Question

How do you find the equation that represents the image of circle `(x- 5)^2 + (y + 12)^2 = 169` after a translation 2 units right and 3 units down?

Answer 1

Adjust to standard form to see what the original centre is, translate the centre, then plug back into the equation to find:

`(x-7)^2+(y-(-15))^2 = 13^2`

or:

`(x-7)^2+(y+15)^2=169`

Explanation:

The standard equation of a circle with centre `(h,k)` and radius `r` is:

`(x-h)^2+(y-k)^2 = r^2`

With minor changes our starting equation is:

`(x-5)^2+(y-(-12))^2=13^2`

That is: It is a circle with centre `(5, -12)` and radius `13`.

If translated `2` units right and `3` units down then the centre will be `(5+2, -12-3) = (7, -15)` and the equation becomes:

`(x-7)^2+(y-(-15))^2 = 13^2`

or putting it back in similar form to the starting equation:

`(x-7)^2+(y+15)^2=169`