| Robert Simson, Euclid - Trigonometry - 1762 - 466 pages
...which the fame has a greater ratio than it has unto another magnitude is the leffer of the two. Let **A have to C a greater ratio than B has to C** ; A is greater than B. for becaufe A has a greater ratio to C, than B has to C, there are a fome equimultiples... | |
| Robert Simson, Euclid - Trigonometry - 1775 - 520 pages
...greater ratio than ij has unto another magnitude is the Icflerof the two. •THHAT 1 othe of the two Let **A have to C a greater ratio than B has to C** ; A is greater than B : For, becaufe A has a greater ratio to C, than 15 has to C, there are" fome... | |
| Euclid - 1781 - 520 pages
...which the fame has a greater ratio than it has unto another magnitude is the leffer of the two. v Let **A have to C a greater ratio than B has to C** : A is greater than B : For, becaufe A has a greater ratio to C, than B has to C, there are* fome equimultiples... | |
| Alexander Ingram, Robert Simson - Trigonometry - 1799 - 351 pages
...magnitude to which the fame has a greater ratio than it has to another, is the leiTer of the two. Let **A have to C a greater ratio than B has to C** ; A is greater than B : For, becaufe A has a greater ratio to C, than B has to C, there is fome multiple... | |
| Robert Simson - Trigonometry - 1804
...which the fame has a greater ratio than it has unto another magnitude is the lefler of the two. Let **A have to C a greater ratio than B has to C** ; A is greater than B. for becaufe A has a greater ratio to C, than B has to C, there are a fome equimultiples... | |
| Euclides - Geometry - 1816 - 528 pages
...which the same has a greater ratio than it has unto another magnitude, is the lesser of the two. Let **A have to C a greater ratio than B has to C** ; A is greater than B : For, because A has a greater ratio to C, than B has to C, there area some equimultiples... | |
| James Ryan, Robert Adrain - Algebra - 1824 - 516 pages
...the same has a greater ratio- than it has to another, is the less of the two. DEMONSTRATION'. 1. Let **A have to C a greater ratio than B has to C,** it is to be proved that A is greater than B. A o Since the ratios of A and B to C, are-^ and 37-. \*>... | |
| Robert Simson - Trigonometry - 1827 - 513 pages
...which the same has a greater ratio than it has unto another magnitude, is the lesser of the two. Let **A have to C a greater ratio than B has to C** : A shall be greater than B. For, because A has a greater ratio to C, than B has * 7 Def. 5. to c,... | |
| Euclid, John Davidson - 1835 - 513 pages
...to which the same has a greater ratio than it has to another magnitude, is the less of the tioo. Let **A have to C a greater ratio than B has to C ; then** is A greater than B : For, because A has a greater ratio to C, than B has to C, there are a some equimultiples... | |
| Robert Simson, Euclid - Mathematics, Greek - 1835 - 513 pages
...to which the same has a greater ratio than it has to another magnitude, is the less of the two. Let **A have to C a greater ratio than B has to C ; then** is A greater than B : For, because A has a greater ratio to C, than B has to C, there are a some equimultiples... | |
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