Question

How do you find the center and radius of the circle given `x^2+y^2+9x-8y+4=0`?

Answer 1

The center is `(-9/2,4)` and the radius `r=sqrt129/2`

Explanation:

We complete the squares and rearrange the equation

`x^2+9x+y^2-8y=-4`

`x^2+9x+81/4+y^2-8y+16=-4+81/4+16`

And now we factorise

`(x+9/2)^2+(y-4)^2=129/4`

We compare this equation to the standard equation of a circle

`(x-a)^2+(y-b)^2=r^2`

The centre is `(a,b)` and the radius `=r`

In our case,

The center is `(-9/2,4)` and the radius `=sqrt129/2`