Shortest distance between z-axis and the line `(x-2)/(3)=(y-5)/(2)=(z+1)/(-5)` is

If the lies (x-3)/(1)=(y+2)/(-1)=(z+lambda)/(-2) lies on the line,2x-4y+3z=2, then the shortest distance between this line and the line,(x-1)/(12)=(y)/(9)=(z)/(4) is (A) 0 (B) 2 (C) 1 (D) 3

Points (1,-1,2) is the foot of perpendicular drawn from point (0,3,1) on the line (x-a)/l=(y-2)/3=(z-b)/4 find the shortest distance between this line and the line (x-1)/3=(y-2)/4=(z-3)/5

The shortest distance between the line (x-3)/(3)=(y)/(0)=(z)/(-4) and the y -axis is

The shortest distance between the lines (x-2)/(3)=(y+3)/(4)=(z-1)/(5) and (x-5)/(1)=(y-1)/(2)=(z-6)/(3) , is

Find the shortest distance between the lines given by (x-2)/(3)=(y-5)/(-2)=(z-1)/(1)and(x+1)/(2)=(y+2)/(-6)=(z-3)/(1)

If the line, (x-3)/(1) =(y+2)/(-1) = (z+ lamda)/(-2) lies in the plane, 2x -4y + 3z =2, then the shortest distance between this line and the line, (x-1)/(12) = y/9 =z/4 is :

The shortest distance between the lines (x-2)/(2)=(y-3)/(2)=(z-0)/(1) and (x+4)/(-1)=(y-7)/(8)=(z-5)/(4) lies in the interval

Find the shortest distance between the following lines: (x-3)/(1)=(y-5)/(-2)=(z-7)/(1) and (x+1)/(7)=(y+1)/(-6)=(z+1)/(1)

If 1,m ,n are the direction cosines of the line of shortest distance between the lines (x-3)/(2) = (y+15)/(-7) = (z-9)/(5) and (x+1)/(2) = (y-1)/(1) = (z-9)/(-3) then :

The shortest distance between the lines (x-3)/(2) = (y +15)/(-7) = (z-9)/(5) and (x+1)/(2) = (y-1)/(1) = (z-9)/(-3) is :