If moles of monoatomic gas () is mixed with moles of diatomic gas (), the value of the adiabatic exponent for the mixture is:
- A
- B
- C
- D
If moles of monoatomic gas () is mixed with moles of diatomic gas (), the value of the adiabatic exponent for the mixture is:
Correct answer:C
Standard Method
Given:
Find: The adiabatic exponent for the mixture.
For a mixture of ideal gases,
and
For the monoatomic gas,
For the diatomic gas,
Now compute the total heat capacities:
Therefore,
So, the adiabatic exponent of the mixture is . The correct option is C.
Using weighted heat capacities
Given: The two gases are mixed in amounts moles and moles with adiabatic exponents and respectively.
Find: The value of for the mixture.
The first approach shown in the source tries a direct weighted average of , but the correct method is to average the heat capacities first and then take their ratio. That is why the final result becomes and not the intermediate incorrect arithmetic shown earlier.
Use
with
So,
Now calculate each gas heat capacity from its individual value. For gas :
For gas :
Substitute into the mixture formula:
Hence, the correct option is C.
Using a direct mole-weighted average of is incorrect because itself is a ratio of heat capacities. First combine and for the mixture, then compute .
Calculating and wrongly from leads to a wrong answer. Use and before substituting the mole values.
Adding the mole contributions incorrectly in the numerator or denominator can change the final ratio. Compute and carefully before dividing.
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