Atmospheric Thermodynamics: Systems, Equilibrium, and Energy, Study notes of Thermodynamics

Download Atmospheric Thermodynamics: Systems, Equilibrium, and Energy and more Study notes Thermodynamics in PDF only on Docsity! ESCI 341 – Atmospheric Thermodynamics Lesson 2 – Definitions References: An Introduction to Atmospheric Thermodynamics, Tsonis Physical Chemistry (4th edition), Levine Thermodynamics and an Introduction to Thermostatistics, Callen Thermodynamics and Introductory Statistical Mechanics, Linder Reading: Petty, Chapters 1 and 2 SYSTEMS l A system is some identifiable collection of matter and or energy. Examples of systems are: o A parcel of air o A glass of water o An ice cube o The entire atmosphere o The entire Earth and atmosphere o The Universe l An open system is a system that exchanges matter with its surroundings. Examples of open systems are: o A glass of water with no lid, allowing evaporation into the air above it. o An internal combustion engine, since it gains matter through the intake valves and loses matter through the exhaust manifold. l A closed system is a system that does not exchange matter with its surroundings. Examples would be: o A glass of water with a lid. o A sealed soda can. o The inside of a ThermosTM bottle with the top screwed on. o The entire Universe (as far as we know). l An isolated system is a system that does not exchange any kind of matter or energy with its surroundings. Examples would be: o The inside of a ThermosTM bottle with the top screwed on (assuming it was perfectly insulated). o The entire Universe (as far as we know). 2 l The relationship between open, closed, and isolated systems can be illustrated using a Venn diagram. l From this diagram we see that o The set of all open systems does not intersect the set of all closed systems. ¡ Every system is either open or it is closed. o The set of all isolated systems is a subset of the set of all closed systems. l In plain language, we can infer the following: o Any isolated system is also a closed system, but a closed system is not necessarily an isolated system. o An open system cannot be an isolated system. l Any matter or energy that is not part of the system is considered to be part of the surroundings or environment. EQUILIBRIUM l There are three types of equilibrium: o Mechanical equilibrium – This means there are no unbalanced forces, so that neither the system, nor any part of the system, undergoes accelerations. This also implies that there is no turbulence within the system. o Material equilibrium – This means that there is no net transfer of matter from one phase or component of the system to another. The concentrations of chemical species and their phases are constant with time. o Thermal equilibrium – Means that the individual parts or pieces of the system would remain in the same state whether or not they were connected by a thermally conducting wall. In practicality, this means that there are no temperature gradients in the system. 5 SIMPLE SYSTEMS l When we state that: “The thermodynamic state of a simple system in thermodynamic equilibrium is completely characterized by specifying the internal energy (U), volume (V), and the number of moles, ni, of each of its components.” we are really stating an axiom, which is a definition that we take as a given, and on which we build the remainder of our understanding of classical thermodynamics. o We don’t prove the axioms. We assume their validity, and if in doing our sciences it turns out we have a contradiction then we revisit them. This is the same way we approach the so-called ‘laws of science’. They can’t be proven. They are taken as valid until shown otherwise. l Using the axiom above then we can define a simple system as one in which the thermodynamic state in equilibrium is completely specified by U, V, and the amounts of each component. l As an example of a simple versus a non-simple (complex) system, imagine two systems: o System A is a mixture of two ideal gasses in a rigid container of volume V at a temperature T and pressure p. Ê This is a simple system whose thermodynamic state is given by the total internal energy U, the total volume V, and the number of moles of the two gasses, n1 and n2. o If we take the same two gasses and separate them into separate compartments of the total system, and keep each gas at the same temperature and pressure as the previous simple system, the total internal energy U and total volume V of this system are the same as that of the simple system. However, the thermodynamic states are not the same. We will find out later that the entropy, S, of the complex system is lower than the simple 6 system. So, we need an additional thermodynamic state variable to completely characterize the state of the complex system. l One way to discern whether a system is simple or complex is to note the presence of internal constraints. In the case of the complex system the internal constraint is the impermeable wall that keeps the two ideal gasses separated. EXTENSIVE VERSUS INTENSIVE VARIABLES l An intensive property is one that does not depend on how much substance is present. o Temperature is an example of an intensive property. If two identical masses are at the same temperature and are added together, the temperature remains the same even though the mass is doubled. l An extensive property depends on how much substance is present. o Internal energy is an example of an extensive property. If the two identical masses are added together there is twice as much internal energy. l There are two ways to convert an extensive property into an intensive property. o Divide by the mass. The result is a property that is normalized by the mass. We add the term specific to indicate that we’ve divided by the mass. For example, the specific internal energy u is defined as U/m. o Divide by the number of moles. The result is a property that is normalized by the number of moles present. We add the term molar specific to indicate we’ve divided by the number of moles. For example, the molar specific internal energy, um, is defined as U/n. l In general, extensive properties are denoted using upper-case letters, while intensive properties are denoted using lower-case letters. However, there are exceptions, including ONE NOTABLE EXCEPTION: Temperature is denoted using upper-case T, even though it is an intensive property. TRANSFORMATIONS l A system that moves from one equilibrium state to another will experience a change in state variables. 7 l The initial and final equilibrium states can be represented on a thermodynamic diagram. o Note that only equilibrium states of a closed system can be represented on a 2- dimensional thermodynamic diagram. Why is this? l There are an infinite number of paths on the diagram by which the system can be transformed from one equilibrium state to another. However, regardless of which path is taken, the change in the state variables will be the same between the two points. l We can express this property of state variables mathematically in two ways: o The change in any of the state variables (say U) doesn’t depend on the path of the system on a thermodynamic diagram. It only depends on the endpoints. o The integral of a state variable around a closed path is zero. l Mathematically, this means that differentials of state variables are exact differentials. o In order to be a state variable, the differential of the variable must be exact. REVERSIBLE AND IRREVERSIBLE PROCESSES l A quasi-static process is a process that proceeds through a sequence of equilibrium states that are spaced infinitesimally close together. o A quasi-static process is almost always nearly in equilibrium. It is not in equilibrium between successive equilibrium states, but since the equilibrium )()( aUbUdU b a -=ò ò = 0dU