Clavius, Christoph, Geometria practica

Table of contents

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[11.] QVINTI LIBRI CAPITA.
Page: 17
[12.] SEXTI LIBRI PROPOSITIONES.
Page: 18
[13.] SEP TIMI LIBRI Propoſitiones.
Page: 19
[14.] FINIS.
Page: 27
[15.] PRÆFATIO.
Page: 29 (1.)
[16.] GEOMETRIÆ PRACTICÆ. LIBER PRIMVS. Tria capita ad dimenſionem linearum ſum-me neceſſaria complectens.
Page: 33 (3)
[17.] INSTRVMENTI PARTIVM Conſtructio, atque vſus. CAPVT I.
Page: 34 (4)
[18.] CAPVT II.
Page: 44 (14)
[19.] SEQVITVR TABELLA.
Page: 48 (18)
[20.] PROBLEMATA VARIA TRIANGV-lorum rectilineorum. Capvt III.
Page: 74 (44)
[21.] TRIANGVLORVM RECTILINEORVM RECTAN-gulorum problemata. I. PROPORTIONES LATERVM
Page: 74 (44)
[22.] II. LATVS.
Page: 75 (45)
[23.] III. LATVS.
Page: 75 (45)
[24.] IIII. LATVS.
Page: 75 (45)
[25.] V. BASEM.
Page: 75 (45)
[26.] VI. BASEM.
Page: 75 (45)
[27.] VII. ANGVLVM.
Page: 76 (46)
[28.] VIII. ANGVLVM.
Page: 76 (46)
[29.] TRIANGVLORVM RECTILINEO-rum obliquangulorum Problemata. IX. SEGMENTA LATERIS A Perpendiculari facta.
Page: 76 (46)
[30.] X. LATERA DVO.
Page: 76 (46)
[31.] Rurſus
Page: 76 (46)
[32.] XI. LATVS.
Page: 77 (47)
[33.] XII. LATVS.
Page: 77 (47)
[34.] Deinde.
Page: 77 (47)
[35.] Hæc autem tangens hoc etiam modo inuenietur, qui priori præferendus videtur.
Page: 77 (47)
[36.] Poſt hæc.
Page: 77 (47)
[37.] XIII. LATVS.
Page: 78 (48)
[38.] XIIII. ANGVLOS DVOS.
Page: 78 (48)
[39.] XV. ANGVLOS DVOS.
Page: 78 (48)
[40.] XVI. ANGVLOS OMNES TRES. Ex tribus omnibus lateribus perueſtigare.
Page: 79 (49)
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          X. Datum triangulum ex dato puncto in ei{us} latere in quotlib{et} part{es} æqual{es} di-
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          uidere. # 262
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          XI. Datum triangulum per line{as} vni lateri parallel{as} in quotlib{et} æqual{es} part{es}
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          diuidere. # 263
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          XII. Datum triangulum per rectam ex puncto extra triangulum dato ductam in
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          du{as} part{es} æqual{es} diuidere. # 264
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          XIII. Datum par allelogrammum in quotcunque part{es} æqual{es} per line{as} duob{us}
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          laterib{us} oppoſitis æquidiſtant{es} diuidere. # 265
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          XIV. Datum parallelogrammum per rectam ex puncto ſiue extra, ſiue intra ipſum,
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          ſiue in aliquo latere dato ductam bifariam diuidere. # 265
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          XV. Inter du{as} rect{as}, du{as} medi{as} proportional{es}, prope verum, inuenire: ex He-
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          rone & Apollonio Pergæo: ex Philone Byſantio, ac Philopono: ex Diocle: ac poſtre-
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          mo ex Nicomede per lineam conc
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          hoideos. # 266. vſque ad 272.
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          XVI. Datam figuram planam, vel circulum augere, vel minuere in data propor-
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          tione. # 272
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          XVII. Datam figuram ſolidam qualemcunque ex ijs, de quib{us} Eucl. in libris Ste-
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          reometriæ agi
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          t, augere, vel minuere in proportione data. # 273
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          XVIII. Inter duos numeros datos tum vnum, tum duos medios proportional{es}
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          reperire. # 274
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          LEMMA. Si ſint quatuor lineæ continuè proportionales: parallelepipe-
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          dum ſub quadrato alterutrius extremarum, & altera extrema comprehenſum,
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          æquale eſt cubo mediæ proportionalis, quæ priori extremæ propinquior eſt.
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          # 275
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          XIX. Radicem cui{us} lib{et} generis extro
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          bere. # 276
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          EXTRACTIO radicis quadratæ. # 279
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          EXTRACTIO radicis cubicæ. # 280
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          EXTRACTIO radicis ſurdeſolidæ. # 281
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          REGVLA propria extra ctionis radicis cubicæ. # 283
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          XX. In numeris non quadratis, non cubis, non zenſizenſis, non ſurdeſolidis, & c.
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          radicem veræ propinquam inuenire. # 284
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          XXI. Radicem cuiuſque generis ex data minutia extrahere. # 286
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          XXII. Radicem quadratam, & cubicam in numeris non quadratis, & non cubi-
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          cis per line{as} Geometricè inuenire. # 289
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          <head xml:id="echoid-head15" xml:space="preserve">SEP TIMI LIBRI
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          Propoſitiones.</head>
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          I. Area cui{us} lib{et} trianguli æqualis est rectangulo comprehenſo ſub perpendicula-
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          ria
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          vertice ad baſem protracta, & dimidiaparte baſis. Item rectangulo comprehenſo
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          ſub ſemiſſe perpendicularis, & tota baſe. Ve
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          ldenique ſemiſſirectanguli
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          ſub tota perpen-
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          diculari, & tota baſe comprehenſi. # </note>
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