18. Consider an ensemble of a system of two...

18. Consider an ensemble of a system of two indistinguishable particles where each of which can occupy three different levels with energies 0, $\epsilon$ and $2\epsilon$. The partition function for the system, if the particles obey Bose-Einstein statistics, will be (where y = $e^{-\epsilon/k_BT}$) (a) $(1+y+y^2)(1+y^2)$ (b) $(1+y)(1+y^2)$ (c) $(y+y^2+y^3+y^4)$ (d) $(1+2y+y^2)(1+y)$

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Consider an ensemble of a system of two indistinguishable particles where each of which can occupy three different levels with energies 0,in and 2in. The partition function for the system, if the particles obey Bose-Einstein statistics, will be (where (a) (1+y+y^(2))(1+y^(2)) (b) (1+y)(1+y^(2)) (c) (y+y^(2)+y^(3)+y^(4)) (d) (1+2y+y^(3))(1+y)Consider an ensemble of a system of two indistinguishable particles where each of which can occupy three different levels with energies 0, E and 2E. The partition function for the system, if the particles obey Bose-Einstein statistics, will be (where (a) (1+y+y^(2))(1+y^(2)) (b) (1+y)(1+y^(2)) (c) (y+y^(2)+y^(3)+y^(4)) (d) (1+2y+y^(3))(1+y) 18. Consider an ensemble of a system cf two indistinguishable particles where each of which can occupy three different levels with encrgies 0, e and 2e.The partition function for the system, if the particles obey Bose-Einstein statistics, will be (where y=e-e/kT a1+y+y1+y b1+y1+y (c)(y+y2+y3+y*) d1+2y+y(1+y

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