If a proton had a radius R and the charge was uniformaly fistributed , Calculate using bohr theory, the ground state energy of a H-atom When `R=10Å`

If a proton had a radius R and the charge was uniformly distributed, the ground state energy (in eV) of a H -atom for R=0.1Å is

if we assume only gravitational attraction between proton and electron in hydrogen atom and the Bohr quantizaton rule to be followed, then the expression for the ground state energy of the atom will be (the mass of proton is M and that of electron is m.)

Assume that there is no repulsive force between the electrons in an atom but the force between positive and negative charges is given by Coulomb's law as usual . Under such circumtences, calculate the ground state energy of a He-atom.

Consider the hydrogen atom to be a proton embededded in a cavity of radius (Bohr radius) whose charge is neutralised by the addition of an electron to the cavity in a vacuum initially slowly .Estimate the average total energy of an electron in to ground state .Also if the magnitude of the average kinetic energy is half of the magnitude of the average energy ,find the average potential energy

Figure shows a hemisphere of charge Q and radius R and a sphere of charge 2Q and radius R. The total potential energy of hemisphere is U_(H) and that of the sphere is U_(s) Then.

A mu-meson ("charge -e , mass = 207 m, where m is mass of electron") can be captured by a proton to form a hydrogen - like ''mesic'' atom. Calculate the radius of the first Bohr orbit , the binding energy and the wavelength of the line in the Lyman series for such an atom. The mass of the proton is 1836 times the mass of the electron. The radius of the first Bohr orbit and the binding energy of hydrogen are 0.529 Å and 13.6 e V , repectively. Take R = 1.67 xx 109678 cm^(-1)

The ionization energy of a hydrogen like Bohr atom is 4 Rydberg. If the wavelength of radiation emitted when the electron jumps from the first excited state to the ground state is N-m and if the radius of the first orbit of this atom is r-m then the value of (N)/(r )=Pxx10^(2) then, value of P . (Bohr radius of hydrogen =5xx10^(-11)m,1 Rydberg =2.2xx10^(-18)J )

Positronium is just like a H-atom with the proton replaced by the positively charged anti-particle of the electron (called the positron which is as massive as the electron). What would be the ground state energy of positronium ?

Positronium is just like a H-atom with the proton replaced by the positively charged anti-particle of the electron (called the positron which is as massive as the electron). What would be the ground state energy of positronium ?