If S,`S^(')` are the foci and P any point on the hyperbola `x^(2) - y^(2) = a^(2)`, prove that, `bar(SP).bar(S^('P)) = CP^(2)`, where C is the centre of the hyperbola.

If S, S' are the foci and' P any point on the rectangular hyperbola x^2 - y^2 =a^2 , prove that, bar(SP).bar(S'P) = CP^2 where C is the centre of the hyperbola

If S and S' are the foci and P be any point on the hyperbola x^(2) -y^(2) = a^(2) , prove that overline(SP) * overline(S'P) = CP^(2) , where C is the centre of the hyperbola .

The coordinates of foci of the hyperbola x^(2) - y^(2) = 4 are-

The foci of the hyperbola 4x^2-9y^2=36 is

In a rectangular hyperbola x^2-y^2=a^2 , prove that SP.S'P=CP^2 , where C is the centre and S, S' are the foci and P is any point on the hyperbola.

Find the equation of the normal to the hyperbola x^(2)-y^(2)=9 at the point p(5,4).

Find the coordinates of the foci and the center of the hyperbola, x^2-3y^2-4x=8

Find the coordinates of the foci of the rectangular hyperbola x^(2)-y^(2) = 9

Let P(4,3) be a point on the hyperbola (x^2)/(a^2)-(y^2)/(b^2)=1 . If the normal at P intersects the x-axis at (16,0), then the eccentriclty of the hyperbola is

The straight line x+ y= sqrt(2) p will touch the hyperbola 4x^(2) - 9y^(2) = 36 if-