A flask contains Hydrogen and Argon in the ratio by mass. The temperature of the mixture is . The ratio of average kinetic energy per molecule of the two gases is: (Given: Atomic weight of Ar = )
- A
- B
- C
- D
A flask contains Hydrogen and Argon in the ratio by mass. The temperature of the mixture is . The ratio of average kinetic energy per molecule of the two gases is: (Given: Atomic weight of Ar = )
Correct answer:B
Standard Method
Given: Hydrogen and Argon are in the same flask at temperature .
Find: The ratio .
The average kinetic energy per molecule of an ideal gas is
where is the Boltzmann constant and is the absolute temperature.
Since average kinetic energy per molecule depends only on temperature, it does not depend on the mass or nature of the gas.
Both gases are at the same temperature in the same flask, so
Therefore,
Therefore, the ratio of average kinetic energies is . The correct option is B.
Concept Shortcut
Given: Both gases are in the same flask at the same temperature.
Find: The ratio of average kinetic energy per molecule.
Shortcut idea: For any ideal gas, average kinetic energy per molecule depends only on temperature. Therefore, if two gases have the same temperature, their average kinetic energies per molecule are equal.
So directly,
Hence, the correct option is B.
Using the mass ratio to compare average kinetic energies. This is wrong because average kinetic energy per molecule depends only on temperature, not on how much of each gas is present. Use instead.
Assuming heavier Argon molecules must have greater average kinetic energy. This is wrong because molecular mass affects speed distribution, not the average kinetic energy at a fixed temperature. At the same temperature, both gases have the same average kinetic energy per molecule.
Using atomic weight of Ar = in the ratio calculation. This is unnecessary here because the required quantity is average kinetic energy per molecule, which is independent of molar mass. Focus on the common temperature of the gases.
Get unlimited AI-adaptive practice, mastery tracking, and an AI tutor that explains every step — free to start.