Bohr Model Calculator

The Bohr Model Calculator is a tool that can be used to compute the frequency of an electromagnetic wave that is emitted or absorbed at the transition of an electron in an atom. In the text below, we explain the principles of the Bohr model and the definition of a hydrogen-like atom. Read on to investigate this theory further and learn about the relationship between frequency and energy.

We have known for a long time that nature is composed of a huge number of atoms. However, the discovery of the actual atomic structure took place relatively recently. The first theory that correctly describes the simplest atom, hydrogen, was proposed in 1913 and was called the Bohr Model. In this model, the atom consists of a nucleus surrounded by electrons, like the sun and planets in the solar system. The Bohr model definition comprises four points:

1. The electron is held in a circular orbit around the nucleus by Coulomb's force. You may read more about this in our Coulomb's law calculator.
2. Angular momentum of the orbiting electron is quantized. It means that the electron can only have specific energies on its orbital.
3. The electron can orbit without losing energy due to radiating, but only on a certain discrete set of distances from the nucleus. Every orbital is associated with specific energy, which is called an energy level.
4. The electron can jump between different energy levels by absorbing or emitting the photon - electromagnetic radiation. Its energy is determined by the difference between the initial and the final energy level. Check out our Photon Energy Calculator to find out how you can convert the frequency of the electromagnetic wave into energy.

You can compute the frequency of an electromagnetic wave emitted or absorbed by an electron with the following Bohr model equation:

ΔE = E2 - E1 = h × f

where

• E2 is the initial energy level of the electron,
• E1 is the final energy level of the electron,
• ΔE is the difference between those energies,
• f is the frequency of absorbed/emitted electromagnetic wave,
• h is the Planck's constant which equals h = 6.6261 × 10^(-34) J ⋅ s.

When the final energy level is smaller than the initial energy level, the energy difference is ΔE > 0, and thus electron will emit the electromagnetic wave. Otherwise, when ΔE < 0 electron needs to absorb the electromagnetic wave. Remember that the energy levels of the electrons bound to the atom are negative!

The Bohr model is a simplified theory that correctly describes atoms with only one electron orbiting around the nucleus (hydrogen-like atoms). The energy of the lowest orbit in the hydrogen atom is -13.6 eV, and the second lowest energy is -3.4 eV. You can check it with our Hydrogen Energy Levels Calculator. The energy difference between those orbits equals ΔE = 10.2, and it corresponds to the frequency f = 2466.3 THz ≈ 2.5 × 10^(15) Hz, which is astonishingly high!