Answer to Question #160998 in Quantum Mechanics for Vivek

For a particle in a box potential we know, that the eigenfunction of n-th stationnary state has exactly n antinodes. Thus we deduce that "E_5 = \\frac{\\pi^2 \\hbar^2}{2mL^2} \\cdot 25 = 230eV". From this we find that "m = \\frac{25\\cdot \\pi^2 \\cdot 1.1\\cdot 10^{-68}}{2 \\cdot 4\\cdot 10^{-20} \\cdot 2.3 \\cdot 1.6 \\cdot 10^{-19}} \\approx 9.2 \\cdot 10^{-29} kg" which is approximately 100 electron masses.

The energy can take values of a form "E_n = \\frac{\\pi^2 \\hbar^2}{2mL^2}\\cdot n^2" and thus "\\frac{E_n}{n^2} = const". We see that for "E= 1keV" we should have "\\frac{E}{n^2} = \\frac{E_5}{5^2}" and thus "n^2 = 25\\cdot \\frac{100}{23}" which is not an integer and thus the value 1keV can't be attained.