| Herbert Ellsworth Slaught, Nels Johann Lennes - Geometry, Plane - 1910 - 300 pages
...have equal bases lying on 7t and /2- Show that they are equivalent. PLANE GEOMETRY. 312. THEOREM. The area of a triangle is equal to one half the product of its base and altitude. Given the A ABC whose altitude upon the side AB is CD. To prove that the area of A ABC... | |
| Herbert Ellsworth Slaught, Nels Johann Lennes - Geometry, Plane - 1910 - 304 pages
...have equal bases lying on /[ and lr Show that they are equivalent. PL AXE GEOMETRY. 312. THEOREM. The area of a triangle is equal to one half the product of its base and altitude. Given the A ABC whose altitude C upon the side AB is CD. To prove that the area of A... | |
| Charles William Morey - Arithmetic - 1910 - 360 pages
...each triangle is what part of the area of the parallelogram ? What is the area of each triangle ? The area of a triangle is equal to one half the product of its base and its altitude. To find the area of a triangle, we find one half the product of its base and its... | |
| Norman Colman Riggs - Geometry, Analytic - 1910 - 318 pages
...215°). The area required is the sum of the areas of the triangles OP2P„ OP,P3, OP3P2 (Fig. 32). The area of a triangle is equal to one half the product of two sides and the sine of the included angle. ,P, (3,60°) >P2 (-2, 125°) ,----~" "P. (5,215°) Fio.... | |
| Charles W. Morey - Arithmetic - 1911 - 452 pages
...triangle and whose altitude is one half of the altitude of the triangle. FIG uitu 2 FIG ÜBE 3 The area of a triangle is equal to one half the product of its base and its altitude. Find areas of these triangles : BASH ALTITUD« BARB ALTITÜDE 16. The base of a right-angled... | |
| Bruce Mervellon Watson, Charles Edward White - Arithmetic - 1911 - 424 pages
...parallelogram compare ? How do the altitude of the parallelogram and of the triangle compare ? 254. The area of a triangle is equal to one half the product of its base and altitude expressed in the same denomination. 255. Oral Find the areas of triangles having dimensions... | |
| Charles William Morey - Arithmetic - 1911 - 274 pages
...each triangle is what part of the area of the parallelogram ? What is the area of each triangle ? The area of a triangle is equal to one half the product of its base and its altitude. To find the area of a triangle, we find one half the product of its base and its... | |
| Clara Avis Hart, Daniel D. Feldman - Geometry, Modern - 1911 - 328 pages
...the area of triangle ABC; the altitude upon b ; the altitude upon c. PROPOSITION V. THEOREM 491. The area of a triangle is equal to one half the product of its perimeter and the radius of the inscribed circle. A b c Given A ABC, with area T, sides a, b, and c,... | |
| Norman Colman Riggs - Geometry, Analytic - 1911 - 330 pages
...215°). The area required is the sum of the areas of the triangles OP2P,, OPiP3, OP3P2 (Fig. 32). The area of a triangle is equal to one half the product of two sides and the sine of the included angle. ,P, (3, 60°) P2 (-2, 125°) FIG. 32. .'. the required... | |
| James Charles Byrnes, Julia Richman, John Storm Roberts - Arithmetic - 1911 - 328 pages
...What are the dimensions of each of the triangles ? What is the area of each triangle ? 224. RULE. The area of a triangle is equal to one half the product of the base by thc altitude : WRITTEN PROBLEMS 225. i. Find the area of a square whose side is 8 in. 2.... | |
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