1 Answer

Christopher Tokar · Answer 1 · 2020-03-30T22:47:14+0000

Answer:

The polynomial for the sum of the shaded
$\pi$ r² - 20
$\pi$

Explanation:

Given as :

The figure is shown which is of concentric circle with radius B , A , r

The radius B = 4 unit

The radius A = 6 unit

Let The sum of shaded portion = x unit

Now, The circumference of circle = 2
$\pi$ R , where R is the radius

So, for circle with radius B.

The circumference = 2
$\pi$ R = 2
$\pi$ B

Or, The circumference = 2
$\pi$ × 4 = 8
$\pi$

Similarly

For circle with radius A.

The circumference = 2
$\pi$ R = 2
$\pi$ A

Or, The circumference = 2
$\pi$ × 6 = 12
$\pi$

Now, The area of circle with radius r is

Area =
$\pi$ ×radius × radius

Or, Area =
$\pi$ r²

Now,

The sum of shaded region area = The area of circle with radius r - ( The circumference with radius B + The circumference with radius A )

Or, The sum of shaded region area =
$\pi$ r² - ( 8
$\pi$ + 12
$\pi$ )

Or, The sum of shaded region area =
$\pi$ r² - 20
$\pi$

Hence The polynomial for the sum of the shaded area is
$\pi$ r² - 20
$\pi$ Answer

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