jonnburton
Junior Member
- Joined
- Dec 16, 2012
- Messages
- 155
I wondered if anyone could help me with this problem which I have been trying to solve.
The perimeter ofa sector of a circle of radius r and angle \(\displaystyle \theta\) is the same as the perimeter of a square of side r.
a. Show that \(\displaystyle \theta\) = 2 radians
b. Show that the area of the sector is the same as the area of the square.
a.
perimieter of square = 4r.
Perimeter of sector of circle = \(\displaystyle 2r + \frac {1}{2}r^2\theta\)
so \(\displaystyle 4r = 2r + \frac {1}{2}r^2\theta\)
\(\displaystyle \frac {1}{2}r^2\theta = 2r\)
\(\displaystyle r^2\theta = 4r\)
\(\displaystyle \theta = \frac {4}{r}\)
I am not sure how to show that \(\displaystyle \theta\) = 2 radians because I do not seem to be able to get rid of r from the equations above.
The perimeter ofa sector of a circle of radius r and angle \(\displaystyle \theta\) is the same as the perimeter of a square of side r.
a. Show that \(\displaystyle \theta\) = 2 radians
b. Show that the area of the sector is the same as the area of the square.
a.
perimieter of square = 4r.
Perimeter of sector of circle = \(\displaystyle 2r + \frac {1}{2}r^2\theta\)
so \(\displaystyle 4r = 2r + \frac {1}{2}r^2\theta\)
\(\displaystyle \frac {1}{2}r^2\theta = 2r\)
\(\displaystyle r^2\theta = 4r\)
\(\displaystyle \theta = \frac {4}{r}\)
I am not sure how to show that \(\displaystyle \theta\) = 2 radians because I do not seem to be able to get rid of r from the equations above.