Define rectangular hyperbola and find its eccentricity.

Assertion (A): The locus of the point ((e^(2t)+e^(-2t))/(2), (e^(2t)-e^(-2t))/(2)) when 't' is a parameter represents a rectangular hyperbola. Reason (R ) : The eccentricity of a rectangular hyperbola is 2.

If the lines 3x- 4y = 12 and 3x + 4y = 12 meets on a hyperbola S = 0 then find the eccentricity of the hyperbola S = 0

If the lines 3x-4y=12 and 3x+4y=12 meets on a hyperbola S=0 then find the eccentricity of the hyperbola S=0

If 5/4 is the eccentricity of a hyperbola find the eccentricity of its conjugate hyperbola.

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 the latusrectum subtends a right angle at the centre of the hyperbola then its eccentricity

If the eccentricity of a hyperbola is (5)/(4) , then find the eccentricity of its conjugate-hyperbola.

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

If the latus rectum through one focum subtends a right angle at the farther vertex of the hyperbola then its eccentricity is