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5.E: The Harmonic Oscillator and the Rigid Rotor (Exercises)

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  • Solutions to select questions can be found online.


    Calculate the reduced mass of HCl molecule given that the mass of H atom is 1.0078 amu and the mass of Cl atom is 34.9688 amu. Note that 1 amu = 1.660565*10-27 kg.


    \[\mu = \dfrac{m_1m_2}{m_1+m_2} \nonumber \]

    \[\mu = \dfrac{1.0078\; amu \times 34.9688\; amu}{1.0078\; amu +34.9688\; amu} = 0.9796 \;amu \nonumber \]

    \[\mu =0.9796 \;amu \times \dfrac{1.660565 \cdot 10^{-27} \;kg}{1\;amu} =1.627 \times 10^{-27} kg \nonumber \]


    Calculate the reduced mass for the Br2, Cl2, and I2 diatomics.


    From the periodic table, the atomic masses for Br, Cl, and I are 79.904, 35.453, and 126.904 respectively.

    Covert the atomic mass to kg.

    \(Br= (79.904 \, amu)(1.6606 \times 10^{-27} \,amu/kg)=1.327 \times 10^{-25}\;kg\) \(Cl= (35.453 \, amu )(1.6606 \times 10^{-27} \,amu/kg )=5.887 \times 10^{-26}\;kg\) \(I= (126.904 \, amu )(1.6606 \times 10^{-27} \,amu/kg )=2.107 \times 10^{-25}\;kg\)


    \[\mu=\dfrac{m}{2} \nonumber \]


    μBr2=1.327x10-25 kg/2=6.635x10-26 kg μCl2= 5.887x10-26kg/2 = 2.9435x10-26kg μI2=2.107x10-25kg=1.0535x10-25kg


    The equation for a reduced mass (\(\mu\)) of a diatomic is

    \[ \mu= \dfrac{m_1m_2}{m_1+m_2} \nonumber \]

    for a diatomic molecule with identical atoms (\(m_1=m_2=m\)) so



    79Br79Br has a force constant of \(240\,N \cdot m^{-1}\). Given this information:

    1. Calculate the fundamental vibrational frequency and
    2. Calculate the 79Br79Br zero point energy.

    We must first know which formula to use which is

    \[\nu_{obs}=\dfrac{1}{2π} \sqrt{\dfrac{k}{\mu}} \nonumber \]

    calculate the reduced mass

    \[\mu=\dfrac{(79\; amu)^2}{79 \;amu+ 79 \;amu}=39.5 amu \nonumber \]

    and convert to Kg:

    1.66e-27 kg•amu-1

    substitute the given values

    \[\nu=\dfrac{1}{2π} \sqrt{\dfrac{ 240 kg \;m \;s^{-2} \;s }{39.5 amu \times 1.66 \times 10^{-27} kg \;amu^{-1}}} = 9.63 \times 10^{12} s^{-1} \nonumber \]

    It can also be convert to wavenumber (inverse centimeter \(cm^{-1}\)):

    \[ \nu_{cm^{-1}}=\dfrac{1}{\lambda}=\dfrac{\nu}{c}=\dfrac{9.63\times 10^{12} s^{-1}}{3.0\times 10^{10} cm\;s^{-1}}=321 cm^{-1} \nonumber \]

    Zero Point Energy:

    \[E_{0}=\dfrac{1}{2}h\nu= \dfrac{1}{2}hc\nu_{cm^{-1}} \nonumber \] (formula to use)


    E0= 3.19e-21J


    Prove that the second derivative of an even function is even and odd function is odd.


    This is an example..not a proof

    The following is an even function:

    \[y(x) = a + bx^2 + cx^4 + dx^6 \nonumber \]


    \[\dfrac{dy}{dx}= 2bx + 4cx^3 + 6dx^5 \nonumber \]


    \[\dfrac{d^2y}{dx^2}= 2b + 12cx^2 + 30dx^4 \nonumber \]

    which is an even function.

    The following is an odd function:

    \[f(x)= ax + bx^3 + cx^5 \nonumber \]


    \[\dfrac{df}{dx}= a + 3bx^2 + 5cx^4 \nonumber \]


    \[ \dfrac{d^2f}{dx^2}= 6bx + 10cx^3 \nonumber \]

    which is an odd function.


    The Harmonic oscillator Hamiltonian obeys the reflective property:

    \[\hat{H}(x) = \hat{H}(-x) \nonumber \]

    What does this say about the nature of the harmonic oscillator wave function?


    The harmonic oscillator switches from odd to even due to the fact that the reflective property will alternate.


    If \(\langle x \rangle\) is an odd function, what does that say about \(p_x\)?

