & aliud quodpiam ſignum,
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# ex turri per du{as} ſtation{es}in faſtigio fa-
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# ct{as}, vel in duab{us} feneſtris, quarum
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# vna ſit ad perpendiculũ ſub alia, quan-
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# do ſpatium inter ill{as} feneſtr{as} notum
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# eſt, etiamſi toti{us} turris altitudo ſit igno
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# ta, per quadr antem dimetiri. Atque
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# hinc obiter altitudinem turris patefa-
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# cere. # 70
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Rectã arcui quadrãtisæ qualẽreperire. # 325
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Rectam lineam datã per inſtrum entũ par-
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# tium diuidere, vt alia recta diuiſa eſt. # 11
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Rectanguli trianguli area, ex latere, quod
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# recto angulo opponitur, & vno angulo
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# acuto. # 167
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Rectanguli trianguli area, ex vno latere
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# circa angulum rectum, & vno angulo
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# acuto. # 168
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Rectangulorum duorum triangulorum ſi-
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# m@lium propriet{as} qu@dam. # 398
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Rectanguli trianguli area, ex vno </
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