Find the equation of the ellipes referred to its major and minor axes as the co-ordinate axes X, Y- respectively with latus rectum of length 4 and distance between foci `4sqrt2`.

Find the equation of the elipse referred to its major and minor axes as the coordinate axes x, y respectively with latus rectum of length 4 and the distance between foci 4sqrt2 .

Find the equation of the ellipse referred to its axes as the axes of co-ordinates : whose foci are (2, 0), (-2, 0) and latus-rectum is 6.

The equation of the ellipse with it's axes as the corrdinate axes respectively, the length of latus rectum is 15 and distance between the foci 10 is

Find the equation of the ellipse referred to its axes as the axes of co-ordinates : whose latus-rectum is 5 and eccentricity 2/3 .

Find the equation of the ellipse refer to its centre whose minor axis is equal to distance between the foci and latus rectum is 10.

Find the equation of the ellipse referred to its axes as the axes of co-ordinates : whose major axis =6 and minor axis = 4 .

Find the equation of the ellipse , referred to is principal axes , for which distance between foci= minor axis, and latus rectum = 10 .

The major and minor axes of an ellipse are along the X -axis and Y -axis respectively. If its latusrectum is of length 4 and the distance between the foci is 4sqrt(2) , then the equation of that ellipse is

The equation of the ellipse with its axes as the coordinate axes and whose latus rectum is 10 and distance between the foci = minor axis is

Find the equation to the ellipse with axes as the axes of coordinates. distance between the foci is 10 and its latus rectum is 15,