I need help with this now. She said that we were supposed to solve for the area of the composite structures inside the structures.

Question

asked May 7, 2023 171k views

1 Answer

Superigno · Answer 1 · 2023-05-10T16:35:51+0000

We can decompose the figure in structures such that we can calculate the area of each structure.

Then, we have 3 rectangles, two triangles and a semicircle. The semicircle has diameter equals to

$\begin{gathered} d=43ft-10ft-9ft=24ft \\ \end{gathered}$

Then, the radius is equal to r=12ft.

We divide the figure in 6 different structures:

Structures I and V are triangles, so their area is

Structures II, III and IV are rectangles, so their area is

$a* b\text{.}$

Structure VI is a semicircle, so the area is

$(\pi r^2)/(2)\text{.}$

All the areas are in squared feet.

Structure I (b=10, h=48-37=11)

Structure II (a=37, b-10)

Structure III (a=38-12=26, b=43-10-9=24)

Structure IV (a=32, b=9)

Structure V (b=9, h=40-32=8)

Structure VI (r=12)

Then, we can obtain the total area adding all the area of the structures.

So, the total area is 1599.08 squared feet.