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ThermodynamicsM. D. Eastin Gas Laws and Equation of State What are the “guts” of air parcels within thunderstorms?

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Presentation on theme: "ThermodynamicsM. D. Eastin Gas Laws and Equation of State What are the “guts” of air parcels within thunderstorms?"— Presentation transcript:

1 ThermodynamicsM. D. Eastin Gas Laws and Equation of State What are the “guts” of air parcels within thunderstorms?

2 ThermodynamicsM. D. Eastin Outline:  Basic Definitions  Kinetic Theory of Gases  Early Gas Laws  Avogadro’s Hypothesis  Ideal Gas Law Gas Laws and Equation of State

3 ThermodynamicsM. D. Eastin Thermodynamics: The study of equilibrium states of a system System: Any specific sample of matter (Examples: an “air parcel” or the air within a balloon) Open system: Exchanges matter and energy with its surroundings. (Example: a balloon with a lot of holes) Closed system: Does not exchange matter with its surroundings, but can exchange energy. (Example: a balloon without insulation) Isolated System: Does not exchange matter or energy with its surroundings. (Example: a balloon with insulation) Note: In meteorology we assume most systems are closed Basic Definitions

4 ThermodynamicsM. D. Eastin Thermodynamics: The study of equilibrium states of a system State:Defines the total volume (V), pressure (p), and temperature (T) of each constituent composing a system at any given time If the system is homogeneous (contains only one component), then only the V, p, T values are needed. If the system is heterogeneous (contains multiple components), then the concentrations of the different components as well as the V, p, T are needed. Note: Our atmosphere is a heterogeneous system: Basic Definitions

5 ThermodynamicsM. D. Eastin Thermodynamics: The study of equilibrium states of a system Equillibrium:Defines a state in which a system’s properties do not change as long as the properties of the surroundings remain unchanged Example: Basic Definitions Closed System V 1, P 1, T 1 Surroundings: V 2, P 2, T 2 Equilibrium: P 1 = P 2 and T 1 = T 2 What would happen if the air pressure in the surroundings decreases? What would happen if the air temperature in the surroundings decreases?

6 ThermodynamicsM. D. Eastin Transformation: When a system changes from an initial state to a new final state Symbolically:i → f Reversible transformation: Any transformation that can be reversed and arrive back at the initial state ( i → f → i ) Occur when the external surroundings change very slowly so the system has time to adjust to a new equilibrium state along the way Irreversible transformation: Any transformation that can not be reversed and arrive back at its original state. Occur when surroundings or the system experiences a rapid change Basic Definitions

7 ThermodynamicsM. D. Eastin Transformation: When a system changes from an initial state to a new final state Isothermal transformation: Any transformation that occurs without a change in temperature Isochoric transformation: Any transformation that occurs without a change in volume Isobaric transformation: Any transformation that occurs without a change in pressure Adiabatic transformation: Any transformation that occurs without exchanging heat with the environment Note: Adiabatic transformations are not isothermal Basic Definitions

8 ThermodynamicsM. D. Eastin Energy: The total internal energy of a system (U) is the sum of the kinetic energy and potential energy of all the particle’s that compose the system. Basic Definitions Each particle is moving in some random direction (kinetic energy) Each particle is being pulled down by gravity (potential energy)

9 ThermodynamicsM. D. Eastin Basic Idea: We have a closed system containing N molecules moving in random directions and random speeds: The mean kinetic energy of all molecules is the system temperature (T) The mean force exerted on the system’s edges due to particle collisions with the edge is the system pressure (p). The three-dimensional space occupied by the moving molecules is the system volume (V) Kinetic Theory of Gases

10 ThermodynamicsM. D. Eastin Basic Idea: By applying some simple laws of physics (see Chapter 2 in your text), a simple equation that combines the three state variablesinto a single equation can be obtained: where:p = pressure V = volume N = Number of molecules k = Boltzmann’s constant T = temperature Note: This is one form of the ideal gas law This equation was obtain from the results of numerous laboratory experiments during the 18 th and 19 th centuries. Lets examine some of those early results… Kinetic Theory of Gases

11 ThermodynamicsM. D. Eastin Gay-Lussac Law #1: When pressure (p) is constant: Gay-Lussac Law #2: When volume (V) is held constant: Boyles Law: When temperature (T) is held constant: Note: The subscripts refer to two different system states Early Gas Laws

12 ThermodynamicsM. D. Eastin Example:Assume a hot air balloon is anchored to the ground and the air within occupies V = 10 m 3 at p = 1000 mb at T = 300 K. The burners at the balloon based are turned on and the air heats up to T = 320 K. Assume the balloon volume remains constant. What is the new pressure inside the balloon? Answer:Apply the Gay-Lussac Law #2: T 1 = 300 K p 1 = 1000 mb T 2 = 320 K Solve the equation for p 2 Plug in the values → p 2 = 937.5 mb Early Gas Laws

13 ThermodynamicsM. D. Eastin Avogadro’s Number: The number of atoms in 12 g of carbon Called a mole → 1 mole = 6.022 ×10 23 Avogadro’s Hypothesis: One mole of any gas at constant temperature and pressure occupies the same volume If we increase the number of molecules (or mass) of the gas at a constant temperature and pressure, then the volume of the system increases. Avogadro’s Hypothesis (Law)

