Ellipse foci review

The $\text{foci}$‍ of an ellipse are two points whose sum of distances from any point on the ellipse is always the same. They lie on the ellipse's $\text{major radius}$‍.

The distance between each focus and the center is called the focal length of the ellipse. The following equation relates the focal length $f$‍ with the major radius $p$‍ and the minor radius $q$‍:

Given the radii of an ellipse, we can use the equation $f^2=p^2-q^2$‍ to find its focal length. Then, the foci will lie on the major axis, $f$‍ units away from the center (in each direction). Let's find, for example, the foci of this ellipse:

We can see that the major radius of our ellipse is $5$‍ units, and its minor radius is $4$‍ units.

The major axis is the horizontal one, so the foci lie $3$‍ units to the right and left of the center. In other words, the foci lie at $(-4\pm 3,3)$‍, which are $(-7,3)$‍ and $(-1,3)$‍.