Clavius, Christoph
,
Geometria practica
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Iſoſcelib{us} duob{us} triangulis datis, quorum
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# baſ{es} inæqual{es} ſint, & duo latera vni{us}
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# duob{us} alteri{us} æqualia: ſuper eiſdem
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# baſib{us} triangula Iſoſcelia ſimilia, &
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# priorib{us} ſimul ſumptis Iſoperim{et}ra
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# conſtituere. # 299
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L.
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LAtera duo trianguli obliquanguli, ex
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# tertio latere, & duob{us} quibuſuis an-
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# gulis, inuenire. # 46
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Latera tria in quadrilatero maiora ſunt
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# quarto latere. # 344
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Lateris trianguli obliquanguli ſegmenta
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# à perpendicularifacta, ex datis trib{us}
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# laterib{us} cognoſcere. # 46
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Laterum proportion{es} ex datis angulis cu-
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# iuſuis trianguli patefacere. # 44
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Lat{us} figuræ regularis, quo pacto ex ei{us}
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# area deprehendatur. # 181
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Lat{us} figuræ regularis quo pacto ex ſemi-
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# diam{et}ro circuli circumſcripti cogno-
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# ſcatur. # 178
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Lat{us} polygoni propoſiti quo pacto in dato
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# circulo per inſtrumentum partium in-
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# ueniatur. # 11
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Lat{us} quadratricis æquale eſt quadranti
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# circuli, cui{us} ſemidiameter est baſis
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# quadratricis. # 326
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Lat{us} trianguli rectanguli, ex baſe, & al-
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# terutro angulorum acutorum, notum
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# efficere. # 45
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Lat{us} trianguli rectanguli, ex baſe, & alte-
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# ro cognoſcere. # 45
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Lat{us} trianguli rectanguli ex altero latere
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# & alterutro angulo acuto eruere. # 45
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Lat{us} trianguli obliquanguli ex duob{us}
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# laterib{us}, & angulo ab ipſis comprehen-
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# ſo colligere. # 47
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Lat{us} trianguli obliquanguli ex duob{us}
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# reliquis laterib{us}, & duob{us} quibuſuis
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# angulis, addiſcere. # 47
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Lat{us} trianguli obliquanguli ex duob{us}
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# laterib{us}, & angulo vni eorum oppoſito,
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# (ſi modo conſtet ſpeci{es} anguli alteri la-
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# teri dato oppoſiti, quando dat{us} angul{us}
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# acut{us} est) exquirere. # 48
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Lenticularis figuræ area. # 200
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Librare ſpatium terræ inæquale, pro ducen-
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# dis aquis: aut {et}iam, ſi lubet, Horizonti
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# æquidiſtans efficere. # 153
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Linea recta 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 inſtrumenti par-
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# tium cognoſcere. # 6
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Linea recta in quotuis part{es} æqual{es} diui-
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# ſa, quot decimæ, vel centeſimæ, & c. in
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# quauis particula vni{us} partis contineã-
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# tur, per circinum deprehendere. # 42
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Lineæ ſuperfici{es}, ac ſolida, pen{es} quid men-
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# ſurentur. # 157
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Lineæ rectæ ſub dimenſionem cadent{es} quæ
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# ſint. # 51
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Lineæ duæ, vna recta, & altera inflexa,
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# nunquam concurrent{es}, lic{et} in infini-
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# tum producantur, & ſemper magis vna
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# ad alteram acced{at}. # 270
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Lineam quadratricem deſcribere. # 320
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Lineam rectam, ad cui{us} extrema accede-
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# re non liceat, dummodo ea appareant,
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# & ipſa linea recta producta ad ped{es}
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# menſoris pertingat, ex altitudine aliquæ
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# nota, per quadrantem metiri. # 68
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Lineam rectam in Horizonte inter turrim
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# aliquam, & aliud quodpiam ſignum, ex
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# turri per du{as} ſtation{es} in faſtigio fact{as},
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# vel in duab{us} feneſtris, quarum vna ad
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# perpendiculum ſit ſub alia, quando ſpæ
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-
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# tium inter ill{as} feneſtr{as} notum eſt, et-
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# iam ſi toti{us} turris altitudo ſit ignota, per
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# quadrantem dimetiri. Atque hinc obi-
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# ter altitudinem turris patefacere. # 70
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Lineam rectam datam per inſtrumentum
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# partiũ diuidere, vt alia recta diuiſa eſt. # 12
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Lineam rectam 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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Lineam rectam in Horizonte per quadra-
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# tum metiri, quando menſor in vno ei{us}
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# extremo exiſtens alterum extremum
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# videre non potest, neque altitudo in
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# promptu est, ſed ſolum ad dextram, vel
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# ſiniſtram per lineam </
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