Consider the lines `L _(1) : (x +1)/( 3) = (y+2)/(1) = (z+1)/(2), L_(2): (x-2)/(1) = (y+2)/(2) = (z-3)/(3)`
The shortest distance between `L _(1) and L _(2)` is

Consider the lines L _(1) : (x +1)/( 3) = (y+2)/(1) = (z+1)/(2), L_(2): (x-2)/(1) = (y+2)/(2) = (z-3)/(3) The unit vector perpendicular to both L _(1) and L _(2) is

Consider the lines L _(1) : (x +1)/( 3) = (y+2)/(1) = (z+1)/(2), L_(2): (x-2)/(1) = (y+2)/(2) = (z-3)/(3) The distance of the point (1,1,1) from the plance passing through the point (-1,-2,-1) and whose normal is perpendicular to both the lines L _(1) and L _(2) is

Shortest distance between the lines (x-1)/(1) = (y-1)/(1) = (z-1)/(1) and (x-2)/(1) = (y-3)/(1) = (z-4)/(1) is equal to

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

If the lines (x-2)/(1) = (y-3)/(1) = (z-4)/(lamda ) and (x-1)/(lamda ) = (y-4)/(2) = ( z -5)/(1) intersect, then

The angle between the lines (x-1)/(2)=(y-2)/(1)=(z+3)/(2) and (x)/(1)=(y)/(1)=(z)/(0) is

The lines (x-3)/(1)=(y-2)/(2)=(z-3)/(-l) and (x-1)/(l)=(y-2)/(2)=(z-1)/(4) are coplanar if value of l is

The angles between the lines (x+1)/(-3) =(y-3)/(2)=(z+2)/(1) and x=(y-7)/(-3) =(z+7)/(2) are