of an ideal gas at and undergoes isothermal reversible expansion until the pressure of the gas becomes . Which of the following option is correct? (Given: , )
- A
- B
- C
- D
of an ideal gas at and undergoes isothermal reversible expansion until the pressure of the gas becomes . Which of the following option is correct? (Given: , )
Correct answer:C
Standard Method
Given: , , , . The process is isothermal reversible expansion of an ideal gas.
Find: The correct combination of and .
For an ideal gas in an isothermal process,
For reversible isothermal expansion,
and
First,
Using the given logarithms,
Now calculate the number of moles:
Then,
Therefore,
So, the correct option is C.
Energy Balance View
Given: The gas is ideal and the process is isothermal.
Find: How heat and work are related in this process.
For an ideal gas, internal energy and enthalpy depend only on temperature. Since temperature remains constant,
From the first law of thermodynamics,
So,
Hence, during reversible expansion, work done by the system is negative in chemistry sign convention, and an equal amount of heat is absorbed.
Using the calculated reversible isothermal work,
therefore,
Thus the final set is , so the correct option is C.
Using for an isothermal ideal-gas process is incorrect because for an ideal gas internal energy depends only on temperature. Since is constant, take and then use .
Using directly in the work formula is incorrect because the formula contains natural logarithm. Convert with before substituting the given logarithmic values.
Taking instead of in gives the wrong sign for work. For reversible isothermal expansion, use the pressure ratio consistently so that expansion gives negative in chemistry convention.
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