For an electron in a hydrogen atom, the wave function `psi` is proportional to exp, where `a_(0)` is the Bohr's radius. What is the ratio of the 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 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 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) ?

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 proparitional to exp - r//a_(p) where a_(0) is the Bohr's radius What is the radio of the probability of finding the electron at the nucless at the nucless to the probability of finding id=f at a_(p) ?

The space around the nucleus where the probability of finding an electron is maximum is called:

The first orbital of H is represented by psi=2(1/a_0)^(3/2) e^-(r/a_0) where a_0 is Bohr's radius the probability of finding the electron at a distance r from the nucleus in the region dV is

psi^2 ,( psi) the wave function resperesents the probability of finding electron . Its value depends :