Question

A chord with a length of `18` runs from `pi/4` to `pi/2` radians on a circle. What is the area of the circle?

Answer 1

`"Area" = 162pi(2+sqrt2)`

Explanation:

The chord and radii drawn to each end of the chord form an isosceles triangle. The angle, `theta`, between the two radii is:

`theta = pi/2-pi/4`

`theta = pi/4`

We can use the Law of Cosines:

`c^2 = a^2 + b^2 - 2(a)(b)cos(theta)`

to find the value of `r^2`

Let `c = 18`, `a = r`, and `b = r`

`18^2 = r^2 + r^2 - 2(r)(r)cos(pi/4)`

`18^2 = 2r^2 - 2r^2cos(pi/4)`

`r^2 = 18^2/(2-2cos(pi/4)`

`r^2 = 18^2/(2-sqrt2)`

`r^2 = 18^2(2+sqrt2)/2`

`r^2 = 162(2+sqrt2)`

To find the area of a circle, multiply by `pi`:

`"Area" = 162pi(2+sqrt2)`