Two identical dipoles have their axes at right angles to each other and also bisecting each other . Calculate the field at a distance r from the point of intersection of their axes in a direction `theta` with the axis of one of the dipoles . The dipole moment of each dipole is equal to p .

The electric potential at a point on the axis of an electric dipole depends on the distance r of the point from the dipole as

4 charges are placed each at a distance ‘a’ from origin. The dipole moment of configuration is

An electric dipole is kept on the axis of a uniformly charged ring at distance d from the centre of the ring. The direction of the dipole moment is along the axis. The dipole moment is p , charge of the ring is Q & radius of the ring is R . The force on the dipole is

Two identical electric point dipoles have dipole moments vec(P_1) = p hati and vec(P_2) = p hati and are held on the x axis at distance 'a' from each other. When released, they move along the x-axis with the direaction of their dipole moments remaining unchanged. If the mass of each dipole is 'm', their speed when they are infinitely for apart is :

Two magnetic dipoles of moments 0.108 and 0.122 Am^(2) are placed along two lines drawn on the table at right angles to each other. Find the intensity at the point of intersection of their axes, their centres being 0.3 and 0.4m, respectively from the point of intersection.