For The Ellipse        ,  Lengths Of Major And Minor Axes Are Respectively.

The equation of the ellipse whose axes are along the coordinate axes, vertices are (±5, 0) are foci at (±4, 0), is 

The equation of the ellipse whose axes are along the coordinate axes, vertices are (0, ±10) and eccentricity e = 4/5, is 

If the latusrectum of an ellipse is equal to one half of its minor axis, then the eccentricity is equal to

The eccentricity of the ellipse, if the distance between the foci is equal to the length of the latusrectum, is 

The equation of the circle drawn with the two foci of  as the end-points of  a diameter, is

The foci of the conic 25x² +16y² – 150x = 175 are

The foci of the ellipse  are  

The vertices of the ellipse 

The equation of the ellipse, with axes parallel to the coordinate axes, whose eccentricity is 1/3 and foci are at (2, –2) and (2, 4) is

The equation of the ellipse whose axes are of lengths 6 and  and their equations are x – 3y + 3 = 0 and 3x + y – 1 = 0 respectively, is