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Answer this for me right now

Answer this for me right now-example-1
User Matthew Blancarte
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1 Answer

14 votes
14 votes
Four triangles and one square form this pyramid with a square base. This means, we must find the surface area of all four triangles and the square.

Area of a triangle formula:

A=1/2•B•H

We need to modify this formula, however. Because the pyramid has four congruent triangle faces, we must multiply the area of one triangle by 4.

A=4(1/2•B•H)

Now, let’s input the triangle values into the modified formula. We know the base of the triangle is 4 inches because it lies on one of the square’s sides. Squares have congruent sides, so we know the base of the triangle.

A=4(1/2•4•6)

Simplify:

A=4(4•6)/2

A=4(24)/2

A=4(12)

A=48

So, all four triangles have a total area of 48in^2

Now, we must calculate the area of the square base.

Area of a square formula:

A=S^2, where S=side

Input the values of the square into the formula:

A=(4)^2

A=16

So, the square has an area of 16in^2.

Now, to find the surface area, we must add both areas from all four triangles and the square base:

Total area: 48+16=64

So, the surface area is 64in^2
User Exclsr
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