One focus of a hyperbola is located at the point (1,-3) and the corresponding directrix is the line y=2. Find the equation of the hyperbola if its eccentricty is `(3)/(2)`.

One focus of a hyperbola is located at the point (1, -3) and the corresponding directrix is the line y = 2. Find the equation of the hyperbola if its eccentricity is (3)/(2)

If for a rectangular hyperbola a focus is (1,2) and the corresponding directrix is x+y=1 then the equation of the rectangular hyperbola is:

If for a rectangular hyperbola a focus is (1,2) and the corresponding directrix is x+y=1 then the equation of the rectangular hyperbola is

A hyperbola with eccentricity e=2 has a focus at (0,0) and corresponding directrix y-1=0 . The equation of the hyperbola is

The equation of hyperbola whose focus is (5,0) and corresponding directrix is x=4 , is:

Equation of the rectangular hyperbola whose focus is (1,-1) and the corresponding directrix is x-y+1=0

Equation of the rectangular hyperbola whose focus is (1,-1) and the corresponding directrix is x-y+1=0

Equation of the rectangular hyperbola whose focus is (1,-1) and the corresponding directrix is x-y+1=0 .

The equation of the directrix of a hyperbola is x-y+3 = 0. Its focus is (-1,1) and eccentricity is 2 . Find the equation of the hyperbola.