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1.5: Problems

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    141978

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    1. "Maxwellons",Consider a standard deck of 52 playing cards dealt into four hands of 13 cards each. If a given suit distribution within a hand represents a macrostate while a specific set of cards within a suit represents a microstate, find
      1. the number of possible macrostates for each hand,
      2. the number of microstates allowed for each macrostate, and
      3. the most probable macrostate.
    2. Consider a space with three cells of size 2h3, and nine particles. Find the total number of macrostates, the total number of microstates, and the most probable macrostate, assuming the particles are
      1. "Maxwellons",
      2. fermions, and
      3. bosons.
    3. Given that

      \(d N=B\left(\exp \frac{w}{k T}+\phi\right)^{-1} d p_x d p_y d p_z\) and that \(\mathrm{w}=\left(\boldsymbol{p}_{\mathrm{x}}^2+\boldsymbol{p}_{\mathrm{y}}^2+\boldsymbol{p}_{\mathrm{z}}^2\right) / \mathrm{m}\), find an expression for B in terms of N for the cases where \(\phi=0\), \(\pm 1\).

    4. Derive the equation of state for a Fermi gas from first principles.
    5. Given that \(f(x)\) is an analytic function in the interval \(0 \leq \mathrm{x} \leq 4\), show that \(f(x)\) can be represented in terms of the moments of the function \(\boldsymbol{M}_{\mathrm{i}}[f(x)]\), where \(M_i[f(x)] \equiv \int_0^{\infty} x^i f(x) d x\)
    6. If the pressure tensor P has the form specified by equation (1.2.25), show that it can be rewritten as it appears in equation (1.2.24) (i.e., as the tensor operated on by the divergence operator in the third term on the left-hand side).
    7. Show that the Virial theorem holds in the form given by equation (1.2.35) even if the forces of interaction include velocity dependent terms (i.e., such as Lorentz forces or viscous drag forces).
    8. Show that the second velocity moment of the Boltzmann transport equation leads to an equation describing the conservation of energy.

    This page titled 1.5: Problems is shared under a Public Domain license and was authored, remixed, and/or curated by George W. Collins II (Pachart Foundation) via source content that was edited to the style and standards of the LibreTexts platform.