An insulated container of gas has two champers seperated by an insulating partition.

An insulated container of gas has two champers seperated by an insulating partition. One of the chambers has volume V₁ and contains ideal gas at pressure P₁ and temperature T₁. The other chamber has volume V₂ and contains ideal gas at pressure P₂ and temperature T₂. If the partition is removed without doing any work on the gas, the final equilibrium temperature of the gas in the container will be

Options

(a) [T₁T₂(P₁V₁+P₂V₂)] / (P₁V₁T₁+P₂V₂T₂)
(b) [T₁T₂(P₁V₁+P₂V₂)] / (P₁V₁T₂+P₂V₂T₁)
(c) (P₁V₁T₁+P₂V₂T₂) / (P₁V₁+P₂V₂)
(d) (P₁V₁T₂+P₂V₂T₁) / (P₁V₁+P₂V₂)

Correct Answer:

[T₁T₂(P₁V₁+P₂V₂)] / (P₁V₁T₂+P₂V₂T₁)

Explanation:

As this is a simple maxing of gas, even if adiabatic conditions are satisfied, PV = nRT for adiabatic as well as isothermal changes. The total number of molecules is conserved.
.·. n₁ = P₁V₁ / R₁T₁, n₂ = P₂V₂ / RT₂
Final state = (n₁ + n₂) RT
(n₁ + n₂) = (P₁V₁ / R₁T₁) + (P₂V₂ / RT₂) = [(T₂P₁V₁+T₁P₂V₂) / RT₁T₂]
T = [(T₁n₁ + T₂n₂) / (n₁ + n₂) = [T₁T₂(P₁V₁+P₂V₂)] / (P₁V₁T₂+P₂V₂T₁)

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