##”SA”=lw+lsqrt(h^2+(w/2)^2)+wsqrt(h^2+(l/2)^2)##
The surface area will be the sum of the rectangular base and the ##4## triangles, in which there are ##2## pairs of congruent triangles.
Area of the Rectangular Base
The base simply has an area of ##lw##, since it’s a rectangle.
##=>lw##
Area of Front and Back Triangles
The area of a triangle is found through the formula ##A=1/2bh##.
Here, the base is ##l##. To find the height of the triangle, we must find the slant height on that side of the triangle.
The slant height can be found through solving for the hypotenuse of a right triangle on the interior of the pyramid.
The two bases of the triangle will be the height of the pyramid, ##h##, and one half the width, ##w/2##. Through the , we can see that the slant height is equal to ##sqrt(h^2+(w/2)^2)##.
This is the height of the triangular face. Thus, the area of front triangle is ##1/2lsqrt(h^2+(w/2)^2)##. Since the back triangle is congruent to the front, their combined area is twice the previous expression, or
##=>lsqrt(h^2+(w/2)^2)##
Area of the Side Triangles
The side triangles’ area can be found in a way very similar to that of the front and back triangles, except for that their slant height is ##sqrt(h^2+(l/2)^2)##. Thus, the area of one of the triangles is ##1/2wsqrt(h^2+(l/2)^2)## and both the triangles combined is
##=>wsqrt(h^2+(l/2)^2)##
Total Surface Area
Simply add all of the areas of the faces.
##”SA”=lw+lsqrt(h^2+(w/2)^2)+wsqrt(h^2+(l/2)^2)##
This is not a formula you should ever attempt to memorize. Rather, this an exercise of truly understanding the geometry of the triangular prism (as well as a bit of algebra).
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