Answer to Question #164747 in Quantum Mechanics for Kumar

a) The particles of an ideal gas that is not subjected to any potential only have kinetic energy. Each of the particles has an equal probability to move along the x, y and z directions of 3D space. So, it has three degrees of freedom. Therefore, the average kinetic energy of a particle is given by:

K="\\frac{3}{2}"k_BT

The kinetic energy can also be expressed as:

K="\\frac{1}{2}mv^2" , where m is the mass of the particle, v is the root-mean-square velocity of the particle.

Equating the right-hand sides of the two equations above give us:

"\\frac{3}{2}"k_BT = "\\frac{1}{2}mv^2" ⇒ 3k_BT=mv² ⇒ m²v² = 3mk_BT ⇒ mv ="\\sqrt{3mK_BT}"

Now, the de Broglie wavelength of a particle is given by:

"\\lambda = \\frac{h}{mv}", where h is Planck's constant

Inserting the value of mv from before, we get:

"\\lambda = \\frac{h}{\\sqrt{3mk_BT}}" λ=h√3mkBT

b) "\\frac{h}{\\sqrt{3mk_BT}}>d \\implies T < \\frac{h^2}{3mk_Bd^2}"

"T = \\frac{(6.6\\times{10}^{-34})^2}{3(9.1\\times{10^{-31}})(1.4\\times{10^{-23}})(3\\times{10}^{-10})} = 1.3\\times10^5 K"

c) Pd³ = k_BT "\\implies d=(\\frac{k_BT}{P})^{1\/3}"

"T<\\frac{h^2}{3mk_B}(\\frac{P}{k_BT})^{2\/3}\\implies T<\\frac{1}{k_B}(\\frac{h^2}{3m})^{3\/5}(P)^{2\/5}"

For the helium m = m_He = 4m_p = 6.8 "\\times" 10^-27 kg

"T = \\frac{1}{(1.4\\times10^{-23})}(\\frac{(6.6\\times10^{-34})}{3(6.8\\times10^{-27})})^{3\/5}(1\\times10^5)^{2\/5}=2.8 K"

Answer: b) T < 1.3 "\\times" 10^-5 K; c) T < 2.8 K