The number of triangles that can be formed with 10 points as vertices `n` of them being collinear, is 110. Then `n` is

The number of triangles in a complete graph with 10 non collinear vertices is

The number of triangles in a complete graph with 10 non - collinear vertices is :

The number of straight lines can be formed through any two points out of 10 points of which 7 are collinear

Let T_n denote the number of triangles which can be formed using the vertices of a regular polygon of n sides . If T_(n+1)-T_n=21 , then n equals :

The number of triangles that are formed by choosing the vertices from a set of 12 points , seven of which lie on the same line, is :

The sides AB, BC BC, CA of triangles ABC have 3 4 and 5 interior points respectively on them . The toal number of triangles that can be constructed by using these points as vertices is :

Consider a polygon of sides 'n' which satisfies the equation 3*^(n)P_(4)=^(n-1)P_(5) . Q. Number of quadrilaterals thatn can be formed using the vertices of a polygon of sides 'n' if exactly 1 side of the quadrilateral in common with side of the n-gon, 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 :

Total number of 480 that are of the form 4n+2, n ge 0 , is equal to