A container of monatomic ideal gas contains just the right number of moles so that nR = 20 J/K. The gas is in state 1 such that:

P₁ = 20 kPa
V₁ = 100 x 10^-3 m³

(a) What is the temperature T₁ of the gas?

Use the ideal gas law:

PV = nRT, so:

T₁ = P₁V₁/nR = 2000/20 = 100 K

(b) If Q = 2500 J of heat is added to the gas, and the gas expands at constant pressure, the gas will reach a new equilibrium state 2. What is the final temperature T₂?

We've already seen that, at constant pressure for a monatomic ideal gas:

Q = ΔE_int + W = (3/2)nRΔT + nRΔT = (5/2)nRΔT

Therefore ΔT = (2/5)Q/nR = 1000/20 = 50 K.

T₂ = T₁ + ΔT = 100 + 50 = 150 K

(c) How much work was done by the gas during the expansion?

W = nRΔT = 20 * 50 = 1000 J

That equation is true only for a constant pressure process.

(d)What is the final volume V₂?

One approach is to bring in the ideal gas law again:

V₂ = nRT₂/P₂ = 20(150)/20x10³ = 150 x 10^-3 m³