Two lines are given by `(x-2y)^2 + k (x-2y) = 0` . The value of k, so that the distance between them is 3, is :

The equation of second degree x^2+2sqrt2x+2y^2+4x+4sqrt2y+1=0 represents a pair of straight lines.The distance between them is a. 4 b. 4/sqrt3 c. 2 d. 2sqrt3

The ratio in which the line 3x+ 4y + 2 =0 divides the distance between the lines 3x + 4y + 5 =0 and 3x + 4y - 5 =0 is

The lines given by the equation (2y^2+3xy-2x^2)(x+y-1)=0 form a triangle which is

If the pairs of lines x^2+2x y+a y^2=0 and a x^2+2x y+y^2=0 have exactly one line in common, then the joint equation of the other two lines is given by (a) 3x^2+8x y-3y^2=0 (b) 3x^2+10 x y+3y^2=0 (c) y^2+2x y-3x^2=0 (d) x^2+2x y-3y^2=0

If x = 3, y = 2 is a solution of the equation 5x - 7y = k, find the value of k and write the resultant equation.

If x-3 is a factor of k^(2)x^(3) - kx^(2) + 3kx - k , find the value of k. (k ne 0) .

If kx + 2y - 1 = 0 and 6x -4y +2=0 are identical lines, then determine k.

Consider the lines given by L_1 : x+3y-5=0, L_2 : 3x-ky-1=0 and L_3 : 5x+2y-12=0 .one of L1,L2,L3 is parallel to at least one of the other two, if k=

Find distance from point (3, 5) to the line 2x + 3y = 14 and the distance to the line parallel to x - 2y = 1.