If `Sa n dS '` are the foci, `C` is the center, and `P` is a point on a rectangular hyperbola, show that `S PxxS^(prime)P=(C P)^2dot`

If SandS' are the foci,C is the center,and P is a point on a rectangular hyperbola,show that SP xx S'P=(CP)^(2)

If S ans S' are the foci, C is the center , and P is point on the rectangular hyperbola, show that SP ×S'P=(CP)^2

If S ans S' are the foci, C is the center , and P is point on the rectangular hyperbola, show that SP ×S'P=(CP)^2

If S ans S' are the foci,C is the center,and P is point on the rectangular hyperbola,show that SP xx SP=(CP)^(2)

If S ans S' are the foci, C is the center , and P is point on the rectangular hyperbola, show that SP ×SP=(CP)^2

If P is any point on the hyperbola whose axis are equal, prove that S PdotS^(prime)P=C P^2dot

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 of the hyperbola 4y^2 - 3x^2 = 48 and P is the any point on this hyperbola, then prove that |SP - S'P| = constant.

If Sa n dS ' are two foci of ellipse 16 x^2+25 y^2=400 and P S Q is a focal chord such that S P=16 , then find S^(prime)Qdot

If Sa n dS ' are two foci of ellipse 16 x^2+25 y^2=400 and P S Q is a focal chord such that S P=16 , then find S^(prime)Qdot