| Jeremiah Day - Measurement - 1815 - 388 pages
...SOLID. 59. Multiply the surface by | of the perpendicular distanct from the centre to one of the sides. Or, Multiply the cube of one of the edges, by the solidity of a similar solid whose edges are 1. As the solid is made tip of a number of equal pyramid ;, 40 MENSURATION OF... | |
| Jeremiah Day - Geometry - 1824 - 440 pages
...SOLID. 59. MULTIPLY THE SURFACE BY | OF THE PERPENDICULAR DISTANCE I ROM THE CENTRE TO ONE OF THE SIDES. Or, MULTIPLY THE CUBE OF ONE OF THE EDGES, BY THE SOLIDITY OF A SIMILAR SOLID WHOSE EDGES . . F. 1 . As the solid is made up of a number of equal pyramids, whose bases are... | |
| Jeremiah Day - Measurement - 1831 - 520 pages
...SOLID. 59. MULTIPLY THE SURFACE BY i OF THE PERPENDICULAR DISTANCE FROM THE CENTER TO ONE OF THE SIDES. Or, MULTIPLY THE CUBE OF ONE OF THE EDGES, BY THE SOLIDITY OF A SIMILAR SOLID WHOSE EDGES ARE 1 . As the solid is made up of a number of equal pyramids, whose bases are the... | |
| Jeremiah Day - Logarithms - 1831 - 418 pages
...SOLID. 59. MULTIPLY THE SURFACE BY i OF THE PERPENDICULAR DISTANCE FROM THE CENTER TO ONE OF THE SIDES. Or, MULTIPLY THE CUBE OF ONE OF THE EDGES, BY THE SOLIDITY OF A SIMILAR SOLID WHOSE EDGES ARE 1 . As the solid is made up of a number of equal pyramids, whose bases are the... | |
| Adrien Marie Legendre - Geometry - 1836 - 394 pages
...perpendicular let fall from the centre on one of the faces, and the product will be the solidity. RULE II. — Multiply the cube of one of the edges by the solidity of a similar polyedron, whose edge is 1 . The first rule results from the division of the polyedron into as many equal pyramids as it has... | |
| Mathematics - 1836 - 488 pages
...solid. Multiply the surface by ^ of the perpendicular distance from the center to one of the sides. Or, multiply the cube of one of the edges, by the solidity of a similar solid whose edges are one. THE CYLINDER, COIfE, AND SPHERE. To ßnd the СОППСХ surface of a right... | |
| Jeremiah Day - Geometry - 1838 - 416 pages
...SOLID. 59. MULTIPLY THE SURFACE BY i OF THE PERPENDICULAR DISTANCE FROM THE CENTER TO ONE OF THE SIDES. Or, MULTIPLY THE CUBE OF ONE OF THE EDGES, BY THE SOLIDITY OF A SIMILAR SOLID AVHOSE EDGES ARE 1. As the solid is made up of a number of equal pyramids, whose bases are the... | |
| Jeremiah Day - Geometry - 1839 - 434 pages
...SOLID. 59. MULTIPLY THE SURFACE BY i- OF THE PERPENDICULAR DISTANCE FROM THE CENTER TO ONE OF THE SIDES. Or, MULTIPLY THE CUBE OF ONE OF THE EDGES, BY THE SOLIDITY OF A SIMILAR SOLID WHOSE EDGES ARE 1. As the solid is made up of a number of equal pyramids, whose bases are the... | |
| Nathan Scholfield - 1845 - 894 pages
...perpendicular distance from the centre to one of its sides. (Prop. VII. Cor. 2. B. II. Sec. 2.) 2. Or multiply the cube of one of the edges by the solidity of a similar solid whose edges are one. As the solidity is made up of a number of equal pyramids, whose bases are... | |
| Jeremiah Day - Logarithms - 1848 - 354 pages
...59. MULTIPLY THE SURFACE BY .§. OF THE PERPENDICULAR DISTANCE FROM THE CENTRE TO ONE OF THE SIDES. Or, MULTIPLY THE CUBE OF ONE OF THE EDGES, BY THE SOLIDITY OF A SIMILAR SOLID WHOSE EDGES ARE 1. As the solid is made up of a number of equal pyramids, whose bases are the... | |
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