If (5, 12) and (24, 7) are the foci of an ellipse passing through the origin, then find the eccentricity of the ellipse.

The angle between the line joining the foci of an ellipse to one particular extremity of the minor axis is 90^@ . The eccentricity of the ellipse is :

If the distance between the foci of an ellipse is equal to length of minor axis, then its eccentricity is

A series of concentric ellipses E_1,E_2, E_3..., E_n are drawn such that E touches the extremities of the major axis of E_(n-1) , and the foci of E_n coincide with the extremities of minor axis of E_(n-1) If the eccentricity of the ellipses is independent of n, then the value of the eccentricity, is

S_1a n dS_2 are the foci of an ellipse of major axis of length 10 units, and P is any point on the ellipse such that the perimeter of triangle P S_1 is 15. Then the eccentricity of the ellipse is 0.5 (b) 0.25 (c) 0.28 (d) 0.75

If the distance between the directrices is thrice the distance between the foci, then find eccentricity of the ellipse.

An ellipse has O B as the semi-minor axis, Fa n dF ' as its foci, and /_F B F ' a right angle. Then, find the eccentricity of the ellipse.

In an ellipse, if the lines joining focus to the extremities of the minor axis form an equilateral triangle with the minor axis, then the eccentricity of the ellipse is :

The ratio of the area of triangle inscribed in ellipse (x^2)/(a^2)+(y^2)/(b^2)=1 to that of triangle formed by the corresponding points on the auxiliary circle is 0.5. Then, find the eccentricity of the ellipse.

The ellipse x^2+ 4y^2 = 4 is inscribed is a rectangle alligned with the co-ordinate axes, which in turn is inscribed in another ellipse that passes through the point (4, 0). Then the equation of the ellipse is :

If (2,4) and (10,10) are the ends of a latus rectum of an ellipse with the eccentricity 1/2 , then the length of semi-major axis is: