A Practical System of Mensuration of Superficies and Solids ... |
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Page 20
... altitude . Hence , the square foot , yard , & c . , may be of any shape whatever , provided the foot contains 144 squares , each 1 inch square , and the yard 9 squares , each 1 foot square . And hence , the area or quantity of surface ...
... altitude . Hence , the square foot , yard , & c . , may be of any shape whatever , provided the foot contains 144 squares , each 1 inch square , and the yard 9 squares , each 1 foot square . And hence , the area or quantity of surface ...
Page 27
... altitude . Thus , the area of the right D angled triangle ABC , contains precisely half as much surface as would be contained in a square or parallelogram ABCD , two of whose sides are formed by the base and perpendicular of the ...
... altitude . Thus , the area of the right D angled triangle ABC , contains precisely half as much surface as would be contained in a square or parallelogram ABCD , two of whose sides are formed by the base and perpendicular of the ...
Page 28
... altitude 30 feet . Ans . 662 sq . yds . Ex . 6. What is the area of a triangle whose base is 72.7 yards , and altitude 36.5 yards ? Ans . 1326.775 sq . yds . ART . 7. If the three sides of a triangle are given , the area may be directly ...
... altitude 30 feet . Ans . 662 sq . yds . Ex . 6. What is the area of a triangle whose base is 72.7 yards , and altitude 36.5 yards ? Ans . 1326.775 sq . yds . ART . 7. If the three sides of a triangle are given , the area may be directly ...
Page 58
... altitude , and divide the product by three times the difference of their squares . Ex . 1. What is the area of a frustrum of a parabola whose height Db is 12 feet , and its upper end ef 12 feet , and base AB 20 feet ? ( See last problem ...
... altitude , and divide the product by three times the difference of their squares . Ex . 1. What is the area of a frustrum of a parabola whose height Db is 12 feet , and its upper end ef 12 feet , and base AB 20 feet ? ( See last problem ...
Page 63
... altitude , and the product will be the convex surface . When the entire surface of the prism is required , add to the convex surface the area of the bases . Hence , the super- fices of any solid , bounded by planes , is equal to the sum ...
... altitude , and the product will be the convex surface . When the entire surface of the prism is required , add to the convex surface the area of the bases . Hence , the super- fices of any solid , bounded by planes , is equal to the sum ...
Other editions - View all
A Practical System of Mensuration of Superficies and Solids: Designed ... J. M. Scribner No preview available - 2017 |
A Practical System of Mensuration of Superficies and Solids J. M. Scribner No preview available - 2022 |
A Practical System of Mensuration of Superficies and Solids: Designed ... J. M. Scribner No preview available - 2017 |
Common terms and phrases
12 feet 18 inches 20 feet 9 feet ABCD ABFD assumed cube avoirdupois axis base 26 breadth centre chord circle whose diameter Circular Sector circular segment circumfer circumference circumscribed contained convex surface Cube Root cubic feet cubic ft cubic inches cylinder cylindrical ring decimal diff divide the product ellipse ends entire surface equal extract the square feet 6 inches feet long find the area find the Solidity frustrum gallon half hypotenuse inner diameter inscribed square lateral surface length miles multiply the sum Nonagon number of degrees number of sides number of square OPERATION parabola parallel sides parallelogram pentagonal pyramid perpendicular distance perpendicular height plane prism PROBLEM radius regular pentagonal regular Polygon Required the area Required the solidity rhombus right angled triangle Rule Rule.-I slant height solid contents sphere spherical segment spheroid square feet square rods square root square yards thickness trapezium zoid zone
Popular passages
Page 53 - RULE. Find the area of the sector which has the same arc, and also the area of the triangle formed by the chord of the segment and the radii of the sector. Then...
Page 35 - Now, since the areas of similar polygons are to each other as the squares of their homologous sides...
Page 79 - A sphere is a solid terminated by a curved surface, all the points of which are equally distant from a point within called the centre.
Page 80 - A zone is a portion of the surface of a sphere included between two parallel planes.
Page 90 - ... to three times the square of the radius of the segment's base, add the square of its height ; then multiply the sum by the height, and the product by .5236 for the contents.
Page 49 - From 8 times the chord of half the arc subtract the chord of the whole arc, and ' of the remainder will be the length of the arc nearly.
Page 72 - RULE.* To the sum of the areas of the two ends add four times the area of a section parallel to and equally distant from both ends, and this last sum multiplied by £ of the height will give the solidity.
Page 51 - As 360 degrees is to the number of degrees in the arc of the sector, so is the area of the circle to the area of the sector.
Page 91 - From three times the diameter of the sphere subtract twice the height of the segment; multiply this remainder by the square of the height and the product by 0.5236.
Page 39 - A Circle is a plane figure bounded by a curve line, called the Circumference, which is everywhere equidistant from a certain point within, called its Centre.