Clavius, Christoph
,
Geometria practica
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Tertia & quarta proportionalis, quo pacto
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# per inſtrumentum partium reperiatur. # 12
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Trabis longitudinem ad Horizontẽ incli-
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# natæ, cui{us} portio ſuperior tantum con-
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# ſpiciatur, vnà cum angulo inclinatio-
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# nis, diſt antia baſis à menſore, & altitu-
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# dine faſtigii ſupra Horizontem, per qua-
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# dratum m{et}iri. # 151
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Trapezii habentis duo latera parallela,
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# area. # 170
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Trapezii irregularis facilis dimenſio. # 175
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Triangis
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la duo Iſoſcelia ſimilia baſium in-
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# æqualium, ſimul maiora ſunt duob{us}
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# Iſoſcelib{us} ſimul ſuper eaſdem baſ{es}, quæ
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# quidem inter ſe ſint diſſimilia, priorib{us}
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# verò Iſoperimetra. habeant quatuor
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# latera inter ſe æqualia. # 300
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Trianguli Iſoſcelis area. # 165
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Trianguli obliquanguli area. # 168
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Trianguli rectanguli area, ex vno latere
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# circa angulum rectum, & latere, quod
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# recto angulo opponitur. # 167
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Trianguli pulchra propriet{as}, ſi in eo du-
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# catur vni lateri parallela, &c. # 261
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Triangulis duob{us} Iſoſcelib{us} datis, quo-
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# rum baſ{es} ſint inæqual{es}, & duo latera
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# vni{us} duob{us} alteri{us} æqualia: ſuper eiſ-
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# dem baſib{us} duo triangula Iſoſcelia ſi-
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# milia, & priorib{us} ſimul ſumptis Iſope-
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# rimetra conſtituere. # 299
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Trianguli æquilateri area. # 166
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Trianguli cui{us}libet area cui rectangulo
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# ſit æqualis. # 292
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Trianguli rectanguli area. # 165
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Trianguli rectãguli area, ex vno latere cir-
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# ca angulũ rectũ, & vno angulo acuto. # 169
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Trianguli rectãguli area, ex latere, ꝙ recto
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# angulo opponitur, & vno angulo acuto. # 167
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Trianguli inſignis propriet{as}, ſi in eo à duo-
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# b{us} angulis ad media puncta oppoſitorum
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# laterum rectæ ducantur, &c. # 252
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Triangulo duorum laterum inæqualium
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# ſupra tertium lat{us} triangulum conſti-
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# tuere priori Iſoperimetrum duorum æ-
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# qualium laterum. # 297
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Triangulo parallelogr ammum æquale, &
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# Iſoperimetrum conſtituere. # 214
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Triangulorum rectilineorum rectangulo-
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# rum problemata. # 44
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Triangulorum duorum rectangulorum ſi-
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# milium propriet{as} quædam. # 298
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Triangulorum Iſoperimetrorum eandem
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# habentium baſem, mai{us} erit illud, quod
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# duo latera habet æqualia. # 297
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Triangulorum rectilineorum obliquangu-
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# lorum problemata. # 46
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Triangulum datũ ex dato puncto in latere
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# in quotlibet part{es} æqual{es} diuidere. # 262
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Triangulum datum per line{as} vni lateri
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# parallel{as} in quotlibet part{es} æqual{es} di-
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# ſtribuere. # 263
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Triangulum datum per rectum ex puncto
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# extra triangulum dato in du{as} part{es} æ-
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# qual{es} partiri. # 264
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Triangulum totum ad triangulum abſciſ-
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# ſum per rectam, eſt, vt rectangulum ſub
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# duob{us} laterib{us} ſectis ad rectangulum
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# ſub duob{us} laterib{us} trianguli abſcißi
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# comprehenſum. # 262
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Tritici aceru{us}, quo pacto menſuretur. # 209
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Tritici ſacc{us}, quo pacto menſuretur. # 209
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Turris, aut montis altitudinẽ, ex ei{us} ſum-
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# mitate per quadratũ dimetiri, quando in
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# plano ſummitatis Horizonti æquidiſt ante
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# duæ ſtation{es} fieri poſſunt, & ſignum ali-
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# quod in Horizonte cernitur. # 114
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Turris, aut alteri{us} rei altitudinem per ba-
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# culum indagare. # 137
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Turris aut alteri{us} rei altitudinem, per
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# Normam inueſtigare. # 139
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Turris, vel montis altitudinẽ ex ei{us} ſum-
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# mitate per du{as} ſtation{es} in haſta aliqua
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# erecta fact{as} inueſtigare per quadratũ,
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# quando ſignum aliquod in Horizonte
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# videri poteſt. # 116
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Turris altitudinem ex ei{us} vertice per vn@-
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# cam ſt ationem per quadrantem metiri,
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# ſi diſtantia ſigni in Horizonte viſi vſque
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# ad baſem turris nota ſit. # 64
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Turris, vel montis altitudinẽ, ex ei{us} ſum-
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# mitate per vnicam ſtationem, ope qua-
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# drati ſtabilis m{et}iri, vnà cum diſtantia,
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# ſigni viſi in Horizonte vſ ad turrem
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# vel @@ontis perpendiculum. # </
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