Find equaiton of hyperbola satisfying given conditons Foci of hyperbola will be foci of eppipse `(x^(2))/(25) + (y^(2))/(9) = 1` having eccentricity 2.

Find equaiton of hyperbola satisfying given conditons Verticies (0, pm 7) and foci (0, pm (28)/(3))

Find equaiton of hyperbola satisfying given conditons Length of the conjugate axis is 7 and passes from (3,-2)

Find equaiton of hyperbola satisfying given conditons Verticies (pm 6, 0) and one directrix is x = 4.

Factorise : (25)/(4)x^(2) - (y^(2))/(9)

Find equaiton of hyperbola satisfying given conditons Length of the latus rectum is 8, eccentricity (3)/(sqrt(5)) and X - axis as major axis.

Obtain equation of ellipse satisfying given conditions Foci (pm 2,0) and eccentricity (1)/(2)

Find equaiton of hyperbola satisfying given conditons Focus (0,3), eccentricity 2 and equation of the directrix is x + y - 1 = 0. (Hint : Use definition of the hyperbola).

Find equaiton of hyperbola satisfying given conditons Focus (1,2) eccentricity e = sqrt(3) and equation of the directrix is 2x + y - 1 = 0. (Hint : Use definition of the hyperbola).

In each of the find the equations of the hyperbola satisfying the given conditions. Vertices (+-2,0) , foci (+-3,0)

In each of the find the equations of the hyperbola satisfying the given conditions. Vertices (0,+-5) , foci (0,+-8)