The Elements of Solid Geometry |
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Page 30
... . Use diagram of ( 98 ) for ( 99 ) . 100. THEOREM . The opposite faces of a parallelopiped are equal . D ' A D B ' B 101. THEOREM . The diagonals of any parallelopiped bisect each 30 THE ELEMENTS OF SOLID GEOMETRY . EXERCISES.
... . Use diagram of ( 98 ) for ( 99 ) . 100. THEOREM . The opposite faces of a parallelopiped are equal . D ' A D B ' B 101. THEOREM . The diagonals of any parallelopiped bisect each 30 THE ELEMENTS OF SOLID GEOMETRY . EXERCISES.
Page 31
William C. Bartol. 101. THEOREM . The diagonals of any parallelopiped bisect each other . 102. DEFINITION . Similar prisms are such as have the same number of faces , each face of the one being similar to a corresponding face of the ...
William C. Bartol. 101. THEOREM . The diagonals of any parallelopiped bisect each other . 102. DEFINITION . Similar prisms are such as have the same number of faces , each face of the one being similar to a corresponding face of the ...
Page 39
... bisecting the altitude equals one - half the circumference of the base . In the frustum of the right cone : 133. All elements of the surface are equal . 134. Sections embracing the axis are trapezoids . 135. The circumference of the ...
... bisecting the altitude equals one - half the circumference of the base . In the frustum of the right cone : 133. All elements of the surface are equal . 134. Sections embracing the axis are trapezoids . 135. The circumference of the ...
Page 40
William C. Bartol. 135. The circumference of the right section bisecting the altitude equals one - half the sum of the circumferences of the bases . The demonstration of the above is left to the student . 136. An element of the surface ...
William C. Bartol. 135. The circumference of the right section bisecting the altitude equals one - half the sum of the circumferences of the bases . The demonstration of the above is left to the student . 136. An element of the surface ...
Page 49
... bisects the sphere . 168 . Two great circles bisect each other . Such circles are 169. A great circle is determined by two points in THE SPHERE 49 SECTION IV THE SPHERE PAGE DEFINITIONS AND ELEMENTARY PRINCIPLES TO XLII 50-72.
... bisects the sphere . 168 . Two great circles bisect each other . Such circles are 169. A great circle is determined by two points in THE SPHERE 49 SECTION IV THE SPHERE PAGE DEFINITIONS AND ELEMENTARY PRINCIPLES TO XLII 50-72.
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Common terms and phrases
ABC and DEF ABC-B altitude are equal axis base and altitude bases are equal bisecting called centre circle circumference coincide common altitude common vertex conical surface COROLLARY cube cuboid DEFINITIONS diameter dicular diedral angle equal with respect equivalent feet Find the volume frustum Hence inscribed prism intersection lateral edges lateral faces lateral surface Let the line line BA line is perpendicular lune MN and PQ mutually equal O-ABCD oblique parallelopiped one-third the product parallelogram pass perimeter perpen perpendicular to MN plane angle plane PQ polar triangle polyedral angle prisms whose bases radius regular polyedrons regular polygon regular pyramid right angles right circular cone right prism right section SCHOLIUM similar slant height sphere spherical angle spherical polygon spherical triangle straight line tetraedron THEOREM triangles ABC triangular prism triangular pyramids triedral
Popular passages
Page 48 - Assuming that the areas of two triangles which have an angle of the one equal to an angle of the other are to each other as the products of the sides including the equal angles...
Page 30 - The lateral or total areas of two similar cglinders of revolution are to each other as the squares of their altitudes, or as the squares of the radii of their bases ; and their volumes are to each, other as the cubes of their altitudes, or as the cubes of the radii of their bases. Let S and s...
Page 4 - If a straight line is perpendicular to each of two other straight lines at their point of intersection, it is perpendicular to the plane of the two lines.
Page 49 - A sphere is a solid bounded by a curved surface, every point of which is equally distant from a point within called the center.
Page 46 - The lateral areas, or the total -areas, of two similar cones of revolution are to each other as the squares of their altitudes...
Page 6 - Theorem: If a straight line is perpendicular to one of two parallel planes, it is perpendicular, also, to the other plane.
Page 9 - ... meeting the plane at unequal distances from the foot of the perpendicular the more remote is the greater.
Page 56 - A spherical angle is measured by the arc of a great circle described from its vertex as a pole, and included between its sides, produced if necessary.
Page 29 - The lateral area of a prism is equal to the product of the perimeter of a right section and a lateral edge.
Page 61 - The sum of the angles of a spherical triangle is greater than two and less than six right angles ; that is, greater than 180° and less than 540°. (gr). If A'B'C' is the polar triangle of ABC...