Question

How do you find the coordinates of the center, foci, the length of the major and minor axis given `(x+8)^2/144+(y-2)^2/81=1`?

Answer 1

See the answer below

Explanation:

`(x+8)^2/(12^2)+(y-2)^2/(9^2)=1`

We compare this equation to the standard equation of a horizontal ellipse

`(x-h)^2/a^2+(y-k)^2/b^2=1`

The center of the ellipse is `(h,k)=(-8,2)`

The length of the major axis is `=2a=2*12=24`

The length of the major axis is `=2b=2*9=18`

We need `c` to determine the foci

`c^2=a^2-b^2=144-81=53`

`c=+-sqrt53`

The foci are `F=(c,2)=(-8+sqrt53,2)` and

`F'=(-8-sqrt53,2)`
graph{((x+8)^2/144+(y-2)^2/81-1)((x+8)^2+(y-2)^2-0.1)=0 [-26.1, 5.95, -5.07, 10.95]}