The total number of possible line segments having both end points located at the vertices of a given cube is

The total number of silicates possible are.

Interior point of a line segment

(ii) No two line segments with a common end points are coincident.

Consider a rectangle ABCD having 5, 7, 6, 9 points in the interior of the line segments AB, CD, BC, DA respectively. Let alpha be the number of triangles having these points from different sides as vertices and beta be the number of quadrilaterals having these points from different sides as vertices. Then (beta-alpha) is equal to :

The number of points, having both coordinates are integers, that lie in the interior of the triangle with vertices (0,0), (0,41) and (41, 0) is

Write the names of six line segments. In the given diagram, name the point(s)

The total number of living organisms, both plants and animals, in a given area is called :

A radius of a circle is a line segment with one end point………and the other end point………..