Prove that if the co-ordinates of A and B be (3,2) and (-6,-4) respectively, then the line AB passes through the origin.

The coordinates of the points A and B are (2,4) and (2,6) respectively . The point P is on that side of AB opposite to the origin . If PAB be an equilateral triangle , find the coordinates of P.

(xv) Which one of the following straight line passes through the origin ?

If A and B are (1, 4) and (5, 2) respectively, find the co-ordinates of P when (AP)/(BP) = 3/4

A and B are two fixed points whose co-ordinates are (3,2) and (5,4) respectively. The co-ordinates of a point P if ABP is an equilateral triangle , are :

Show that the circle with the portion of the line 3x + 4y = 12 intercepted between the axes as diameter , passes through the origin .

The co-ordinates of A,B,C are (6,3),(-3,5)and (4,-2) respectively and P is the point (x,y) show that , (area of the /_\PBC)/(area of the /_\ABC)=|(x+y-2)/7|

If the coordinates of the points A,B,C,D be (1,2,3), (4,5,7), (-4,3,-6) and (2,9,2) respectively, then find the angle between the lines AB and CD.

Show that the straight line joining the points (-3,2) and (6,-4) passes through the origin .

Find the perpendicular bisector of AB, where the co-ordinates of A and B are (0, -5) and (2,- 3) respectively.

The differential equation of the family of lines passing through the origin is -