Answer to Question #166027 in Quantum Mechanics for khalida

Consider two identical, non interacting particles (1 and 2) which may exist in two different states a and b.

"\\Psi_I = \\Psi_a(1) \\Psi_b(2)"

"\\Psi_{II} = \\Psi_a(2) \\Psi_b(1)"

If the particles are indistinguishable, then we cannot tell whether the number is in state "\\Psi_1" or "\\Psi_2" and because both states are equally likely we write the system wave function as a linear combination of "\\Psi_1 and \\Psi_2" .

If the particles are bosons, the system wave function is symmetric :

"\\Psi_b = \\dfrac{1}{\\sqrt2}[\\Psi_a(1)\\Psi_b(2)+\\Psi(2)\\Psi(1)] = \\Psi_s"

If the partices are fermions, the wave function is antisymmetric

"\\Psi_F = \\dfrac{1}{\\sqrt2}[\\Psi_a(1)\\Psi_b(2)-\\Psi_a(2)\\Psi_b(1)] = \\Psi_A"