Find the expression of radius of an orbit of electron in terms of nucleus charge `Q_2`, tangential velocity v and mass of electron `m_e` ?

In an atom the ratio of radius of orbit of electron to the radius of nucleus is

Mention the charge, mass and e/m ratio for an electron.

The ratio of the radius of the Bohr orbit for the electron orbiting the hydrogen nucleus that of the electron orbiting the deuterium nucleus is approximately

Two electrons of mass m each orbit around a nucleus of mass 80m such that both the electrons are always at two diametric opposite points in their single circular orbit around the nucleus. The ratio of gravitational force between two electron i=and the nucleus to that between the two electron is K . What is the value of K?

Give the expression for the velocity of electron in the first orbit of hydrogen atom for the radius in the ground state of hydrogen atom. Hence, derive the expression for the magnetic field (B) at the centre of the nucleus due to the circular motion of electron.

The orbital having zero probability of finding electron on the surface of nucleus is

If epsilon_(0) be the permittivity of vacuum and r be the radius of orbit of H- atom in which electron is revolving, then velocity of electron is given by :

If the radius of an orbit is r and the velocity of electron in it is v , then the frequency of electron in the orbit will be

The electric current I created by the electron in the ground state of H atom bohr model in terms of bohr radius (a_0) and velocity of electron in first orbit v_0 is

What would be the charge in radius of n^"th" orbit, if the mass of electron reduces to half of its original value ?