A. parabola
B. Ellipse
C. hyperbola
D. none
The locus of poles of tangents to the hyperbola x2-y2=a2 w. r. t the parabola y2=4ax is
A normal to the hyperbola x2/a2-y2/b2=1 cuts the axes at K and L. The perpendiculars at K and L axes meet in P. The locus of P is
The equation of the asymptotes of the hyperbola 4x2-9y2=36 are
The sum and product of the slops of the tangents to the hyperbola 2x2-3y2=6 drawn from the point (-1,1) are
The length of latus rectum of parabola y<sup>2</sup>+8x-2y+17 = 0 is:
If 2x-ky+3=0, 3x-y+1=0 are conjugate lines with respect to 5x2-6y2=15 then k =
The equations of the tangents to the hyperbola 4x2-5y2 =20 which make an angle 900 with the transverse axis are
For a binominal variate X, if n = 4 and P(X = 4) = 6 P(X = 2), then the value of p is:
Tangents to x2/a2+y2/b2=1 make an angles θ1, θ2 with traverse axis. The equation of the locus of their intersection when cot (θ1+θ2)=k is
The polar of (-2, 3) w. r. t the hyperbola 4x2-3y2=12 is