If (5, 12) and (24, 7) are the foci of a hyperbola passing through the origin, then (where e is eccentricity and LR is Latus Rectum)

If (5,12), (24,7) are the foci of the hyperbola passing through origin, then its eccentricity is

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

If (5,12)a n d(24 ,7) are the foci of a hyperbola passing through the origin, then e=(sqrt(386))/(12) (b) e=(sqrt(386))/(13) L R=(121)/6 (d) L R=(121)/3

If (5,12)a n d(24 ,7) are the foci of a hyperbola passing through the origin, then e=(sqrt(386))/(12) (b) e=(sqrt(386))/(13) L R=(121)/6 (d) L R=(121)/3

In the hyperbola 4x^2 - 9y^2 = 36 , find the axes, the coordinates of the foci, the eccentricity, and the latus rectum.

If e_1 is the eccentricity of the ellipse x^2/16+y^2/25=1 and e_2 is the eccentricity of the hyperbola passing through the foci of the ellipse and e_1 e_2=1 , then equation of the hyperbola is

Find the equation of the ellipse in the following case: eccentricity e=2/3 and length of latus rectum =5 .

Equation of the hyperbola with latus rectum (22)/(5) and eccentricity 6/5 is

If the latus rectum of a hyperola forms an equilateral triangle with the centre of the hyperbola, then its eccentricity is

If (x^(2))/(36) - (y^(2))/(64) =1 represents a hyperbola, then find the co-ordinates of the foci and the vertices, the eccentricity and the length of the latus rectum.