30.3 Bohr’s theory of the hydrogen atom (Page 5/14)

College physics Page 5 / 14

E_{n} = \frac{1}{2} m_{e} v^{2} - k \frac{{Zq}_{e}^{2}}{r_{n}} .

Now we substitute $r_{n}$ and $v$ from earlier equations into the above expression for energy. Algebraic manipulation yields

E_{n} = - \frac{Z^{2}}{n^{2}} E_{0} (n = 1, 2, 3, ...)

for the orbital energies of hydrogen-like atoms . Here, $E_{0}$ is the ground-state energy $(n = 1)$ for hydrogen $(Z = 1)$ and is given by

E_{0} = \frac{{2 π}^{2} q_{e}^{4} m_{e} k^{2}}{h^{2}} = 13.6 eV.

Thus, for hydrogen,

E_{n} = - \frac{13.6 eV}{n^{2}} (n = 1, 2, 3, ...).

[link] shows an energy-level diagram for hydrogen that also illustrates how the various spectral series for hydrogen are related to transitions between energy levels.

An energy level diagram is shown. At the left, there is a vertical arrow showing the energy levels increasing from bottom to top. At the bottom, there is a horizontal line showing the energy levels of Lyman series, n is one. The energy is marked as negative thirteen point six electron volt. Then, in the upper half of the figure, another horizontal line showing Balmer series is shown when the value of n is two. The energy level is labeled as negative three point four zero electron volt. Above it there is another horizontal line showing Paschen series. The energy level is marked as negative one point five one electron volt. Above this line, some more lines are shown in a small area to show energy levels of other values of n. — Energy-level diagram for hydrogen showing the Lyman, Balmer, and Paschen series of transitions. The orbital energies are calculated using the above equation, first derived by Bohr.

Electron total energies are negative, since the electron is bound to the nucleus, analogous to being in a hole without enough kinetic energy to escape. As $n$ approaches infinity, the total energy becomes zero. This corresponds to a free electron with no kinetic energy, since $r_{n}$ gets very large for large $n$ , and the electric potential energy thus becomes zero. Thus, 13.6 eV is needed to ionize hydrogen (to go from –13.6 eV to 0, or unbound), an experimentally verified number. Given more energy, the electron becomes unbound with some kinetic energy. For example, giving 15.0 eV to an electron in the ground state of hydrogen strips it from the atom and leaves it with 1.4 eV of kinetic energy.

Finally, let us consider the energy of a photon emitted in a downward transition, given by the equation to be

Δ E = hf = E_{i} - E_{f} .

Substituting $E_{n} = (- 13.6 eV / n^{2})$ , we see that

hf = (13.6 eV) (\frac{1}{n_{f}^{2}} - \frac{1}{n_{i}^{2}}) .

Dividing both sides of this equation by $hc$ gives an expression for $1 / λ$ :

\frac{hf}{hc} = \frac{f}{c} = \frac{1}{λ} = \frac{(13.6 eV)}{hc} (\frac{1}{n_{f}^{2}} - \frac{1}{n_{i}^{2}}) .

It can be shown that

(\frac{13.6 eV}{hc}) = \frac{(13.6 eV) (1.602 \times 10^{−19} J/eV)}{(6.626 \times 10^{−34} J·s) (2.998 \times 10^{8} m/s)} = 1.097 \times 10^{7} m^{–1} = R

is the Rydberg constant . Thus, we have used Bohr’s assumptions to derive the formula first proposed by Balmer years earlier as a recipe to fit experimental data.

\frac{1}{λ} = R (\frac{1}{n_{f}^{2}} - \frac{1}{n_{i}^{2}})

We see that Bohr’s theory of the hydrogen atom answers the question as to why this previously known formula describes the hydrogen spectrum. It is because the energy levels are proportional to $1 / n^{2}$ , where $n$ is a non-negative integer. A downward transition releases energy, and so $n_{i}$ must be greater than $n_{f}$ . The various series are those where the transitions end on a certain level. For the Lyman series, $n_{f} = 1$ — that is, all the transitions end in the ground state (see also [link] ). For the Balmer series, $n_{f} = 2$ , or all the transitions end in the first excited state; and so on. What was once a recipe is now based in physics, and something new is emerging—angular momentum is quantized.

Triumphs and limits of the bohr theory

Bohr did what no one had been able to do before. Not only did he explain the spectrum of hydrogen, he correctly calculated the size of the atom from basic physics. Some of his ideas are broadly applicable. Electron orbital energies are quantized in all atoms and molecules. Angular momentum is quantized. The electrons do not spiral into the nucleus, as expected classically (accelerated charges radiate, so that the electron orbits classically would decay quickly, and the electrons would sit on the nucleus—matter would collapse). These are major triumphs.

Questions & Answers

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Source: OpenStax, College physics. OpenStax CNX. Jul 27, 2015 Download for free at http://legacy.cnx.org/content/col11406/1.9

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