Question

How do you identify the vertices, foci, and direction of `x^2/20-(y+1)^2/10=1`?

Answer 1

When given an equation of the form:

`(x-h)^2/a^2-(y-k)^2/b^2=1 " [1]"`

The negative y term indicates a horizontal transverse axis.

The vertices are `(h-a,k)` and `(h+a,k)`

The foci are `(h-sqrt(a^2+b^2),k)` and `(h+sqrt(a^2+b^2),k)`

With very little work, we can write the given equation:

`x^2/20-(y+1)^2/10=1`

In the form of equation [1]:

`(x- 0)^2/(2sqrt5)^2-(y-(-1))^2/(sqrt10)^2=1`

The negative y term indicates a horizontal transverse axis.

The vertices are `(-2sqrt5,-1)` and `(2sqrt5,-1)`

Do the calculation for `sqrt(a^2+b^2) = sqrt(20+10) = sqrt(30)`

The foci are `(-sqrt(30),-1)` and `(sqrt30,-1)`