Question

A circle's center is at `(7 ,2 )` and it passes through `(5 ,6 )`. What is the length of an arc covering `(7pi ) /4` radians on the circle?

Answer 1

`:. "Length of Arc="(7sqrt5pi)/2~~24.59"unit"`.

Explanation:

Let `r` be the radius of the circle.

The Centre C of the circle is `C(7,2)` and, the circle passes through

the pt.`P(5,6)`. Hence, the dist. `CP=r`.

Using the Distance Formula, we get,

`r^2=CP^2=(7-5)^2+(2-6)^2=4+16=20`

`:. r=sqrt20=2sqrt5`.

Hence, the `"Length of Arc CP=s="rtheta`, where, `theta` is the

measure (in Radians ), of the `/_` made by the `"Arc "CP` at the

Centre. We have, `r=2sqrt5, &, theta=(7pi)/4.`

`:. "Length of Arc="2sqrt5*(7pi)/4=(7sqrt5pi)/2~~24.59"unit"`.