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gmany

We have two triangles with base 9ft and height 12.3ft and two triangles with base 11ft and height 11.9ft.

The formula of an area of a triangle:

[tex]A_\triangle=\dfrac{1}{2}bh[/tex]

Triangle #1:

b = 9ft and h = 12.3ft. Substitute:

[tex]A_1=\dfrac{1}{2}(9)(12.3)=55.35ft^2[/tex]

Triangle #2:

b = 11ft and h = 11.9ft. Substitute:

[tex]A_2=\dfrac{1}{2}(11)(11.9)=65.45ft^2[/tex]

The Lateral Area:

[tex]L.A.=2A_1+2_A2\\\\L.A.=2(55.35)+2(65.45)=241.6\ ft^2[/tex]

Answer: B. 241.6 ft².

profantoniofonte

Answer: B

Step-by-step explanation:

The point here, on calculating the Lateral Area of a Pyramid is searching for Congruent Triangles. In a rectangular pyramid, we have four triangles, in the Lateral Area.

The basic formula for calculating the Area of any triangle is:

Δ[tex]=\frac{1}{2}*base*height[/tex]

So, let's plug it in the values for the 1st triangle:

Δ[tex]\frac{1}{2}* 11*11.9[/tex]

Δarea=[tex]65.45 ft^{2}[/tex]

For the second triangle (on the left):

Δ=[tex]\frac{1}{2}*9*12.3=\\ 55.35 ft²[/tex]

The base is a rectangle, this assures us the base of the other faces is also 9 ft and 11 ft.

So we can assume the other Triangle are congruent to Triangle 1 and 2.

The Lateral Area is the sum of all Pyramid's Triangles area:

55.35+55.35+65.45+65.45=241.6 ft²

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