| John Keill - Logarithms - 1723 - 444 pages
...¥,viz. CH, H D. Then the Multitude of Parts, CH, HD, fha.ll be equal to th? Multitude of Parts AG, G B. And fince AG is equal to E, and CH to F ; AG and CH,...Reafon, becaufe GB is equal to E, and HD to F, GB and HD will be equal to E and F together. Therefore, as often as E is contain'd in AB, fo often is E and F... | |
| Robert Simson - Trigonometry - 1762 - 488 pages
...and CH to F ; therefore AG and CH together are equal to * E and F together. for the fame a. A*. a. r, reafon, becaufe GB is equal to E, and HD to F ; GB and HD together are equal to E and F together. Wherefore as many magnitudes as are in AB equal to E, fo many are there... | |
| Euclid - 1781 - 552 pages
...becaqfe AG is equal to E, and CH to F, therefore AG and CH together are equal to* E and F together : For the fame reafon, becaufe GB is equal to E, and HD to F ; GB and HD together are equal to E and F together. Wherefore, as many magnitudes as are in AB equal to E, fo many are there... | |
| Robert Simson - Trigonometry - 1781 - 534 pages
...becaufe AG h equal to E, and CH to F ; therefore AG and CH together are equal to * E and F together. For the fame reafon, becaufe GB is equal to E, and HD to F ; GB and HD together are equal ta E and F together. Whertfore as many magnitudes as are in AB equal t& E, fo many are there... | |
| John Keill - Geometry - 1782 - 476 pages
...D. Then the Multitude of Parts, CH, HD, (hall be equal to the Multitude of Pajts, AG, G B. And fmce AG is equal to E, and CH to F ; AG and CH, together,...be equal to E and F together. Therefore as often as Eis contained in AB,fo often is E and F, together, contained in AB and CD, totogether. And fo as often... | |
| Euclid - Euclid's Elements - 1789 - 296 pages
...and CH to F (by Con/}. )* AG and CH, taken together, will be equal to E and F ' taken together. For the fame reafon, becaufe GB is equal to E, and HD to F, GB and HD taken together, will be equal to E and F taken together. K4 I' A* L As tnany magnitudes, therefore,... | |
| Robert Simson - Trigonometry - 1804 - 530 pages
...becaufe AG is equal to E, and CH to F; therefore AG and CH together are equal to » E and F together, for the fame reafon, becaufe GB is equal to E, and HD to F ; GB and HD together are equal to E and F together. Wherefore as many magnitudes as are in AB equal to E, fo many are there... | |
| Euclid - Geometry - 1810 - 554 pages
...therefore AG and CH together are equal to *E and F together: for the same reason, a Ax. 2. 5. because GB is equal to E, and HD to F; GB and HD together are equal to E and F together. \Vherefore, as many magnitudes as are in AB equal to E, so many are... | |
| Peter Nicholson - Mathematics - 1825 - 1046 pages
...therefore AG and CH together arc equal to (Az. 2. 5.) E and F together: For the same reason, because GB is equal to E, and HD to F ; GB and HD together are equal to E and F together. Wherefore, as many magnitudes as are in AB equal to E, so many are there... | |
| Robert Simson - Trigonometry - 1827 - 546 pages
...therefore AG and • 2 Ax. 1. QJJ together are equal to * E and F together : for the same reason, because GB is equal to E, and HD to F, GB and HD together are equal to E and F together: wherefore as many magnitudes as there are in AB equal to E, so many... | |
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