    Hint: use

    \[\dfrac{d \langle p_x \rangle }{dt} = \left\langle\dfrac{-dV}{dx} \right \rangle \nonumber \]

    also known as Ehrenfest's Theorem, where \(V\) is the potential of a one dimensional harmonic oscillator.

    Hence, \(\langle p_x \rangle \) does not depend on time.


    Convert \(\nabla^2\) from Cartesian coordinates to cylindrical coordinates.


    We have to start with the conversion of Cartesian coordinates \(\{x, y, z\}\) to cylindrical coordinates \(\{r, \theta , z\}\)

    \(x = r\cos\theta\) \(y = r\sin\theta\) \(z = z\)


    Now putting it all together

    \(\nabla^2 = \dfrac{d^2}{dr^2} + \dfrac{1}{r}\dfrac{d}{dr} + \dfrac{1}{r^2}\dfrac{d^2}{d\theta^2} + \dfrac{d^2}{dz^2}\)

    \(r = \sqrt{x^2+y^2}\)

    \(\cos\theta = \dfrac{x}{\sqrt{x^2+y^2}}\)

    \(\sin\theta = \dfrac{x}{\sqrt{x^2+y^2}}\)

    Now by chain rule we get

    \(\dfrac{d}{dx} = \dfrac{dr}{dx}\dfrac{d}{dr} + \dfrac{d\theta}{dx}\dfrac{d}{d\theta}\)

    \(\dfrac{d}{dy} = \dfrac{dr}{dy}\dfrac{d}{dr} + \dfrac{d\theta}{dy}\dfrac{d}{d\theta}\)

    \(\dfrac{dr}{dx} = \dfrac{x}{r} = \cos\theta\)

    \(\dfrac{dr}{dx} = \sin\theta\)

    using implicit differentiation and taking the second derivatives will yield

    \(\dfrac{d^2}{dx^2} = \left(\cos\theta\dfrac{d}{dr} - \dfrac{\sin\theta}{r} \dfrac{d}{d\theta}\right)\left(\cos\theta\dfrac{d}{dr} - \dfrac{\sin\theta}{r} \dfrac{d}{d\theta}\right)\)

    \(\dfrac{d^2}{dy^2} = \left(\sin\theta\dfrac{d}{dr} + \dfrac{\cos\theta}{r} \dfrac{d}{d\theta}\right)\left(\sin\theta\dfrac{d}{dr} + \dfrac{\cos\theta}{r} \dfrac{d}{d\theta}\right)\)

    \(\dfrac{d^2}{dz^2} = \dfrac{d^2}{dz^2}\)


    Find the magnitude of angular momentum and the \(z\) component of angular momentum for electrons in a hydrogen-like species with

    1. quantum numbers \(n \ = \ 1\), \(l \ = \ 0\), \( m \ = \ 0\); and
    2. \( n \ = \ 2\), \( l \ = \ 0\), \( m \ = \ 0\).

    Compare your answers and explain your results.


    The wave function for this problem is given by:

    \[\psi_{100}=R(r)_{10}Y(\theta,\phi)_{00}=2\left(\frac{Z}{2a_0}\right)^\frac{3}{2}e^\frac{-Zr}{a_0} \nonumber \]

    Using that:

    \[\hat{L}^{2}Y_{lm}(\theta, \phi)=\hbar^{2}l(l+1)Y_{lm}(\theta,\phi), \nonumber \]


    \[\hat{L_z}=m\hbar \nonumber \]

    Then \(\hat{L}^{2}=0\) and \(\hat{L_z}=0\). Given that the values for \(l\) and \(m\) are the same as above, the answers would also be the same.

    The reason why both answers are the same is that the operators for angular momentum only act on the angular part of the wave function. Since only the quantum number \(n\) varied between these two states, the angular momentum eigenvalues did not change.


    Apply the angular momentum operator in the x direction to the following functions (\(Y(\theta,\phi)\)).

    1. \(\dfrac{5\pi}{4} + 7\exp(\pi^2) \)
    2. \(3\pi \sin(\theta) \)
    3. \(\dfrac{3}{2}\cos(\theta)\exp(i\phi)\)

    Let us begin by stating the angular momentum operator in terms of \(\theta\) and \(\phi\).

