The equation of the hyperbola of given transverse axis `2a` with its vertex mid-way between the centre and the corresponding focus, is

The transverse axis of a hyperbola is of length 2a and a vertex divides the segment of the axis between the centre and the corresponding focus in the ratio 2:1. The equation of the hyperbola is

Find the equation of hyperbola whose transverse axis is 10 conjugate axis is 6.

Find the equation to the hyperola of given length of transverse axis 5 and the join of centre and focus is bisected by vertex.

The equation of the hyperbola with its transverse axis parallel to x-axis and its centre is ( -2,1) the length of transverse axis is 10 and eccentricity 6/5 is

The equation of the hyperola whose centre is (5,2) vertex is (9,2) and the length of conjugate axis is 6 is

The equation of the hyperbola with is transverse axis parallel to x-axis and its centre is (3,-2) the length of axes, are 8,6 is

If the vertex of a hyperbola bisects the distance between its center and the correspoinding focus, then the ratio of the square of its conjugate axis to the square of its transverse axis is (a) 2 (b) 4 (c) 6 (d) 3

If the vertex of a hyperbola bisects the distance between its center and the correspoinding focus, then the ratio of the square of its conjugate axis to the square of its transverse axis is (a) 2 (b) 4 (c) 6 (d) 3

If the vertex of a hyperbola bisects the distance between its center and the correspoinding focus, then the ratio of the square of its conjugate axis to the square of its transverse axis is (a) 2 (b) 4 (c) 6 (d) 3

Find the equation of the hyperbola whose transverse and conjugate axes are the x and y axes respectively, given that the length of conjugate axis is 5 and distance between the foci is 13.