From any point on the hyperbola `H_(1):(x^2//a^2)-(y^2//b^2)=1` tangents are drawn to the hyperbola `H_(2): (x^2//a^2)-(y^2//b^2)=2` .The area cut-off by the chord of contact on the asymp- totes of `H_(2)` is equal to

From any point to the hyperbola :.(2)/(a^(2))-(y^(2))/(b^(2))=1, tangents are drawn to thehyperbola (x^(2))/(a^(2))-(y^(2))/(b^(2))=2 The area cut off bythe chord of contact on the regionbetween the asymptotes is equal to

Statement 1 : If from any point P(x_1, y_1) on the hyperbola (x^2)/(a^2)-(y^2)/(b^2)=-1 , tangents are drawn to the hyperbola (x^2)/(a^2)-(y^2)/(b^2)=1, then the corresponding chord of contact lies on an other branch of the hyperbola (x^2)/(a^2)-(y^2)/(b^2)=-1 Statement 2 : From any point outside the hyperbola, two tangents can be drawn to the hyperbola.

From any point of the hyperbola x^(2)/a^(2)-y^(2)/b^(2)=1 , tangents are drawn to another hyperbola which has the same asymptotes. Show that the chord of con- tact cuts off a constant area from the asymptotes.

From points on the circle x^2+y^2=a^2 tangents are drawn to the hyperbola x^2-y^2=a^2 . Then, the locus of mid-points of the chord of contact of tangents is:

Two tangents are drawn to the hyperbola (x^(2))/(a^(2))-(y^(2))/(b^(2))=1 such that product of their slope is c^(2) the locus of the point of intersection is

From a point on the line x-y+2-0 tangents are drawn to the hyperbola (x^(2))/(6)-(y^(2))/(2)=1 such that the chord of contact passes through a fixed point (lambda, mu) . Then, mu-lambda is equal to