    \[\hat{L_x} = i\hbar\Big(\sin(\phi)\dfrac{\partial}{\partial \theta} + \cot(\theta)\cos(\phi)\dfrac{\partial}{\partial \phi}\Big) \nonumber \]

    a) \(Y(\theta,\phi) = \dfrac{5\pi}{4} + 7exp(\pi^2) \)

    \[\hat{L_x}(\dfrac{5\pi}{4} + 7exp(\pi^2)) = i\hbar\Big(\sin(\phi)\dfrac{\partial \dfrac{5\pi}{4} + 7exp(\pi^2)}{\partial \theta} + \cot(\theta)\cos(\phi)\dfrac{\partial \dfrac{5\pi}{4} + 7exp(\pi^2)}{\partial \phi}\Big) \nonumber \]

    \[ = 0 \nonumber \]

    The function does not depend on \(\theta\) or \(\phi\) so when the angular momentum operator is applied to the function, it equals 0.

    b) \(Y(\theta,\phi) = 3\pi \sin(\theta) \)

    \[\hat{L_x}(3\pi \sin(\theta)) = i\hbar\Big(\sin(\phi)\dfrac{\partial}{\partial \theta}3\pi \sin(\theta) + \cot(\theta)\cos(\phi)\dfrac{\partial}{\partial \phi}3\pi \sin(\theta)\Big) \nonumber \]

    \[ = 3i\pi\hbar \sin(\phi)\cos(\theta) \nonumber \]

    c) \(Y(\theta,\phi) = \dfrac{3}{2}\cos(\theta)exp(i\phi)\)

    \[\hat{L_x}(3\pi \sin(\theta)) = i\hbar\Big(\sin(\phi)\dfrac{\partial}{\partial \theta}\dfrac{3}{2}\cos(\theta)exp(i\phi) + \cot(\theta)\cos(\phi)\dfrac{\partial}{\partial \phi}\dfrac{3}{2}\cos(\theta)exp(i\phi)\Big) \nonumber \]

    \[ = i\hbar\Big( \dfrac{-3}{2}\sin(\phi)\sin(\theta)exp(i\phi) + \dfrac{3i}{2}\cot(\theta)\cos(\phi)\cos(\theta)exp(i\phi)\Big) \nonumber \]

    \[ = \dfrac{3i\hbar exp(i\phi)}{2}(i\cot(\theta)\cos(\phi)\cos(\theta) - \sin(\phi)\sin(\theta)) \nonumber \]


    Use the fact that \(\hat x\) and \(\hat p\) are Hermitian in the number operator

    \[ \hat a_- = \dfrac{1}{\sqrt{2}}(\hat x +i\hat p) \nonumber \]

    \[\hat a_+ = \dfrac{1}{\sqrt{2}}(\hat x -i\hat p) \nonumber \]


    \[\hat H=\dfrac{\hbar w}{2}(\hat a_-\hat a_+ + \hat a_+\hat a_-) \nonumber \]

    Show that

    \[\int \psi^*_v \hat{v} \psi dx \geq 0 \nonumber \]


    Determine the unnormalized wave function \(\psi_\circ \big(x\big)\) given that \(\hat{a}_- = 2^{-1/2}\big(\hat{x}+i\hat{p}\big) \) and that \(\hat{a_-}\psi_\circ = 0\) Then find the unnormalized wave function for \(\psi_1\big(x\big)\) using \(\hat{a}_+\).


    It was given that \(\hat{a}_-\psi_\circ = 0\), so substituting in \(\hat{a}_-\) so we know

    \[\hat{a_-} = 2^{-1/2}\big(\hat{x}+i\hat{p}\big) \psi_\circ = 0 \nonumber \]

    We can expand and simplify this expression to a first order partial differential equation

    \[x\psi_\circ + \dfrac{d\psi_\circ}{dx} = 0 \nonumber \]

    Solve by separating like terms

    \[\dfrac{d\psi_\circ}{\psi_\circ} = -xdx \nonumber \]

    Solving this equation for \(\psi_\circ \big(x\big)\) we find that

    \[\psi_\circ = e^\dfrac{-x^2}{2} \nonumber \]

    To solve for \(\psi_1\) we understand that \(\psi_1\backsim\hat{a_+}\psi_\circ\backsim\hat{x}-i\hat{p}\psi_\circ\), as well as that

    \[\hat{x}-i\hat{p}\psi_\circ = x\psi_\circ - \dfrac{d\psi_\circ}{dx} = 2xe^\dfrac{-x^2}{2}=2x\psi_\circ \nonumber \]

    So then we can say

    \[\boxed{\psi_1\backsim xe^\dfrac{-x^2}{2}} \nonumber \]


    Find the reduced mass of an electron in a Tritium atom. Set the mass of the Tritium to be \(5.008267 \times 10^{-27}\, kg\). Then find the value of the Rydberg constant for the Tritium atom.


