If n lines are drawn in a plane such that no two of them are parallel and no three of them are concurrent, such that these lines divide the planein 67 parts, then find number of different points at which these lines will cut.

If 20 lines are drawn in a plane such that no two of them are paralled and no there are concurrent, in how many points will thay intersect each other ?

Six straight lines are in a plane such that no two are parallel & no three are concurrent. The number of parts in which these lines divide the plane will be

Some points are plotted on a plane such that any three of them are non collinear. Each point is joined with all remaining points by line segments. Find the number of points if the number of line segments are 10.

There are n straight lines in a plane in which no two are parallel and no three pass through the same point. Their points of intersection are joined. Show that the number of fresh lines thus introduced is 1/8n(n-1)(n-2)(n-3)

There are 2n points in a plane in which m are collinear. Number of quadrilateral formed by joining these lines

There are 12 points in a plane in which 6 are collinear. Number of different straight lines that can be drawn by joining them, is

4 points out of 11 points in a plane are collinear. Number of different triangles that can be drawn by joining them, is

State the number of lines passing through three distinct non-collinear points.

In a plane there are 37 straight lines, of which 13 pass pass through the point B. Besides, no three lines passes both points A and B and no two are parallel, then the line passes through both points A and B and number of intersection points the lines have, is

There are n straight lines in a plane such that n_(1) of them are parallel in onne direction, n_(2) are parallel in different direction and so on, n_(k) are parallel in another direction such that n_(1)+n_(2)+ . .+n_(k)=n . Also, no three of the given lines meet at a point. prove that the total number of points of intersection is (1)/(2){n^(2)-sum_(r=1)^(k)n_(r)^(2)} .