19.8:

Maxwell-Boltzmann Distribution: Problem Solving

JoVE Core
物理学
このコンテンツを視聴するには、JoVE 購読が必要です。  サインイン又は無料トライアルを申し込む。
JoVE Core 物理学
Maxwell-Boltzmann Distribution: Problem Solving

935 Views

01:20 min

September 18, 2023

Individual molecules in a gas move in random directions, but a gas containing numerous molecules has a predictable distribution of molecular speeds, which is known as the Maxwell-Boltzmann distribution, f(v).

This distribution function f(v) is defined by saying that the expected number (v1,v2) of particles with speeds between v1 and v2 is given by

Equation1

Since N is dimensionless and the unit of f(v) is seconds per meter, the equation can be conveniently modified into a differential form:

Equation2

Consider a sample of nitrogen gas in a cylinder with a molar mass of 28.0 g/mol at a room temperature of 27 °C. Determine the ratio of the number of molecules with a speed very close to 300 m/s to the number of molecules with a speed very close to 100 m/s.

To solve the problem, examine the situation, and identify known and unknown quantities.

Second, convert all the known values into proper SI units. For example, convert the molecular weight to kilograms (kg) and the temperature to kelvin (K). Recall the distribution function for the velocity equation. Lastly, substitute the known values into the equation to determine the unknown quantity.

Equation3