The average mass of an air molecule is 4.8 × 10^-26 kg - AQA - A-Level Physics - Question 10 - 2018 - Paper 2
Question 10
The average mass of an air molecule is 4.8 × 10^-26 kg.
What is the mean square speed of an air molecule at 750 K?
Worked Solution & Example Answer:The average mass of an air molecule is 4.8 × 10^-26 kg - AQA - A-Level Physics - Question 10 - 2018 - Paper 2
Calculate the mean square speed using the formula
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The mean square speed of a gas molecule can be calculated using the formula:
v_{rms} = �rac{3kT}{m}
Where:
- vrms is the root mean square speed,
- k is the Boltzmann constant (1.38×10−23extJ/K),
- T is the temperature in Kelvin,
- m is the mass of a molecule in kilograms.
For this problem:
- T=750extK,
- m=4.8×10−26extkg.
Plugging in the values, we calculate:
v_{rms} = �rac{3 imes (1.38 × 10^{-23}) imes 750}{4.8 × 10^{-26}}
Evaluate the expression
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Calculating the numerator:
3imes(1.38×10−23)imes750=3.105×10−20
Now, calculate the mean square speed:
v_{rms} = �rac{3.105 × 10^{-20}}{4.8 × 10^{-26}} ≈ 6.46 × 10^5 ext{ m}^2/ ext{s}^2
This approximates to 6.5 × 10^5 m²/s², leading us to conclude the correct answer is C.
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