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)+2 sqrt(2) x y+2 y^(2)+4 x+4 sqrt(2) y+1=0 represents a pair of parallel lines, then the distance between them is

The line L given by (x)/(5)+(y)/(b)=1 passes through the point (13, 32). The line K is parallel to L and has the equation (x)/(c )+(y)/(3)=1 . Then the distance between L and K is :

The equation 8x^(2)+8xy+2y^(2)+26x+13y+15=0 represents a pair of parallel st lines the distance between them is :

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 :

If 3x + y + k = 0 is a tangent to the circle x^(2) + y^(2) = 10 , the values of k are,

If line represented by x+3y-6=,2x+y-4=0 abd kx-3y+1=0 are concurrent ,then the value of k is

The angle between the lines 2 x-y+3=0 and x+2 y+3=0 is

The equation of bisectors of the angle between the two lines 2 x^(2)-3 x y+y^(2)=0 is

If x^(2)-k x y-y^(2)+2 y+2=0 represents a pair of lines than the value of k is