Write an equation of the ellipse centered at the origin given its vertex and co vertex Can you please do both

Question

asked Jun 4, 2020 48.5k views

1 Answer

Tuizi · Answer 1 · 2020-06-08T10:11:36+0000

Answer:

1.
(x^2)/(1)+(y^2)/(4)=1.

2.
(x^2)/(121)+(y^2)/(100)=1.

Explanation:

The equation of the ellipse is

$(x^2)/(a^2)+(y^2)/(b^2)=1\ (a>b)$

or

$(x^2)/(b^2)+(y^2)/(a^2)=1\ (a<b).$

1. If the vertex of the ellipse is at point (0,2), then b=2.

If the co-vertex of the elllipse is at point (-1,0), then a=1.

The equation of the ellipse is

(x^2)/(1^2)+(y^2)/(2^2)=1,

(x^2)/(1)+(y^2)/(4)=1.

This ellipse has foci on y-axis.

2. If the vertex of the ellipse is at point (-11,0), then a=11.

If the co-vertex of the elllipse is at point (0,10), then b=10.

The equation of the ellipse is

(x^2)/(11^2)+(y^2)/(10^2)=1,

(x^2)/(121)+(y^2)/(100)=1.