Let A(2,-6) and B(-3,-1) be two given points .Find the length of orthogonal projection of the line segment `overline(AB)` upon the straight line 3x+y=10.

Let A(2,-5) and B(6,-1) be two given points Find the length of orthogonal projection of the line -segment overline(AB) upon the line x-y=1.

Find the coordinates of the midpoint of the line segment intersected by the axes of the straight line 4x + 3y + 12 = 0.

Let A ( 2 , - 4 , - 3) and B ( - 4 , 2 , 3) be two given points if the points C and D trisect the line-segment overline(AB) , then find the coordinates of C and D .

A(2,5) and B(-3,-4) are two fixed points , the point P divides the line -segment overline(AB) internally in the ratio k:1 . Find the coordinates of P . Hence find the equation of the line joining A and B.

Find the equation of the line passing through the point (2,3) and bot to the straight line 4x-3y=10.

What is length of the projection of line segment joining points (2,3) and (7,5) on x-axis.

Find the equation of the stright line passing throught the point (2,-3) and parallel to the straight line 3x-4y =0.

The coordinates of the points A,B,C and D are (-2,3), (8,9), (0,4) and (3,0) respectively . Find the ratio in which the line -segment overline(AB) is divided by the line -segment overline(CD) .

If O is the origin and A(2, 3, 1), B(1, 1, -5) are two given points then show that the straight line OA is perpendicular to the straight line OB.

Let A(2, -3, -1), B(4, 5, 2), C(-3, 4, 1) and D(2, 3, 5) are four given points. Find direction cosines of a straight line which is perpendicular to both the straight line AB and CD.