Let the lines `L_(1), L_(2), L_(3)` lie in a plane `pi`. If a line L is equally inclinded with these lines, show tat L is normal to the plane `pi`.

Let L be the line x-4 =y-2 =(z-7)/(2) and P be the plane 2x - 4y +z =7 Statement 1: The line L lies in the plane P Statement 2: The direction ratios of the line L are l_1 =1, m_1 =1, n_1= 2 and that of the normal to the plane P are l_2 =2, m_2 =-4, n_2 =1 and l_1l_2 +m_1 m_2 +n_1 n_2 =0 holds

Let L_(1) and L_(2) be two lines intersecting at P. If A_(1),B_(1),C_(1) are points on L_(1),A_(2),B_(2),C_(2),D_(2),E_(2) are points on L_(2) and if none of these coincides with P, then the number of triangles formed by these 8 points is

Consider three planes P _(1) = x-y + z=1 , P_(2) = x + y -z = -1 and P _(3) , x - 3y + 3z =2. Let L_(1), L_(2) and L_(3) be the lines of intersection of the planes P _(2) and P _(3) , P _(3) and P _(1), and P _(2), respectively Statement -1: At least two of the lines L _(1), _(2) and L _(3) are non-parallel . Statement -1: the three planes fo not have a common point

Three parallel straight lines L_i,L_2 " and " L_3 lie on the same plane. Consider 5 points on L_i 7 points on L_2 and 9 pionts on L_3 . Then the maximum possible number of triangles formed with vertices these points, is

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.