![]() Again, find the number of red and blue particles on each side. Let the animation continue and stop it again a few seconds later when there are about the same number of particles on each side. ![]() When there are about the same number of particles on both the left and right sides, pause the animation and count the number of red particles on each side and the number of blue particles on each side. This animation allows about every other particle that hits the membrane to get through (equally in either direction). ![]() Try letting particles through the membrane. Once the particles are fairly evenly distributed in the left chamber, you are ready to let particles through. Note that the red and the blue particles are identical, they are colored so you can keep track of them. In the animation, two containers are separated by a "membrane." Initially, no particles can cross the membrane. Cox and Wolfgang Christian.Īpplet authored by CoLoS and modified by Wolfgang Christian.Įxploration 3: Entropy, Probability, and Microstates ![]() \( \newcommand\) and is therefore dependent on the ratio of the maximum and minimum volume (called the compression ratio).
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