Stevin, Simon
,
Mathematicorum hypomnematum... : T. 4: De Statica : cum appendice et additamentis
,
1605
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*DE* S*TATICÆ ELEMENTIS.*
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eſt inter gravitatis diametrum quæ per firmitudinis pun-
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ctum, ejusq́ue parallelam, elevantem: </
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te demiſsâ eſt verſus pondus demittens, ſimiliter inter gra-
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vitatis diametrum, quæ per firmitudinis punctum, ejusq́;
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<
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">Vt recta C B in 12 definitione, gravitatis diametro, quæ per firmitudinis
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punctum, ut D B, ejusq́ue parallelâ terminata, in 1 & </
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in 3 verò & </
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cularis ſit, Recta attollens, & </
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">Recta demittens, earumq́ue
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pondera, Rectum attollens, Rectum demittens: </
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qua ſit Horizonti, obliqua attollens, obliqua demittens,
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& </
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tens à ſitu nobis appellabuntur.</
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tenslineæ, quia ex hypotheſi angulos cum Horizonte rectos faciunt, illa Re-
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cta attollens, hæc Recta demittens, earumq́ue pondera E Rectum attollens,
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Rectum demittens dicantur. </
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figurâ horizonti ſit obliqua, obliquæ appellabuntur, & </
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dera.</
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bilioris ponderis eſſe ſumatur, operimentum vero & </
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bula ita nobis Belgis uſurpantur.</
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Materia # # Stof
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Forma # # Form
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Effectus # # Daet
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Subjectum # # Grondt
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Adjunctum # # Aencleving
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Genus # # Gheſlacht
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Species # # Afcomſt
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Definitio # # Bepaling
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Propoſitio # # Voorſtel
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Problema # # Werckſtick
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Theorema # # Vertooch
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Ratio # # Reden
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Proportio # # Everedicheyt
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A Equales # Pro qui- # Even
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Similes # bus uſur- # Ghelijcke
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Exemplum # pavimus # </
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