![]() ![]() The lateral area of the right triangular prism becomes 9 times its original value as "l" and "b" are substituted by "3l" and "3b" in the formula of the lateral area of a right triangular prism as A = 3lb = A = 3×(3l)×(3b) = 9 (3lb) which gives 9 times the original value of the lateral area. It is determined with the formula: Surface area bh + L (s1 + s2 + s3) where, b is the bottom edge of the base triangle, h is the height of the base triangle, s 1, s 2, and s 3 are the sides of the triangular bases. What Happens to the Lateral Area of a Right Triangular Prism If the Length and Breadth of One Rectangular Face are Tripled? Surface area of a triangular prism is the sum of the areas of all the faces of the prism.
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