...05236=63774.48. Ans. OF HYPERBOLOIDS AND HYPERBOLIC CONOIDS Problem XVI.— To find the solidity of a hyperboloid. Rule. — To the square of the radius of the base, as, add the square of the middle diameter, mr; multiply this sum by the height, sf, and the product...

...frustum, and the product again by .3927, and it will give the solidity. To Find the Solidity of an Hyperboloid. — Rule: To the square of the radius of the base add the square of the middle diameter between the base and the vertex; and this sum multiplied by the altitude, and the product...

...area of the base by half the altitude. To compute the volume of a hyperboloid of revolution (Fig. 45). Rule. To the square of the radius of the base add the square of the middle diameter; multiply this sum by the height and the product by 0.5336. To compute the volume of...

...base I iy half the altitude. To compute the volume of a hyperboloid of revolution (Fig. 45). Role. To the square of the radius of the base add the square of the middle diameter; multiply this sum by the height and the product by 0.5236. To compute the volume of...

...result is the contents. To find the contents of a segment of a sphere. Rule 29. — To three times the square of the radius of the base add the square of the height, multiply the sum by the height, and the product by 0'523t>. The result is the contents. SIMILAR...

...segment is, of course, nothing. The rule, therefore, in this case becomes — (52) -To three times the square of the radius of the base add the square of the height ; multiply the sum by the height, and the product by '5236; the result will be the volume. THE...

...what is its content in imperial gallons? Ans. 41.4009 gallons. PROBLEM XIX. To find the solidity of a hyperboloid. RULE. To the square of the radius of the base, and the square of the diameter in the middle between the base and the vertex; then this sum being multiplied...