COR. 2. The volume of any truncated triangular prism is equal to the product of its right section by one third the sum of its lateral edges. Solid Geometry - Page 389by John H. Williams, Kenneth P. Williams - 1916 - 162 pagesFull view - About this book
| Webster Wells, Walter Wilson Hart - Geometry - 1916 - 504 pages
...= F-ABC, the third required pyramid. 5. .-. DEF-ABC = E-ABC + D-ABC + F-ABC. TRUNCATED PRISMS 577. Cor. 2. The volume of any truncated triangular prism is equal to the product of one third the area of a right section by the sum of the lateral edges. Suggestions. — 1. Let XYZ... | |
| John Charles Stone, James Franklin Millis - Geometry, Solid - 1916 - 196 pages
...elementary geometry. One illustration of this is shown in the following corollary. 431. Corollary. — The volume of any truncated triangular prism is equal to the product of the area of a right section and one third of the sum of the three lateral edges. For, if «, /, and... | |
| Arthur Schultze, Frank Louis Sevenoak - Geometry - 1918 - 486 pages
...triangular prism is equal to the product of its base by one third the sum of its lateral edges. 800. COR. 2. The volume of any truncated triangular prism is equal to the product of its right section by one third the sum of its lateral edges. HINT. The right section divides the truncated prism so that... | |
| Claude Irwin Palmer - Geometry, Solid - 1918 - 192 pages
...prism shown in the figure. The base ABC, which has a right angle at C, is a right section. 9. Show that the volume of any truncated triangular prism is equal to the product of the area of a right section and one-third the sum of the three edges. SUGGESTION. Let the edges be... | |
| Claude Irwin Palmer, Daniel Pomeroy Taylor - Geometry - 1918 - 460 pages
...prism shown in the figure. The base ABC, which has a right angle at C, is a right section. 9. Show that the volume of any truncated triangular prism is equal to the product of the area of a right section and D one-third the sum of the three edges. SUGGESTION. Let the edges be... | |
| Charles Austin Hobbs - Geometry, Solid - 1921 - 216 pages
...edges are the altitudes of the three pyramids whose sum is equivalent to the truncated prism. COR. II. The volume of any truncated triangular prism is equal to the product of a right section and one-third the sum of its lateral edges. The truncated prism is divided by the right... | |
| Arthur Schultze, Frank Louis Sevenoak - Geometry - 1913 - 484 pages
...triangular prism is equal to the product of its base by one third the sum of its lateral edges. 800. COR. 2. The volume of any truncated triangular prism is equal to the product of its right section by one third the sum of its lateral edges. HINT. The right section divides the truncated prism so that... | |
| Arthur Schultze, Frank Louis Sevenoak - Geometry - 1925 - 504 pages
...triangular prism is equal to the product of its base by one third the sum of its lateral edges. 810. COR. 2. The volume of any truncated triangular prism is equal to the product of its right section by one third the sum of its lateral edges. HINT. The right section divides the truncated prism so that... | |
| Building - 1920 - 450 pages
...its frustum belong to the same class, and all have the same solution. The volume of a triangular, or truncated triangular prism, is equal to the product of its right section into a third of the sum of its principal edges. A tetrahedron is a truncated triangular prism having... | |
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