A bubble of 5.00 mol of helium is submerged at a certain depth in liquid water when the water (and thus the helium) undergoes a temperature increase $Δ T$ of ${20.0}^{\circ} C$ ; at constant pressure. As a result, the bubble expands. The helium is monoatomic and ideal. How much work W is done by the helium as it expands against the pressure of the surrounding water during the temperature increase? Use the first law of thermodynamics.

820 J

No worries! We‘ve got your back. Try BYJU‘S free classes today!

831 J

Right on! Give the BNAT exam to get a 100% scholarship for BYJUS courses

883 J

No worries! We‘ve got your back. Try BYJU‘S free classes today!

805 J

No worries! We‘ve got your back. Try BYJU‘S free classes today!

Open in App

Solution

The correct option is B
831 J

The bubble displaces some water when it expands, thus doing some work W, which according to the first law of thermodynamics equals -

$W = Q - Δ E_{i n t} .$

Since the expansion process occurs at a constant pressure we have to use the molar specific heat at constant pressure $C_{P}$ , to find the heat gained $Δ Q$ . On the other hand, $Δ E_{i n t}$ always depends on the molar specific heat at constant volume $C_{V}$ .

In kinetic theory, $C_{P}$ and $C_{V}$ are related as -

$C_{P} - C_{V} = R$

$\Rightarrow C_{P} = C_{V} + R$ .

Therefore,

$W = Q - Δ E_{i n t}$

$= n C_{P} Δ T - n C_{V} Δ T$

$= n (C_{P} - C_{V}) Δ T$

$= n R Δ T$

$= (5 \times 8.314 \times 20) J$

= 831.4 J.

Note that the work done in a constant-pressure, volume-expansion process is just $W = P Δ V$ , which for an ideal gas, is just $n R Δ T$ , thus in agreement with the result we obtained from the first law.

Suggest Corrections

Similar questions

8

30^{o} C

k J

^{o}

3.70 \times 10^{- 4}

0.179 k g / m^{3}

0^{\circ} C

γ = 5 / 3

27^{o} C

20 l i t r e

- x k c a l

x

(γ = \frac{5}{3})

27^{\circ} C

Join BYJU'S Learning Program