Radius of 2 nd shell of `He^(+) ` is
( where `a_(0)` is Bohr radius )

An electron is an excited state of Li^(2 + ) ion angular mometum 3b//2 pi . The de Broglie wavelength of the electron in this state is p pi s_(0) (where a_(0) is the bohr radius ) The value of p is

In a hypotherical Bohr hydrogen, the mass of the electron is doubled. The energy E_(0) and the radius r_(0) of the first orbit will be ( a_(0) is the Bohr radius)

In a hypotherical Bohr hydrogen, the mass of the electron is doubled. The energy E_(0) and the radius r_(0) of the first orbit will be ( a_(0) is the Bohr radius)

The radius of the orbit of an electron in a Hydrogen-like atom is 4.5 a_(0) , where a_(0) is the Bohr radius. Its orbital angular momemtum is (3h)/(2pi) . It is given that h is Plank constant and R si Rydberg constant. The possible wavelength (s) , when the atom-de-excites. is (are):

The radius of the orbit of an electron in a Hydrogen-like atom is 4.5 a_(0) , where a_(0) is the Bohr radius. Its orbital angular momemtum is (3h)/(2pi) . It is given that h is Plank constant and R si Rydberg constant. The possible wavelength (s) , when the atom-de-excites. is (are):

For an electron in a hydrogen atom, the wave function psi is proportional to exp -r//a_(0) , where a_(0) is the Bohr radius. Find the ratio of probability of finding the electron at the nucleus to the probability of finding it at a_(0) .

For an electron in a hydrogen atom, the wave function y is proportional to exp- r//a_(0) , where a_(0) is the Bohr radius. Find the ratio of probability of finding the electron at the nucleus to the probability of finding it at a_(0) .

For an electron in a hydrogen atom , the wave function Phi is proportional to e^(-r/a(0)) where a_(0) is the Bohr's radius What is the radio of the probability of finding the electron at the nucleus to the probability of finding at a_(0) ?