Two branches of a hyperbola

If two tangents can be drawn the different branches of hyperbola (x^(2))/(1)-(y^(2))/(4) =1 from (alpha, alpha^(2)) , then

The point of intersection of two tangents of the hyperbola x^2/a^2-y^2/b^2=1 , the product of whose slopes is c^2 , lies on the curve - :

The equation of the transverse and conugate axes of a hyperbola are respectively 3x+4y-7=0 and 4x-3y+8=0 and their respective lengths are 4 and 6. Find the equation of the hyperbola.

The equation of a hyperbola conjugate to the hyperbola x^(2)+3xy+2y^(2)+2x+3y=0 is

(a) Prove that any line parallel to either of the asymptotes of a hyperbola shall meet it in one point at infinity. (b) Prove that the asymptotes of a hyperbola are the diagonals of the rectangle formed by the lines drawn parallel to the axes at the vertices of the hyperbola [i.e., at (pma, 0) and (0, pmb) ].

The number of points outside the hyperbola x^2/9-y^2/16=1 from where two perpendicular tangents can be drawn to the hyperbola are:

Consider a branch of the hyperbola : x^2 -2y^2-2sqrt2x-4sqrt2y-6=0 with vertex at the point A. Let B be one of the end points of the latus -rectum. If C is the focus of the hyperbola nearest to the point A , then the area of the traingle ABC is :

ABC is a triangle such that angleABC=2angleBAC . If AB is fixed and locus of C is a hyperbola, then the eccentricity of the hyperbola is

Find the standard equation of hyperbola in each of the following cases: (i) Distance between the foci of hyperbola is 16 and its eccentricity is sqrt2. (ii) Vertices of hyperbola are (pm4,0) and foci of hyperbola are (pm6,0) . (iii) Foci of hyperbola are (0,pmsqrt(10)) and it passes through the point (2,3). (iv) Distance of one of the vertices of hyperbola from the foci are 3 and 1.

The foci of a hyperbola coincide with the foci of the ellipse (x^(2))/(25)+(y^(2))/(9)=1 , find the equation of hyperbola if ecentricity is 2.