Question

How do you write an equation of an ellipse in standard form given foci (+/-4,0) and co-vertices at (0,+/-2)?

Answer 1

`x^2/20+y^2/4=1`

Explanation:

From the given data:

Foci(4, 0) and (-4, 0)
Co-vertices (0, 2) and (0, -2) are the endpoints of the minor axis.

The Center is at the Origin `(0, 0)` by inspection.

The standard form equation for Horizontal major axis Ellipse

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

`b=2` the length of 1/2 of the minor axis called semi-minor axis.
`c=4` the distance from center to a focus.

`a` is the length of 1/2 of the major axis also called semi-major axis.

Compute for `a`

`a^2=c^2+b^2`

`a=sqrt(c^2+b^2)`

`a=sqrt(4^2+2^2)`

`a=sqrt(16+4)`

`a=sqrt(20)=2sqrt(5)`

Use now the equation

`(x-h)^2/a^2+(y-k)^2/b^2=1` with Center `(h, k)=(0, 0)`

`(x-0)^2/(2sqrt(5))^2+(y-0)^2/2^2=1`

which simplifies to

`x^2/20+y^2/4=1`

Kindly check the graph...

graph{(x^2/20+y^2/4-1)=0[-10,10,-5,5]}

Have a nice day !!! from the Philippines .