... all their theorems of this kind. It is often said, that curve lines have been considered by them as polygons of an infinite number of sides. But this principle no where appears in their writings. We never find them resolving any figure, or solid,... The Mathematician - Side 131751 - 399 siderUten tilgangsbegrensning - Om denne boken
| Colin Maclaurin - 1742 - 482 sider
...figures, and of the method by which they demonftrated all their theorems of this kind. It is often laid, that curve lines have been confidered by them as polygons of an infinite number of fides. -But this principle no where appears in their writings. We never find them refolving any figure,... | |
| Benjamin Robins - 1761 - 396 sider
...methods, and in comparing them with the practice of the moderns before Sir Ifaac Newton. THUS at p. 33. " It is often faid, that curve lines " have been confidered by them as polygons of art ** infinite number of fides. But this principle no ** where appears in their writings. We never... | |
| William Hales - 1800 - 128 sider
...which the Ancients demonftrated; all their theorems for mcafuring and comparing curvilinear figures, It is often, faid that curve lines have been confidered by them as polygons of an infinite number of fides ; but this principle no-where appears in their writings : we never find them refolving any figure... | |
| Colin MacLaurin - 1801 - 506 sider
...this kind. It is often said, that curve lines have been considered by them as polygons of an infmite number of sides. But this principle no where appears in their writings. We never find them rerolving any figure, or solid, into infinitely small elements. On the contrary, they seem to avoid... | |
| John Mason Good - 1813 - 714 sider
...they demonstrated their theorems of thii kind. It is often said, that curve lines have been considered by them as polygons of an infinite number of sides;...where appears in their writings: we never find them resolving any figure or solid into infinitely small elements: on the contrary, they §ecm to bay»... | |
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