There are three coplanar lines. If any p points are taken on each of the lines , the maximum number of triangles with vertices at these points is :

The straight lines , l_1,l_2 and l_3 are parallel and lie in the same plane . A total number of m points are taken on l : n points on l_2 k points on l_3 The maximum number of triangle formed with vertices at these points is :

The straight lines , l_1,l_2 and l_3 are parallel and lie in the same plane . A total number of m points are taken on l : n points on l_2 k points on l_3 The maximum number of triangle formed with vertices at these points is :

There are p,q,r points on three parallel lines L_1,L_2 and L_3 respectively, all of which lie in one plane . The number of triangle which can be formed with vertices at these points is :

The maximum number of points into which 4 circles and 4 st . Lines intersect is :

There are n points in a plane of which p points are collinear. How many lines can be formed from these points?

There are 10 points in a plane of which no three points are collinear and four points are concyclic. The number of different circles that can be drawn through at least three points of these points is

There are n( gt2) points in each of two parallel lines Every point on one line is joined to every point on the other line by a line segment drawn within the lines . The number of points (between the lines) in which these segments intersect is :

There are n straight lines in a plane, no two of which are parallel, and no three pass through the same point . Their points of intersection are joined . Then the number of fresh lines thus obtained is :

There are 16 points in a plane no three of which are in a st , line except except 8 which are all in a st . Line The number of triangles that can be formed by joining them equals :