A physical energy of the dimension of length that can be formula out of `c,G` and `(e^(2))/(4 pi epsilon_(0))` is [`c` is velocity of light `G` is universal constant of gravitation e is charge

A physical quantity of the dimension of length that can be formed out of c,G and (e^(2))/(4 pi epsilon_(0)) is [ c is velocity of light G is universal constant of gravitation, e is charge

If the energy of a photon is E, then its momentum is (c is velocity of light )

The dimension of the quantity 1/epsilon_0 e^2/(hc) is (e charge of electron,h Planck's constant and c=velocity of light)

Find the dimensions of Gepsilon_(0) (G = Universal Gravitational constant, epsilon_(0)= permitivity in vaccum).

The dimensions of length are expressed as G^(x)c^(y)h^(z) , where G, c and h are the universal gravitational constant, speed of light and Planck's constant respectively, then :

A quantity f is given by f=sqrt((hc^(5))/(G)) where c is speed of light, G universal gravitational constant and h is the Planck's constant. Dimension of f is that of:

The dimension of stooping potential V_(0) in photoelectric effect In units of Planck's constant 'h', speed of light 'c' and Gravitational constant 'G' and ampere A is:

If int x^(5)e^(-x^(2))dx = g(x)e^(-x^(2))+C , where C is a constant of integration, then g(-1) is equal to

Calculate the ratio of electric and gravita-tional forces between two electrons. (charge of the electron (e) = 1.6 xx 10^(-19) c , mass of the electron (m) = 9.1 xx 10^(-31) kg, (1)/(4pi epsilon_(0)) = 9 xx 10^(9) Nm^(2)C^(-2) , universal gravitational constant G = 6.67 xx 10^(-11) Nm^(2) kg^(-2) )

The bohr radius is given by a_(0) = (epsilon_(0)h^(2))/(pi m e^(2)) verify that the RHS has dimesions of length