[" Co-ordinates of point "P((pi)/(4))" on the hyperbola "25x^(2)-9y^(2)=225" are "],[" a) "(3sqrt(2),5)]

A focus of the hyperbola 25x^(2)-36y^(2)=225 is

Co-ordinates of a point P((pi)/(3)) on the ellipse 16x^(2) + 25y^(2) = 400 are

The asymptote of the hyperbola 9 x^(2)-25 y^(2)=225 are

The eccentricity of the hyperbola 25x^(2)-9y^(2)=225 is . . .

The co-ordinates of the foci of the hyperbola (x+2)^2/16-(y-3)^2/9=1 is :

The triangular region bounded the tangent at the point P((pi)/(4)) on the hyperbola (x^(2))/(9)-(y^(2))/(4)=1 and the pair of lines ((y)/(2)+(x)/(3))quad ((y)/(2)-(x)/(3))=0

The length of the conjugate axis of the hyperbola 9x^(2) - 25y^(2) = 225 is -

The ordinate of any point P on the hyperbola, given by 25x^(2)-16y^(2)=400 ,is produced to cut its asymptotes in the points Q and R. Prove that QP.PR=25.

The ordinate of any point P on the hyperbola 25x^(2)-16y^(2)=400 is produced to cut the asymptoles in the points Q and R. Find the value of QP. PR