Chapter 10.5, Problem 19E

To determine

To find the surface area.

Answer to Problem 19E

8201in²

Explanation of Solution

Given Information: 1 half cylinder with Radius = 4 in, Height = 180 in and $\pi =\frac{22}{7}$ .

1 cuboid with Length = 8 in, Breadth = 180 in and Height = 8 in.

Formula Used:

Surface Area of Half-Cylinder = $\frac{1}{2}\times 2\pi \times radius(height+radius)$ ,

Surface Area of Cuboid = $2\times (Length\times Base+Base\times Height+Height\times Length)$

Total Surface Area = Surface Area of Half-Cylinder + Surface Area of Cuboid

Calculation:

1 half cylinder with Radius = 4 in, Height = 180 in and $\pi =\frac{22}{7}$ .

1 cuboid with Length = 8 in, Breadth = 180 in and Height = 8 in.

Total Surface Area = Surface Area of Half-Cylinder + Surface Area of Cuboid

Total Surface Area = $\frac{1}{2}\times 2\pi \times radius(height+radius)$ + $2\times (Length\times Base+Base\times Height+Height\times Length)$

So,

Total Surface Area = $\pi \times radius(height+radius)$ + $2\times (Length\times Base+Base\times Height+Height\times Length)$

Put the value of Radius, Height, Length, breadth and $\pi =\frac{22}{7}$ to find Surface Area

So,

Total Surface Area = $\frac{22}{7}\times 4(180+4)$ + $2\times (8\times 180+180\times 8+8\times 8)$ in² So,

Total Surface Area = $\frac{22}{7}\times 4\times 184$ + $2\times (1440+1440+64)$ in² So,

Total Surface Area = $\frac{22}{7}\times 736$ + $2\times 2944$ in² Hence,

Total Surface Area = $2313.14$ + $5888$ in² Hence,

Total Surface Area = 8201in²