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3.4 - Kinetic Molecular Theory Derivations

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Interactive Audio Lesson

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Momentum Change and Gas Molecules

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Teacher
Teacher

Today, weโ€™re discussing how we can derive pressure from the kinetic molecular theory. Letโ€™s start with momentum. When a gas molecule collides with the wall of its container, it experiences a change in momentum. Who can tell me what that change is?

Student 1
Student 1

Is it the difference in its velocity before and after it hits the wall?

Teacher
Teacher

Exactly! The change in momentum for a molecule of mass **m** moving along the x-axis is given by \\$\Delta p_x = -2mv_x\$ when it collides elastically with the wall. Can anyone tell me why the negative sign is there?

Student 2
Student 2

The negative sign indicates the direction change of the momentum, right?

Teacher
Teacher

Correct! Now, if we look at this change, we can relate it to the average force exerted on the wall. Letโ€™s move to the next step!

Time Between Collisions

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Teacher
Teacher

To determine the average force that molecules exert on the wall, we need to calculate the time between successive collisions. The formula is \\$\Delta t = \frac{2L}{|v_x|}\$. Can someone explain how we derive this?

Student 3
Student 3

We divide the distance traveled to hit the wall and back by the speed of the molecule, right?

Teacher
Teacher

Absolutely! This formula is crucial for calculating the average force. Letโ€™s incorporate this into determining pressure. Does anyone want to try relating the force to pressure?

Student 4
Student 4

Since pressure equals force over area, we can use the total force and the area of the wall!

Teacher
Teacher

Exactly right! Keep that in mind as we move forward.

Total Pressure and Wall Area

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Teacher
Teacher

Great! Now that we have the average force, we also need to account for all the gas molecules. When we sum the forces of all **N** molecules, we arrive at: \\$F_{total} = Nm \langle v_x^2 \rangle / L\$. Can someone convert this to pressure?

Student 1
Student 1

We divide by the area of the wall, giving \\$P = \frac{F_{total}}{A}\$!

Teacher
Teacher

Perfect! This brings us to the formula for pressure in terms of molecular behavior and velocities. Let's discuss isotropic motion next.

Isotropic Motion and Pressure Derivation

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Teacher
Teacher

In gases, molecules move in every direction, which leads us to the concept of isotropic motion. This means \\$\langle v^2 \rangle = \langle v_x^2 \rangle + \langle v_y^2 \rangle + \langle v_z^2 \rangle = 3 \langle v_x^2 \rangle\\$. Who can use this to help isolate pressure in our equation?

Student 2
Student 2

We can substitute \\$\langle v_x^2 \rangle = \frac{1}{3} \langle v^2 \rangle\\$ into the pressure equation?

Teacher
Teacher

Exactly! This gives us an even clearer relationship: \\$P = \frac{1}{3} Nm \langle v^2 \rangle / V\\$. Can anyone explain what each part represents in a real-world context?

Introduction & Overview

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Quick Overview

This section explores the derivations of macroscopic pressure using the assumptions of the Kinetic Molecular Theory (KMT).

Standard

The section delves into how macroscopic pressure can be derived from the microscopic behavior of gas molecules within a container, informed by KMT assumptions. It reveals the connections among kinetic energy, velocity, and pressure, leading to the ideal gas law.

Detailed

Kinetic Molecular Theory Derivations

Introduction

The Kinetic Molecular Theory (KMT) provides a framework for understanding the behavior of gases at a microscopic level, and from these microscopic properties, we can derive macroscopic quantities such as pressure.

Derivation Steps

  1. Momentum Change: A single molecule of mass m moving with velocity components \(v_x, v_y, v_z\)** collides elastically with a wall. The change in momentum during this collision is given by:
    \$\Delta p_x = -2mv_x\$.
  2. Time Between Collisions: The time for a molecule to travel to the wall and back is \$\Delta t = \frac{2L}{|v_x|}\$, where L** is the length of the container.
  3. Average Force on the Wall: The average force, F_x, exerted on the wall by one molecule in the x-direction is calculated as:
    \$F_x = \frac{\Delta p_x}{\Delta t} = \frac{-2mv_x}{\frac{2L}{|v_x|}} = \frac{mv_x^2}{L}\$.
  4. Total Pressure and Wall Area: Summing the forces of all N molecules and considering the area A = Lยฒ, we find the pressure P on the wall:
    \$P = \frac{F_{total}}{A} = \frac{N m \langle v_x^2 \rangle}{V}\$, where V is the volume of the container.
  5. Isotropic Motion: By recognizing that the motion of molecules is isotropic, we can express \$\langle v^2 \rangle = \langle v_x^2 \rangle + \langle v_y^2 \rangle + \langle v_z^2 \rangle = 3 \langle v_x^2 \rangle\$**, resulting in:
    \$P = \frac{1}{3} N m \langle v^2 \rangle / V\$.
  6. Connecting to Kinetic Energy: The average kinetic energy per molecule is \$\frac{1}{2} m \langle v^2 \rangle = \frac{3}{2} k_B T\$ (from the equipartition theorem), leading us to derive the ideal gas law: \$PV = N k_B T\$.

