Find the direction cosines of the line `(4-x)/(2)=(y)/(6)=(1-z)/(3)`.

If O is the origin, OP = 3 with the direction cosines of OP is - (1)/(3) , (2)/(3), - (2)/(3), then find the coordinates of P .

Find the angle between the pari of lines given by (x -1)/(2) = (y -2)/(3) = (z -3)/(4) and (x -3)/(4) = (y -2)/(3) = (z -1)/(2).

Find the value of p, so that the lines (1 -x)/(3) = ( 7y - 14)/(2p) = ( z -3)/( 2) and ( 7-7x)/(3p) = ( y-5)/(1) = ( 6 - z)/(5) are intersect each other are right angle.

Find the direction cosines of the strating line passing through the point P (7, -5, 10) and Q (8, -3, 8).

Mention the condition under which the lines ( x - x _(1))/( l _(1)) = ( y - y _(1))/( m _(1)) = ( z - z _(1))/( n _(1)) and ( x - x _(2))/( l _(2)) = ( y-y _(2))/( m _(2)) = ( z - z _(2))/( n _(2)) will be perpendicular to each other.

Find the direction ratios of the line joining the points P (1, 3, -2) and Q ( -2 , 4, 0).