| Edward Augustus Kendall - 1811 - 474 lapas
...a right cylinder is equal to the periphery of the base multiplied into the length of its . side. 3. The solidity of a cylinder is equal to the area of its base, multiplied into its altitude. 4. Cylinders of the same base, and standing between the fame parallels, are equal.... | |
| Edward Augustus Kendall - 1811 - 482 lapas
...of a right cylinder is equal to the periphery of the base multiplied into the length of its side. 3. The solidity of a cylinder is equal to the area of its base, multiplied into its altitude. 4. Cylinders of the same base, and standing between the same parallels, are equal.... | |
| William Nicholson - 1819 - 426 lapas
...a right cylinder is equal ^o the periphery of the base multiplied into the length, of its side. 3. The solidity of a cylinder is equal to the area of its base multiplied into its altitude. 4. Cylinders of the same base, and standing between the same parallels, are equal.... | |
| William Nicholson - 1819 - 424 lapas
...superficies ofariglu cylinder is equal to the periphery of the hase multiplied mto the lenfjth of us side. 3. The solidity of a cylinder is equal to the area of its hase multiplied into its altitude. 4. < Cylinders of the same hase, and standing between the same parallels,... | |
| Timothy Walker - 1829 - 138 lapas
...two surfaces are to each other as 4 to 6 or as 2 to 3. Solidity of the Three Round Bodies. 155. — The solidity of a cylinder is equal to the area of its base multiplied by its altitude — . We have already seen (149) that the cylinder may be regarded as a prism of an infinite... | |
| Timothy Walker - 1829 - 156 lapas
...the cylinder are tangents to the sphere. Thus SOLIDITY OF THE THREE ROUND BODIES. 155. THEOREM. — The solidity of a cylinder is equal to the area of its baie multiplied by its altittitle. DEM. — We have already seen (149) that the cylinder may be regarded... | |
| James Bates Thomson - 1844 - 268 lapas
...equal to cire. RCxH. Hence, The convex surface of a cylinder is equal, $e. PROPOSITION II. THEOREM. The solidity of a cylinder is equal to the area of its base, multiplied by its altitude. Let H be the altitude of the given cylinder, RC the radius of its base, and the area of its... | |
| Dana Pond Colburn - 1855 - 396 lapas
...dimensions. (p.) The solidity of a prism equals the area of its base multiplied by its altitude. (q.) The solidity of a cylinder is equal to the area of its base multiplied by its altitude. (r.) The convex surface of a cylinder is equal to the circumference of its base multiplied... | |
| Dana Pond Colburn - 1856 - 392 lapas
...dimensions. (p.) The solidity of a prism equals the area of its base multiplied by its altitude. (q.) The solidity of a cylinder is equal to the area of its base multiplied by its altitude. (r ) The convex surface of a cylinder is equal to the circumference of its base multiplied... | |
| Charles Haynes Haswell - 1858 - 350 lapas
...a(=os), the altitude of the cylinder, V=pr2 h; or, since pr2 — iluK area of the base, The volume of a cylinder is equal to the area of its base multiplied by its altitude. EXAMPLE 2. To ascertain the Volume of the Frustrum of a Cone with a Circular Base. The generating... | |
| |