Conclusion

This section not only reinforces the understanding of gas behavior at a molecular level but also illustrates the transition from microscopic properties to macroscopic laws, solidifying the ideal gas law as a pivotal concept in thermodynamics.

Audio Book

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Average Kinetic Energy and Ideal Gas Law

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  1. Recall the average translational kinetic energy per molecule is 12mโŸจv2โŸฉ=12mโŸจv2โŸฉ

. By the equipartition theorem, 12mโŸจv2โŸฉ=32kBT.
rac{1}{2} m riangle v^2 = rac{3}{2} k_ ext{B}T.
Thus, mโŸจv2โŸฉ=3 kBT
o P V= rac{1}{3} N(3 kBT)=NkBT,m riangle v^2 = 3 k_B T o P V = rac{1}{3} N(3 k_B T) = N k_B T.

Detailed Explanation

In the final part, we connect the kinetic energy of gas molecules to temperature, serving as a bridge to the Ideal Gas Law. The average kinetic energy of a single gas molecule relates directly to temperature through the equipartition theorem, showing how molecular speed is influenced by thermal energy. Consequently, when substituting this relation back into the pressure and volume equations, we arrive at the final form of the ideal gas law, encapsulating the behavior of gases in a simple but powerful equation: PV = Nk_BT.

Examples & Analogies

Think of a pot of boiling water. The faster the water molecules move (in this case, related to the temperature), the more likely they are to escape and create steam, increasing the pressure in a sealed pot. This reflects how the temperature affects pressure through kinetic energy in gas molecules.

Definitions & Key Concepts

Learn essential terms and foundational ideas that form the basis of the topic.

Key Concepts

  • Momentum Change: Momentum principle explains how gas molecules collide with container walls, affecting pressure.

  • Force and Time: Time between molecular collisions helps determine the average force exerted by molecules.

  • Total Pressure: The pressure can be expressed in terms of the total force from multiple collisions over an area.

  • Isotropic Motion: The uniform nature of molecular motion allows us to sum contributions from all three axes.

Examples & Real-Life Applications

See how the concepts apply in real-world scenarios to understand their practical implications.

Examples

  • When 100 gas molecules collide with the wall of a container and exert cumulative force, pressure can be calculated using the collective momentum changes.

  • In a gas at room temperature, average molecular speeds can be estimated through the ideal gas equation, connecting microscopic motion to observable pressure.

Memory Aids

Use mnemonics, acronyms, or visual cues to help remember key information more easily.

๐ŸŽต Rhymes Time

  • When gas molecules speed and collide, pressure's what we get inside!

๐Ÿ“– Fascinating Stories

  • Imagine a room filled with bouncing ballsโ€”the harder they hit the walls, the louder the 'bang' (pressure) becomes!

๐Ÿง  Other Memory Gems

  • MVP: Momentum, Velocity, Pressureโ€”the three pillars of Kinetic Molecular Theory.

๐ŸŽฏ Super Acronyms

MVP stands for Momentum, Velocity, and Pressure!

Flash Cards

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Glossary of Terms

Review the Definitions for terms.

  • Term: Momentum

    Definition:

    The quantity of motion an object possesses, calculated as the product of its mass and velocity.

  • Term: Kinetic Molecular Theory

    Definition:

    A model that explains the behavior of gases in terms of the motion of their particles.

  • Term: Isotropic motion

    Definition:

    Motion that is the same in all directions; defining a state where properties are uniform.

  • Term: Ideal gas law

    Definition:

    The equation of state for an ideal gas, represented as PV = nRT, relating pressure, volume, temperature, and amount of gas.