Mensuration for beginners [With] Answers1883 |
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Side 89
William Dodds. PART III . MENSURATION OF SOLIDS . 128. A solid body has three dimensions , length , breadth , and thickness ( height or depth ) ; e.g. , a block of wood or stone . 129. The volume , solidity , or solid content of a solid ...
William Dodds. PART III . MENSURATION OF SOLIDS . 128. A solid body has three dimensions , length , breadth , and thickness ( height or depth ) ; e.g. , a block of wood or stone . 129. The volume , solidity , or solid content of a solid ...
Side 90
... solids , each of which is a cube , being an inch long , an inch broad , and an inch thick . Such a cube is called a ... solid content of a cubical block of stone , each side measuring 5 ft . Volume 5x5x5 = 125 c . ft . Ex . 2. Find the ...
... solids , each of which is a cube , being an inch long , an inch broad , and an inch thick . Such a cube is called a ... solid content of a cubical block of stone , each side measuring 5 ft . Volume 5x5x5 = 125 c . ft . Ex . 2. Find the ...
Side 91
... Solid content = 2 } × 2 × 2 } = } × } } = 722 c . ft . Value = 16d . × 72o = 72od . = 15s . 21d . Ex . LVI . Find the solid content of cubes having the following lengths : - ( 1 ) 23 yds . ( 2 ) 32 yds . ( 3 ) 2.5 yds . ( 4 ) 17.5 yds ...
... Solid content = 2 } × 2 × 2 } = } × } } = 722 c . ft . Value = 16d . × 72o = 72od . = 15s . 21d . Ex . LVI . Find the solid content of cubes having the following lengths : - ( 1 ) 23 yds . ( 2 ) 32 yds . ( 3 ) 2.5 yds . ( 4 ) 17.5 yds ...
Side 92
... solid content of a cube by cubing the side , so the side may be found by taking the cube root of the solid content . The cube numbers to 1728 and their cube roots , should be committed to memory ; they are- Cubes 1,8,27,64 , 125 , 216 ...
... solid content of a cube by cubing the side , so the side may be found by taking the cube root of the solid content . The cube numbers to 1728 and their cube roots , should be committed to memory ; they are- Cubes 1,8,27,64 , 125 , 216 ...
Side 93
... solid feet , what ( 14 ) A cubical box contains 110592 solid inches ; find , in feet , the length of its side . ( 15 ) Find the edge of a cube whose content is 1 c . yd . 7 c . ft . 567 c . in . ( 16 ) A packing - case in the shape of a ...
... solid feet , what ( 14 ) A cubical box contains 110592 solid inches ; find , in feet , the length of its side . ( 15 ) Find the edge of a cube whose content is 1 c . yd . 7 c . ft . 567 c . in . ( 16 ) A packing - case in the shape of a ...
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Vanlige uttrykk og setninger
9 ft A B C D ABCD acres angle subtended Area of base broad centre circle circular circum Circumference of base contains cube cubic foot curved surface cwts cylinder depth diagonal diam Diameter of base equal equilateral triangle find the area Find the cost find the expense find the height find the length find the number Find the side find the volume following dimensions found by Art heptagon hexagon hypotenuse length of carpet Multiply number of cubic number of degrees papering a room parallel sides parallelopiped paving perimeter perpendicular distance perpendicular height polygon prism quotient Radius of base rectangle regular polygon Required the area rhomboid rhombus right cone right-angled triangle round RULE sector slant height solid content square chains square feet square field square links square pyramid square root square yard thick trapezium trapezoid triangular field whole surface width
Populære avsnitt
Side 18 - Multiply the divisor, thus augmented, by the last figure of the root, and subtract the product from the dividend, and to the remainder bring down the next period for a new dividend.
Side 52 - A circle is a plane figure contained by one line, which is called the circumference, and is such, that all straight lines drawn from a certain point within the figure to the circumference are equal to one another.
Side 52 - A diameter of a circle is a straight line drawn through the centre, and terminated both ways by the circumference.
Side 41 - RULE. — Multiply half the sum of the two parallel sides by the perpendicular distance between them, and the product will be the area.
Side 45 - To find the area of a trapezium. RULE. — Divide the trapezium into two triangles by a diagonal, and then find the areas of these triangles ; their sum will be the area of the trapezium.
Side 103 - A SPHERE is a solid bounded by a curved surface, every part of which is equally distant from a point within, called the centre.
Side 101 - The area of the curved surface of a cone is equal to one-half the product of the slant hight by the circumference of the base (660).
Side 105 - A reservoir is 24 ft. 8 in. long, by 12 ft. 9 in. wide ; how many cubic feet of water must be drawn off to make the surface sink 1 foot?
Side 38 - RULE. from half the sum of the three sides, subtract each side separately; multiply the half sum and the three remainders together, and the square root of the product will be the area required.
Side 33 - A rhombus is that which has all its sides equal, but its angles are not right angles.