Question

How do you write an equation of an ellipse in standard form given foci at (- 6, 5) and (- 6, - 7) and whose major axis has length 26?

Answer 1

The equation is `(y+1)^2/169+(x+6)^2/133=1`

Explanation:

The major axis is vertical

The foci are

`F=(-6,5)=(x_0,y_0+c)`

`F'=(-6,-7)=(x_0,y_0-c)`

Therefore,

`x_0=-6`

`y_0=-1`

The center of the ellipse is `C=(x_0,y_0)=(-6,-1)`

Also,

`2a=26`, `=>`, `a=13`

`FF'=2c=12`, `=>`, `c=6`

Therefore,

`b^2=a^2-c^2=13^2-6^2=169-36=133`

`b=sqrt133`

The equation of the ellipse is

`(y-y_0)^2/a^2+(x-x_0)^2/b^2=1`

`(y+1)^2/169+(x+6)^2/133=1`

graph{((y+1)^2/169+(x+6)^2/133-1)(y-1000(x+6))=0 [-36.9, 14.42, -12.38, 13.3]}