The foci of an ellipse are `(0,pm4)` and the equations for the directtices are `y=pm9.` The equation for the ellipse is

the foci of an ellipse are (0+-6) and the equation of the directrces are y=+- 9. the equation of the ellipse is

Foci of an ellipse are (pm 5, 0) and one of its directrices is 5x = 36 . Then its equation is

If the foci of an ellipse are (0,+-1) and the minor axis is of unit length,then find the equation of the ellipse.The axes of ellipse are the coordinate axes.

If the foci of an ellipse are (pm sqrt5,0) and its exccentricity is (sqrt5)/(3), then the equation of the ellipse is

The length of the major axis of an ellipse is 20 units and its foci are (pm 5sqrt3, 0). Find the equation of the ellipse.

Find the equation of the ellipse whose vetices are (pm6, 0) and foci are (pm 4, 0) .

If an ellipse has its foci at (2,0) and (-2,0) and its length of the latus rectum is 6, then the equation of the ellipse is:

Find the equation of the ellipse whose vertices are are and foci are (+-5,0)