The equation of the plane in which the lines `(x-5)/4 = (y-7)/4 = (z+3)/-5` and `(x-8)/7 = (y-4)/1 = (z-5)/3` lie is

The shortest distance between the lines (x-1)/2 = (y-2)/3 = (z-3)/4 and (x-2)/3 = (y-4)/4 = (z-5)/5 is

If the distance between the plane Ax+2y+z=d and the plane containing the lines (x-1)/2 = (y-2)/3 = (z-3)/4 and (x-2)/3 = (y-3)/4 = (z-4)/5 is sqrt6 , then |d| is equal to

The lines : (x-2)/1=(y-3)/1=(z-4)/(-k) and (x-1)/k =(y-4)/2 =(z-5)/1 are co-planar if :

The point of intersection of the line (x-5)/3 = (y-7)/(-1) = (z+2)/1 , (x+3)/(-36) = (y-3)/2 = (z-6)/4 is

Find the angle between the pair of lines (x+3)/(3) =(y-1)/(5) =(z+3)/(4) and (x+1)/(1) = (y-4)/(1) = (z-5)/(2)

Lines (x-2)/(1)=(y-3)/(1)=(z-4)/(-K) and (x-1)/(K)=(y-4)/(2)=(z-5)/(1) are coplanar if

The point of intersection of the lines (x + 1)/(3) = (y + 3)/(5) = (z + 5)/(7) and (x - 2)/(1)= (y - 4)/(3) = (z - 6)/(5) is

The sine of the angle between the straight line (x-2)/3 = (y-3)/4 = (z-4)/5 and the plane, 2x-2y+z = 5 is

Find the angle between the pair of lines (x+3)/(3)=(y-1)/(5)=(z+3)/(4) and (x+1)/(1)=(y-4)/(1)=(z-5)/(2)