The number of parallelograms that can be formed from a set of four parallel lines intersecting another set of three parallel line intersecting another set of three parallel lines is:

l and m are two parallel lines intersected by another pair of parallel lines p and q . Show that DeltaABC~= DeltaCDA .

l and m are two parallel lines intersected by another pair of parallel lines p and q. Show that triangleABC ~= triangleCDA

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 :

m parallel lines in a plane are intersected by a family of n parallel lines. The total number of parallelograms so formed is :

The number of functions that can be formed from the set A={a, b, c, d} into the set B={1,2,3} is equal to

Find the measure of each angle indicated in each figure where l and m are parallel lines intersected by transversal n.

A parallelogram is cut by two sets of m lines parallel to the sides, the number of parallelograms thus formed is

A parallelogram is cut by two sets of m lines parallel to the sides. The number of parallelograms thus formed 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)} .

State whether the following statements are true or false : Two intersecting lines cannot both be parallel to the same line.