A straight line L with direction cosines l, m, n is parallel to `3x-4y+2z+8=0` where

Find the direction cosines of the normal to the plane x+2y+2z-4=0

The angle between a line with direction cosines (1)/(2),sqrt(3)/(2),0 and a plane kx-y+3z+4=0 is 30^(@) . Then k is

There are three straight lines through the origin with direction cosines proportional to (1,2,2), (2,3,6) (3,4,12), Find the direction cosines of a a line equally inclined to the given lines.

If (l_(1),m_(1),n_(1)) and (l_(2),m_(2),n_(2)) are the direction cosines of two lines find the direction cosines of the line which is perpendicular to both these lines.

Show that the lines whose direction cosines are given by l+m+n=0 , 2mn+3nl-5lm=0 are perpendicular to each other .

Find the angle between the lines whose direction cosines are given by the equation 3l + m + 5n = 0 and 6mn - 2nl + 5lm = 0

If (1,2,1), (1,-3,2) are the direction ratios of two lines and (l, m,n) are the direction cosines of a line perpendicular to the given lines, then l + m + n