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Bhaller · Answer 1 · 2023-05-12T03:27:43+0000

Solution

Given

$\begin{gathered} r=9cm \\ _\theta=45^0 \end{gathered}$

Part A

The formula of length of an arc

$Length\text{ of an arc=}(\theta)/(360)*2\pi r$

Substitute the given into the formula

$\begin{gathered} Length\text{ of the arc=}(45)/(360)*2*\pi*9 \\ Length\text{ofthearc=}(1)/(8)\text{*2\pi*9} \\ \\ Length\text{ofthearc=}(1)/(8)*18\pi \\ \\ The\text{ length of the arc=}(9)/(2)\pi\text{ or 2}(1)/(4)\pi cm \end{gathered}$

Part b

Area of a sector

$\begin{gathered} Area\text{ of sector =}(\theta)/(360)*\pi r^2 \\ \\ \end{gathered}$

Substitute the given into the formula

$\begin{gathered} Area\text{ of sector=}(45)/(360)*\pi*9^2 \\ \\ Area\text{ofsector=}(1)/(8)*\pi*81=(81\pi)/(8)\text{ or 10}(1)/(8)\pi cm^2 \\ \end{gathered}$

Part C

$m\angle AB=45^0$

$Find the Arc length and the area of the sector. Leave your answer in reduced fraction-example-1$

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