8640 I have done this two different ways. that the learner may see they come out the same. The content in inches is 5832, which being divided by 1728, the inches in a solid foot, and the division continued by annexing cyphers, it comes out the same as the decimal operation. Note. The area of the surface, or superficial content of the cube and parallelopipedon is found by adding the areas of the several quadrilateral figures which compose them. ART. 29. To measure a Parallelopipedon. Definition. A parallelopipedon is a solid of three dimensions, length, breadth and thickness; as a piece of timber exactly squared, whose length is more than the breadth and thickness. The ends are called bases, which are equal. RULE. Find the area of the base, then multiply that by the length, and it will give the solid content. EXAMP. 1. The side AB is 1-75 foot, and the length AD 95 feet, to find the solid content? 1.75 1 foot, 9 inches. A 9.5 If a piece of timber, or any other thing, be of an equal bigness through its whole length, though there be a difference between the breadth and thickness, if the breadth and thickness are multiplied together, and that product multiplied by the length, this last product will be the solid content. EXAMP. 3. A piece of timber being 1 foot and 6 inches, or 18 inches broad, 9 inches thick, and 9 feet 6 inches, or 114 inches long, to find the content? 1 foot 6 inches=1.5 foot Breadth 18 inches. Depth 9 inches. 162 Length 114 inches. 648 162 162 Note, When the end is given in inches and the length in feet, find the area at the end in inches, multiply that by the length in feet, and divide this product by 144 (the square inches in a foot) and the quotient will be the feet. Take the last example. Foot. 162 area in inches. 810 1458 By the sliding Rule. Set 12 inches on the girt line D to the side of the square end on C, then, against the length on D, you will have the answer on C. By Gunter. Extend the compasses from 12 inches to the length of the side of the square end; that distance, twice turned over from the length, 144)1539(10-6875=content. will reach to the content. When the side of a square solid is given, in inches, to find how much in length will make a foot solid. RULE. As the given side is to 12, so is 12 to a fourth number, and so is that fourth number to its required length. Or divide 1728 by the area at the end, and the quotient will be the length making a solid foot. If the given side is in foot measure, then, RULE. As the given side is to 1; so is 1 to a fourth number, and so is that fourth number to the required length. When two sides of an equal square solid (that is, of unequal breadth) are given, to find what length will make any number of solid feet. RULE. Multiply the proposed number of feet by 144: divide that product by the product of the breadth and depth, and the quotient will be the length required. ART. 30. To measure a Cylinder. Definition. A cylinder is a round body, whose bases are circles, like a round column, or a rolling stone of a garden. RULE. The diameter of the base being given, find the area of the end by Art. 15, then, multiplying the area of the base by the length, that product will be the content of the cylinder. If the square of the diameter of a cylinder be multiplied by 7854, and the solidity divided by that product, the quotient will be the length, and if the content be divided by the length, the quotient will be the area of the end, from which the diameter is found by Art. 18. The learner may, for his practice, reduce all the dimensions to inches, and find the solid content in inches, which being divided by 1728, the quotient will be the solid content in feet: or, if he finds the area at the end in inches, and multiplies that by the length in feet, and divides by 144; the quotient will be feet.. This is a general rule for finding the content of any straight, solid body, of equal bigness from end to end, of whatever form the bases are for, if the area of the base be multiplied by the length, the product will be the solid content. By the Sliding Rule. Set 135, the square root of 183-34 (which is a guage point arising from the division of 144 by ·7854) found on D, to the diameter found on C, and opposite to the length, on D, you will find the content on C. Or, as 42 54 is to the circumference ; so is the length in feet to a fourth number, and so is that fourth number to the answer. Note. The superficial content of a cylinder is found by multiplying the circumference of one of the bases into the length, and to the product adding the areas of the two bases, or ends. When the diameter is given in inches, to find what length will make a solid foot. RULE. As the given diameter is to 13 531: so is 12 to a fourth number, and so is that fourth number to the required length. If the diameter be given in foot measure: Rule, as the given diameter is to 1∙128: so is 1 to a fourth number, and so is that fourth number to the required length. Or, divide 1728 by the area at the end in inches, and the quotient will be the required length. To find how much a Cylindrick or round Tree, that is equally thick from end to end, will hew to, when made square. RULE. Multiply twice the square of its semidiameter by the length, then divide the product by 144, and the quotient will be the answer. If the diameter of a round stick of timber be 24 inches from end to end, and its length 20 feet: how many solid feet will it contain, when hewn square; and what will be the content of the slabs which reduce it to a square? 12×12×2×20 24×24× 7854×20 144 40 feet, the solidity when hewn square. 628 feet, or 2×2×·7854×20=62.8 the total solidity, whence 62-8--40-22 8 feet, the solidity of the slabs. Note. The rule of workmen for measuring round timber is to multiply the square of the quarter girt or one fourth of the circumference, by the length. This rule allows about one fifth, for the bark, waste in hewing, &c. The example above, in which the diameter of the cylinder is 1 foot 9 inches, and the length 12 feet 6 inches, will give the quarter girt 1-5744 feet, and the solid content is 1-37442x12.5=23.61 feet, which is nearly four fifths of 30-C625, the content by the accurate rule. A rule, nearly correct, is to multiply twice the square of one fifth of the circumference by the length. Thus, in the example, } of the circumference is 1.0995, and 2x 10995"x12.5=30.22 feet. ART. 31. To measure a Prism. Definition. A prism is a body with two equal or parallel ends, either square, triangular, or polygonal, and three or more sides, which meet in parallel lines, running from the several angles at one end, to those of the other. RULE. Prisms of all kinds, whether square, triangular or polygonal, are measured by one general rule, viz. Find the superficial content, or area at the base (or end) by the proper rule of Sect. 1. and this multiplied by the length, or height of the prism, will give the solid content. EXAMP. The side of a stick of timber, AB, hewn three square, is 10 inches, and the length, AC, is 12 feet, to find the content? Side 10 inches. Perpendicular=4.33 inches. Note. The superficial content is found by adding the areas of the several quadrilateral and triangular figures which compose it. ART. 32. To measure a Pyramid. Definition. Solids, which decrease gradually from the base till they come to a point, are generally called pyramids, and are of different kinds, according to the figure of their bases; thus, if it has a square base, it is called a square pyramid: if a triangular base, a triangular pyramid: If the base be a circle, a circular pyramid, or simply a cone. The point, in which the top of a pyramid ends, is called a Vertex, and a line drawn from the vertex, perpendicular to the base, is called the height of the pyramid. RULE. Find the area of the base, whether triangular, square, polygonal or circular, by the rules in superficial measure: then, multiply this area by one third of the height, and the product will be the solid content of the pyramid. |