Clavius, Christoph
,
Geometria practica
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# nota eſt, ne{q́ue} è directo ipſi{us} duæ ſtatio-
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# n{es} in plano fieri poſſunt, neque denique
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# baſis appar{et}, per quadrantem notam
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# reddere. Atque hinc obiter ipſam quo
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# diſtantiam elicere. # 73
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Inacceſſibilem altitudinem beneficio ſpecu-
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# li plani, vnà cum ſpeculi diſtantia tam
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# à baſe, {et}iam non viſa, quam à cacumi-
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# ne altitudinis cognoſcere. # 145
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Inacceſſibilem diſtantiã per quadrantem
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# tam pendulum, quam ſtabilem m{et}iri,
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# quando in ei{us} extremo erecta eſt alti-
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# tudo perpẽdicularis, etiamſi infimũ ei{us}
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# extremum non cernatur. At hinc alti-
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# tudinem quo ipſam elicere. # 52. & 55
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Incidentiæ angul{us} cur angulo reflexionis
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# ſit æqualis. # 341
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Inſtrumenta menſurandi varia. # 51
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Inſtrumenti, quod Italis Squadra zoppa
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# dicitur, conſtructio, & vſ{us}. # 150
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Inſtrumentum partium quid, & quo pacto
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# conſtruatur. # 3. & 4
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Inſtrumentum partium quo pacto aliter
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# conſtruatur. # 13
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Inſtrumentum pro librationib{us} aptiſſi-
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# mum. # 153
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Interuallum, ad cui{us} extrema accedere
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# non liceat, dummodo ea appareant &
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# ipſum interuallum productum ad ped{es}
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# menſoris pertingat, ex altitudine aliqua
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# nota, per quadrantem m{et}iri. # 68
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Interuallum è directo menſoris poſitum cu-
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# i{us} vtrumque extremum, vel alterum
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# non appareat, niſi menſor ad dextram,
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# vel ſiniſtram accedat, per quadrantem
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# comprehendere. # 71
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Interuallũ in Horizonte inter turrim ali-
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# quam, & aliud quodpiam ſignum, ex
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# turri per du{as} ſtation{es} in faſtigio fa-
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# ct{as}, vel in duab{us} feneſtris, quarũ vna
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# ſit ad perpendiculum ſub alia, quando
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# ſpatium inter ill{as} feneſtr{as} notum est,
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# {et}iamſi toti{us} turris altitudo ignota ſit,
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# per quadrantem dim{et}iri. Atque hinc
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# obiter altitudinem turris patefacere. # 70
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Interuallũ in Horizonte, inter menſorem,
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# & ſignũ aliquod viſum, per ſimpliciſſi-
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# mũ quoddam inſtrumentũ indagare. # 142
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Interuallũ in plano Horizontis inter men-
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# ſorem, & ſignum quoduis beneficio
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# Normæ adinuenire. # 138
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Interuallum inter duo puncta in quolib{et}
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# plano eleuato, ſiue illud ad Horizontem
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# ſit rectum, ſiue inclinatũ, per quadran-
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# tem metiri. # 67
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Interuallum inter duo ſigna, vel puncta in
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# quolibet plano ſiue recto ad Horizontẽ,
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# ſiue inclinato, per quadratũ metiri. # 126
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Interuallum, quãdo menſor in vno ei{us} ex-
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# tremo, vel in aliqua altitudine nota ad
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# planum, in quo interuallũ eſt, perpendi-
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# culari exiſtens alterum extremum vi-
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# dere poteſt, per quadrantem metiri. # 68
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Interuallum tranſuerſum in Horizonte,
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# cui{us} vtrum{q́ue} extremum videripoteſt,
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# per quadratum metiri. # 128
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Interuallum inter pedes menſoris, & ſignũ
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# aliquod in plano Horizontis, beneficio
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# baculi metiri, quando extrem{us} termi-
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# n{us} interualli videri potest. # 137
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Interuallum tranſuerſum in Horizonte,
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# cui{us} vtrum extremum inſpicipoteſt,
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# per quadrantem efficere notum. # 69
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Ioſeph{us} Scaliger perperam Archimedem
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# de Dimenſione circuli reprehendit. # 184
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Irregularium omnino corporum area. # 334
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Iſoperimetra figuræ quæ, & tractatio de {eis}
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# inſtituta. # 291
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Iſoperimetrarum figurarum regularium
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# maior eſt illa, quæ plur{es} continet angu-
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# los, pluraue latera. # 296
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Iſoperimetrarum figurarum latera nume-
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# ro habentium æqualia, maxima & æ-
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# quilatera eſt, & æquiangula. # 303
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Iſoperimetrorum triangulorum eandem
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# habentium baſem, mai{us} eſt illud, quod
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# duo latera habet æqualia. # 297
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Iſoſcelis trianguli area. # 165
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Iſoſcelia duo triangula ſimilia baſium inæ-
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# qualium, ſimulmaiora ſunt duob{us} Iſo-
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# ſcelib{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. # </
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