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

What can be said if two coplanar lines do not intersect each other?

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

The number of equivalence relations that can be defined on set {a, b, c}, is

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

Given the linear equation 2x+3y-8=0 , write another linear equation in two variables such that the geometrical representation of the pair so formed is: (1) intersecting lines (2) parallel lines (3) coincident lines

I and m are two parallel lines intersected by another pair of parallel lines p and show that triangle ABC = triangle CDA

The parallelogram is cut by two sets of m lines parallel to its sides. The numbers parallelogram 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)} .

The distance between the two parallel lines is 1 unit. A point A is chosen to lie between the lines at a distance 'd' from one of them Triangle ABC is equilateral with B on one line and C on the other parallel line. The length of the side of the equilateral triangle is

State whether each of the following set is finite or infinite: The set of lines which are parallel to the x-axis