Login-Verarbeitung ...

Trial ends in Request Full Access Tell Your Colleague About Jove

21.12: Entropy and the Second Law of Thermodynamics

JoVE Core

Ein Abonnement für JoVE ist erforderlich, um diesen Inhalt ansehen zu können. Melden Sie sich an oder starten Sie Ihre kostenlose Testversion.

Entropy and the Second Law of Thermodynamics

21.12: Entropy and the Second Law of Thermodynamics

The second law of thermodynamics can be stated quantitatively using the concept of entropy. Entropy is the measure of disorder of the system.

The relation  between entropy and disorder can be illustrated with the example of the phase change of ice to water. In ice, the molecules are located at specific sites giving a solid state, whereas, in a liquid form, these molecules are much freer to move. The molecular arrangement has therefore become more randomized. Although the change in average kinetic energy of the molecules of the heat reservoir is negligible, there is nevertheless a significant decrease in the entropy of the reservoir because it has many more molecules than the melted ice cube. However, the reservoir's decrease in entropy is still not as significant as the increase in entropy of the ice. Thus the entropy of the universe increases.

The second law of thermodynamics clarifies that the universe's entropy never decreases during any thermodynamic process. When the process is reversible, the change of the entropy is given by ΔS = Q/T. But what happens if the temperature goes to zero kelvin? It turns out the absolute zero temperature is not reachable—at least, not through a finite number of cooling steps. This is a statement of the third law of thermodynamics, whose proof requires quantum mechanics.

Suggested Reading


Keywords: Entropy Second Law Of Thermodynamics Disorder Phase Change Ice Water Molecular Arrangement Randomized Heat Reservoir Universe Reversible Process Absolute Zero Third Law Of Thermodynamics Quantum Mechanics

Get cutting-edge science videos from JoVE sent straight to your inbox every month.

Waiting X
Simple Hit Counter