Elements of Geometry: With Practical Applications ... |
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Page 196
... parallelopipedon is rectangular , when all its faces are rectangles . H F B 7. When the faces of a rectangular parallelopipedon are square , it is called a cube . 8. A pyramid is a solid formed by several triangular planes which meet in ...
... parallelopipedon is rectangular , when all its faces are rectangles . H F B 7. When the faces of a rectangular parallelopipedon are square , it is called a cube . 8. A pyramid is a solid formed by several triangular planes which meet in ...
Page 198
... parallelopipedon , the opposite planes are equal and parallel . By the definition of this solid , the bases ABCD , EFGH are equal parallelograms , and their sides are parallel it remains only to show that the same is true of any two ...
... parallelopipedon , the opposite planes are equal and parallel . By the definition of this solid , the bases ABCD , EFGH are equal parallelograms , and their sides are parallel it remains only to show that the same is true of any two ...
Page 199
... parallel ; hence also the parallelogram DAEH is equal to the parallelogram CBFG . In the same way , it may be shown that the opposite parallelograms ABFE , DCGH are equal and parallel . Cor . Since the parallelopipedon is a solid ...
... parallel ; hence also the parallelogram DAEH is equal to the parallelogram CBFG . In the same way , it may be shown that the opposite parallelograms ABFE , DCGH are equal and parallel . Cor . Since the parallelopipedon is a solid ...
Page 201
... parallelopipedon , so as to divide it into two triangular prisms , those prisms are equal . Let the parallelopipedon ABCG be divided by the plane BDHF into the two triangular prisms ABDHEF , BCDFGH ; then will those prisms be equal ...
... parallelopipedon , so as to divide it into two triangular prisms , those prisms are equal . Let the parallelopipedon ABCG be divided by the plane BDHF into the two triangular prisms ABDHEF , BCDFGH ; then will those prisms be equal ...
Page 202
... parallel BF , are equal to each other ; and taking away the common part Ae , there remains Aa = Ee . In the same ... parallelopipedon AG described on the same solid angle A , with the same edges AB , AD , AE . PROPOSITION V. L M G H ...
... parallel BF , are equal to each other ; and taking away the common part Ae , there remains Aa = Ee . In the same ... parallelopipedon AG described on the same solid angle A , with the same edges AB , AD , AE . PROPOSITION V. L M G H ...
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Common terms and phrases
a+b+c AC² altitude angle ACD angle BAC bisect centre chord circ circular sector circumference cone consequently convex surface cylinder diagonal diameter distance draw equal and parallel equiangular equilateral triangle equivalent exterior angle figure formed four right angles given line greater half the arc hypothenuse inscribed circle intersection isosceles join less Let ABC lines drawn magnitude measured by half meet multiplied number of sides opposite angles parallel planes parallelogram parallelopipedon pendicular perimeter perpendicular plane MN point G prism PROBLEM produced Prop PROPOSITION pyramid radii radius rectangle regular polygon respectively equal right angles right-angled triangle Sabc Schol Scholium semicircle semicircumference side AC similar similar triangles solid angle solid described sphere spherical triangle square straight line suppose tangent THEOREM three sides triangle ABC triangular prism vertex VIII
Popular passages
Page 37 - The sum of all the angles of a polygon is equal to twice as many right angles as the polygon has sides, less two.
Page 180 - THEOREM. If one of two parallel lines is perpendicular to a plane, the other will also be perpendicular to this plane. Let AP & ED be parallel lines, of which AP is perpendicular to the plane MN ; then will ED be also perpendicular to this plane.
Page 139 - PROBLEM. To inscribe a circle in a given triangle. Let ABC be the given triangle : it is required to inscribe a circle in the triangle ABC.
Page 224 - The radius of a sphere is a straight line, drawn from the centre to any point of the...
Page 43 - In a right-angled triangle, the side opposite the right angle is" called the Hypothenuse ; and the other two sides are cal4ed the Legs, and sometimes the Base and Perpendicular.
Page 184 - THEOREM. If two angles, not situated in the same plane, have their sides parallel and lying in the same direction, they will be equal, and the planes in which they are situated will be parallel.
Page 10 - 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.
Page 226 - We conclude then, that the solidity of a cylinder is equal to the product of its base by its altitude.
Page 22 - If two sides and the included angle of the one are respectively equal to two sides and the included angle of the other...
Page 12 - If equals be added to unequals, the wholes are unequal. V. If equals be taken from unequals, the remainders are unequal. VI. Things which are double of the same, are equal to one another.