Let `16 x^(2) - 3y^(2) - 32 x + 12 y = 44 ` represents a hyperbola . Then _

The equation 16 x^2-3y^2-32 x+12 y-44=0 represents a hyperbola. (a)the length of whose transvers axis is 4sqrt(3) (b)the length of whose conjugate is 4 (c)whose center is (-1,2) (d)whose eccentricity is sqrt((19)/3)

Show that the equation 9 x^2-16 y^2-18 x+32 y-151=0 represents a hyperbola. Find the coordinates of the centre .

Show that the equation 9x^(2) - 16y^(2) - 18x - 64y - 199 = 0 represents the equation of a hyperbola, find the coordinates of its centre and foci and also the equations of its directrices

Show that the equation 9x^2-16 y^2-18 x+32 y-151=0 represents a hyperbola.

Show that 3x^2-3y^2-18x+12y+2=0 represents a rectangular hyperbola. Find its centre, foci and eccentricity.

The equation |sqrt(x^(2)+(y-1)^(2))-sqrt(x^(2) +(y+1)^(2))| = k will represent a hyperbola for-

The value of lambda with |lambda| lt 16 such that 2x^(2) - 10xy +12y^(2) +5x +lambda y - 3 = 0 represents a pair of straight lines is

If equation |sqrt((x-tantheta)^(2)+(y-sqrt3tantheta)^(2))-sqrt((x-2tantheta)^(2)+y^(2))|=2,theta in[0,pi]-{(pi)/(2)} represents hyperbola, then find the value of theta .

If e_(1) and e_(2) be the eccentricities of the hyperbolas 9x^(2) - 16y^(2) = 576 and 9x^(2) - 16y^(2) = 144 respectively, then -

If lambdax^(2)-10xy+12y^(2)+5x-16y-3=0 , represents a pair of straight lines, then the value of lambda is