Problem :

Write down the Gibbs sum. Be sure to get all of the indices correct.

ZG(μ, τ) =  e(Nμ- )/τ

Problem :

Give the expression for the absolute probability that a system will be found in the state with N1 particles and energy .

P(N1, ) = Problem :

Give an expression for the average value of a property A for a system in diffusive and thermal contact with a "reservoir". A "reservoir" is a huge system next to our smaller system with large energy and number of particles.

< A > = Problem :

Give an expression for the average number of particles in a system that is in thermal and diffusive contact with a reservoir.

We are looking for < N >, which we can calculate using the formula we just derived.

< N > = Problem :

Suppose that we have a system that can be unoccupied or can have one particle in a state with energy . Write the Gibbs sum for this system.

One possible state has N = 0, for which we say that the energy is also zero. So the first term in the sum is 1. The second possible state has N = 1, and energy . We can write the total sum as:

ZG = 1 + eμ- /τ

We sometimes simplify this by defining λâÉáeμ/τ, in which case the answer can be written more simply as ZG = 1 + λe- /τ.