OABC is a regular tetrahedron of sides unity, then

Let OABC be a regular tetrahedron with side length unity, then its volume (in cubic units) is

Let OABC be a regular tetrahedron of edge length unity. Its volume be V and 6V =sqrt(p/q) where p and q are relatively prime. The find the value of (p+q) .

ABCD is a regular tetrahedron, A is the origin and B lies on x-axis. ABC lies in the xy-plane |vec(AB)|=2 Under these conditions, the number of possible tetrahedrons is :

ABCD is a regular tetrahedron, A is the origin and B lies on x-axis. ABC lies in the xy-plane |vec(AB)|=2 Under these conditions, the number of possible tetrahedrons is :

Four small point charges (each of equal magnitude q) are placed at four corners of a regular tetrahedron of side a. find out potential energy of charge system

O A B C is regular tetrahedron in which D is the circumcentre of O A B and E is the midpoint of edge A Cdot Prove that D E is equal to half the edge of tetrahedron.

O A B C is regular tetrahedron in which D is the circumcentre of O A B and E is the midpoint of edge A Cdot Prove that D E is equal to half the edge of tetrahedron.

Draw a regular hexagon of side 5 cm.

In a regular tetrahedron, if the distance between the mid points of opposite edges is unity, its volume is

Three identical positive charges Q are arranged at the vertices of an equilateral triangle. The side of the triangle is a. Find the intensity of the field at the vertex of a regular tetrahedron of which the triangle is the base.