In the Bohr model of the hydrogen atom, the energy difference between orbits decreases as the principal quantum number increases. This means that the energy difference between the n=4 and n=3 orbitals is actually smaller than the energy difference between the n=3 and n=2 orbitals.
To understand why, we can look at the formula for the energy levels of the hydrogen atom, which is given by:
E = -13.6 eV / n²
Here, n is the principal quantum number, and 13.6 eV is the energy of the ground state (n=1). The energy levels become less negative (and thus, higher) as n increases, which indicates that electrons in higher orbitals have more energy.
Now, we can calculate the energy for each orbital:
- For n=2: E2 = -13.6 eV / (2²) = -3.4 eV
- For n=3: E3 = -13.6 eV / (3²) = -1.51 eV
- For n=4: E4 = -13.6 eV / (4²) = -0.85 eV
Now we find the energy differences:
- Energy difference between n=3 and n=2: ΔE3,2 = E2 – E3 = -3.4 eV – (-1.51 eV) = -1.89 eV
- Energy difference between n=4 and n=3: ΔE4,3 = E3 – E4 = -1.51 eV – (-0.85 eV) = -0.66 eV
As we can see from the calculations, the energy difference between the n=3 and n=2 orbitals is larger than that between the n=4 and n=3 orbitals. This shows how, in the Bohr model, energy levels get closer together as the value of n increases, leading to smaller energy transitions for higher energy levels.