For an electron in a hydrogen atom , t...

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)` ?

`e^(2)`

`(1)/(e^(2))`

Zero

Text Solution

Verified by Experts

The correct Answer is:

Similar Questions

Explore conceptually related problems

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

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

A region in space around the nucleus of an atom where the probability of finding the electron is maximum is called

If a_(0) is the Bohr radius, the radius of then n=2 electronic orbit in triply ionized beryllium is

The first orbital of H is represented by: psi=(1)/(sqrtpi)((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 :

The angular momentum J of the electron in a hydrogen atom is proportional to n^(th) power of r (radius of the orbit) where n is :-

The most probable radius (in pm) for finding the electron in He^(+) is.

The probability of finding out an electron at a point within an atom is proportional to the

In terms of Bohr radius a_(0) , the radius of the second Bohr orbit of a hydrogen atom is given by

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)` ?

Text Solution

Similar Questions

Recommended Questions