    To solve, use the reduced mass equation, and for mass 1 enter the mass of the electron, and for mass 2 enter the mass of the Tritium atom:

    \[\mu = \dfrac{m_1m_2}{m_1+m_2} \nonumber \]

    For which one attains a value of \(\mu = 9.1077 x 10^{-31} kg\)


    The mass of a deuterium atom is \(3.343586 \times 10^{-27}\; kg\). First calculate the reduce mass of the deuterium atom. Then using the reduced mass calculated find the Rydberg constant for a deuterium atom.


    \(\mu\) = reduced mass

    \[\mu_{deuterium} = \dfrac{(9.109390 \times 10^{-31} kg) ( 3.343586\times 10^{-27}kg)}{(9.109390 \times 10^{-31} kg + 3.343586\times 10^{-27}kg )} \nonumber \]

    \[\mu_{deuterium} = 9.106909 \times 10^{-31}kg = 0.9997277 m_e \nonumber \]

    \(R_H\) = Rydberg constant

    \[R_H = (109,737.2 cm^{-1}) (0.9997277 m_e) = 109,707.3 cm^{-1} \nonumber \]


    What is the ratio of the frequency of spectral lines of C-14 that has been ionized 5 times and C-12 that has been ionized 5 times?


    Carbon that has been ionized 5 times is a hydrogen like ion, so we can use the Bohr model to find the desired ratio.

    \[E = \dfrac{uZ^2e^4n^2}{8ε_0^2h^3c} \nonumber \]

    gives the placement of spectral lines. The coefficient of n2 is proportional to the frequency of these lines, so the ratio of EC-14/Ec-12 will give the ratio of frequency of the lines. The only difference between these two isotopes is the reduced mass u. So the problem reduces to uC-14/ uC-12. Mass in amu is used below. me = mass of electron = 5.4858*10-4 amu.

    \[\mu_{C-14} = \dfrac{m_em_{c-14}}{m_e + m_{c-14}} = \dfrac{(14.003)(5.4858 \times 10^{-4})}{14.003 + 5.4858 \times 10^{-4}} = 5.485585 \times 10^{-4} \nonumber \]

    \[\mu_{C-12} = \dfrac{m_em_{c-12}}{m_e + m_{c-12}}= \dfrac{(12)(5.4858 \times 10^{-4})}{12 + 5.4858 \times 10^{-4}} = 5.485549 \times 10^{-4} \nonumber \]

    \[\dfrac{\mu_{C-14}}{\mu_{C-12}} = 1.0000065 \nonumber \]


    Calculate the Rydberg constant for a deuterium atom and atomic hydrogen given the reduced mass of a deuterium atom is \(9.106909 \times 10^{-31} kg\) and the reduced mass of hydrogen is \(9.104431 \times 10^{-31} kg\). Compare both of these answers with the experimental result (\(109677.6 cm^{-1}\)). Then determine the ratio of the frequencies of the lines in the spectra of atomic hydrogen and atomic deuterium.


    The Rydberg constant is found using

    \[R_H=\dfrac{me^4}{8\epsilon_o^2 ch^3} \nonumber \]

    For a deuterium atom


    \[R_H=\dfrac{(9.104431 \times 10^{-31}kg)(1.602 \times 10^{-19} C)^4}{8(8.854 \times 10^{-12} \dfrac{F}{m})^2(2.998 \times 10^{8} \dfrac{m}{s})(6.626 \times 10^{-34} J \cdot s)^3} \nonumber \]

    \[R_H=109707.3 cm^{-1} \nonumber \]

    This is different by \( 2.7 \times 10^{-2}\%\).

    The ratio of the frequencies of the lines in the spectra of atomic hydrogen and atomic deuterium is equivalent to the ratio of the Rydberg constants we just found.

    \[\dfrac{109707.3\; cm^{-1}}{109677.5\; cm^{-1}}=1.000272 \nonumber \]

    \[R_H=\dfrac{(9.106909 \times 10^{-31}kg)(1.602 \times 10^{-19} C)^4}{8(8.854 \times 10^{-12} \dfrac{F}{m})^2(2.998 \times 10^{8} \dfrac{m}{s})(6.626 \times 10^{-34} J \cdot s)^3} \nonumber \]

    \[R_H=109677.5 cm^{-1} \nonumber \]

    This is different by \( 9.1\times 10^{-5}\%\).

    For a hydrogen atom


    Find the reduced mass of HCl where the mass of hydrogen in 1 amu and the mass of chloride is 35 amu.


    \[\mu = \dfrac{m_1 \times m_2}{m_1 + m_2} \nonumber \]

    \[\mu = \dfrac{(1.00)(35.00)}{36.00} 1.603 \times 10^{-27} kg = 1.558 \times 10^{-27} kg \nonumber \]

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