1 Answer

Blagerweij · Answer 1 · 2023-02-24T02:00:47+0000

Given:

The length of the arc is (1/12) x circumference of unit circle.

The objective is to find the area of the sector.

Since it is given as a unit cirle, the radius of the circle will be 1 unit.

The circumference of the circle will be,

$\begin{gathered} C=2\cdot\pi\cdot r \\ =2\pi\text{ units.} \end{gathered}$

Then, the length of the arc will be,

$\begin{gathered} l=(1)/(12)*2\pi \\ =(\pi)/(6)\text{ units} \end{gathered}$

Now, the formula to find the area of the sector is,

$\begin{gathered} A=(1)/(2)r^2\cdot\theta \\ =(1)/(2)r^2\cdot(l)/(r) \\ =(l\cdot r)/(2) \end{gathered}$

On plugging the values in the above relation,

$\begin{gathered} A=(\pi)/(6)*(1)/(2) \\ =(\pi)/(12) \\ =0.262\text{ sq. units} \end{gathered}$

Hence, the area of the sector is 0.262 square units.

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