If `E, M, L and G` denote energy, mass, angular momentum and gravitational constant respectively, then the quantity `(E^(2)L^(2)//M^(5)G^(2))` has the dimensions of

If E, M, L and G denote energy, mass, angular momentum and gravitational constant repectively then the quantity (E^(2)L^(2)//M^(5)G^(2)) has the dimensions of :-

E.M.F has dimensions of

If E , M , J , and G , respectively , denote energy , mass , angular momentum , and gravitational constant , then EJ^(2) //M^(5) G^(2) has the dimensions of

If E , M , J , and G , respectively , denote energy , mass , angular momentum , and gravitational constant , then EJ^(2) //M^(5) G^(2) has the dimensions of

If E , M , J , and G , respectively , denote energy , mass , angular momentum , and gravitational constant , then EJ^(2) //M^(5) G^(2) has the dimensions of

If E , M , J , and G , respectively , denote energy , mass , angular momentum , and gravitational constant , then EJ^(2) //M^(5) G^(2) has the dimensions of

In the expression P =E L^2 m^(-5) G^(-2), E, m, L and G denote energy, mass, angular momentum and gravitational constant, respectively. Show that P is a dimensionless quantity.

If E_n and L_n denote the total energy and the angular momentum of an electron in the nth orbit of Bohr atom, then

The Energy (E) angular momentum (L) and universal gravitational constant (G) are chosen as fundamental quantities. The dimensions of universal gravitational constant in the dimensional formula of Planks constant (h) is

If J is the angular momentum and E is the kinetic energy, then (J^2)/E has the dimensions of