14 ThermodynamicsM. D. Eastin If we combine Boyles Law and Gay-Lussac’s second law we obtain: which implies that if we change either p, V, or T, the value of pV/T remains constant. Thus we can re-write the equation above as: where A is a constant that depends on the type and amount of the gas. Note: The dependence on the amount (or mass) of the gas is a result of Avogadro’s Hypothesis Ideal Gas Law

15 ThermodynamicsM. D. Eastin Since A is a function of both gas type and its mass, we can define A as: where:m = total mass of the gas R = constant independent of mass, but dependent on gas type (will change for different gas types: oxygen vs. hydrogen) and re-write our equation as: Ideal Gas Law

16 ThermodynamicsM. D. Eastin Since density (ρ) is defined as the mass (m) per unit volume (V): we could re-write our equation as: → Also, since we can define a specific volume (α): we could re-write our equation as: → Ideal Gas Law

17 ThermodynamicsM. D. Eastin Also, if we let M equal the molecular weight of the gas, then the number of moles of that gas is defined as: where:n = number of moles m = total mass of the gas M = molecular weight of the gas We could also re-write our equation as: → Ideal Gas Law

18 ThermodynamicsM. D. Eastin Both M and R are constants and each are dependent on gas type However, their product results in a constant that is independent of gas type, and is thus called the universal gas constant (R*): where:R* = 8.3143 J K -1 mol -1 We can then rewrite our equation as: → Ideal Gas Law

19 ThermodynamicsM. D. Eastin Formulations of the Ideal Gas Law: where:p = pressure V = volume T = temperature N = number of molecules k = Boltzmann’s constant (1.38 ×10 -23 ) n = number of moles M = molecular weight of a gas particle R = gas constant dependent on gas type m = total mass ρ = density (m/V) α = specific volume (1/ρ) R* = universal gas constant (8.3143 J K -1 mol -1 ) Ideal Gas Law →←

20 ThermodynamicsM. D. Eastin Ideal Gas Law for Earth’s Dry Atmosphere: We need to find the gas constant (R) valid for our atmosphere, which contains multiple gases in various percentages: → We will neglect water vapor, and find the gas constant for our dry atmosphere Gas Molecular Weight Percentage by mass Nitrogen (N 2 ) 28.01675.51% Oxygen (O 2 ) 32.00023.14% Argon (Ar) 39.940 1.30% Carbon Dioxide (CO 2 ) 44.010 0.05% Ideal Gas Law: Earth’s Atmosphere

21 ThermodynamicsM. D. Eastin Ideal Gas Law for Earth’s Dry Atmosphere: Thus, we need to find the mean molecular weight of our atmosphere: Dalton’s Law: Ideal Gas Law: Earth’s Atmosphere See Example 3.1 (on page 21-22) of your text for details

22 ThermodynamicsM. D. Eastin Be careful about your interpretation: The ideal gas law relates three variables (p, T, and ρ or V) Thus, any change in one does not automatically produce a change in another. If we differentiate the ideal gas law: A change in pressure (dp) can lead to either a change in temperature (dT) or a change in density (dρ), or both. Let’s see a couple examples… Ideal Gas Law: Earth’s Atmosphere

23 ThermodynamicsM. D. Eastin Be careful about your interpretation: Example #1:Assume you are in Charlotte getting ready to board an airline flight to Denver. You have a soft drink bottle that is filled with air at p = 1000 mb, T = 300 K, and ρ = 1.00 kg/m 3. Before you boarded the plane, you sealed the bottle tightly. Once you arrived at Denver you noticed the bottle was partially collapsed. You know the temperature in the bottle remained unchanged, but the pressure dropped to p = 850 mb. What was the new air density? Can you solve this problem? If “yes”, then do so… (pay attention to units) Ideal Gas Law: Earth’s Atmosphere

24 ThermodynamicsM. D. Eastin Be careful about your interpretation: Example #2:Assume you are in Charlotte getting ready to board an airline flight to Denver. You have a soft drink bottle that is filled with air at p = 1000 mb, T = 300 K, and ρ = 1.00 kg/m 3. Before you boarded the plane, you sealed the bottle tightly. Once you arrived at Denver you noticed the bottle was partially collapsed. You did not know the bottle temperature but the pressure dropped to p = 850 mb. What was the new air density? Can you solve this problem? If “yes”, then do so… (pay attention to units) Ideal Gas Law: Earth’s Atmosphere

25 ThermodynamicsM. D. Eastin Summary: Basic Definitions: Equilibrium, System, State Reversible, Irreversible, Isobaric, Isothermal, Isochoric, Adiabatic Kinetic Theory of Gases (know the basic idea) Early Gas Laws: Gay-Lussac Laws Boyles Law Avogadro’s Hypothesis (know the basic idea) Ideal Gas Law: Basic Derivation Various Forms Universal Gas Constant Dalton’s Law for (mean molecular weights) Gas Laws and Equation of State

26 ThermodynamicsM. D. Eastin References Petty, G. W., 2008: A First Course in Atmospheric Thermodynamics, Sundog Publishing, 336 pp. Tsonis, A. A., 2007: An Introduction to Atmospheric Thermodynamics, Cambridge Press, 197 pp. Wallace, J. M., and P. V. Hobbs, 1977: Atmospheric Science: An Introductory Survey, Academic Press, New York, 467 pp.


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