Chapter 10.5, Problem 11E

To determine

To find the surface area.

Answer to Problem 11E

409in²

Explanation of Solution

Given Information: Cuboid Diameter = 10 in., Height = 8 in and $\pi =\frac{22}{7}$ .

Formula Used:

Surface Area of Cuboid = $2\pi \times radius(height+radius)$ and $Radius=\frac{Diameter}{2}$

Calculation:

Diameter = 10 in., Height = 8 in and $\pi =\frac{22}{7}$ .

Now find the radius,

  $Radius=\frac{Diameter}{2}$

So,

  $Radius=\frac{Diameter}{2}=\frac{10}{2}=5$ in

Surface Area of Solid = $2\pi \times radius(height+radius)$

Put the value of Radius and Height to find Surface Area of Solid

Surface Area of Solid = $2\pi \times 5(8+5)$ in²

So,

Surface Area of Solid = $10\pi \times 13$ in²

So,

Surface Area of Solid = $130\times \pi$ in²

Put the value of $\pi =\frac{22}{7}$ to find Surface Area of Solid

Surface Area of Solid = $130\times \frac{22}{7}$ in²

Hence,

Surface Area of Solid = 408.57in²

Nearest Whole Number of Surface Area of Solid = 409in²