Answer:3.38 kilopascals.
Step-by-step explanation:To find the approximate change in pressure when the volume increases from 12 L to 12.3 L and the temperature decreases from 310 K to 305 K, we can use differentials.
1. First, let's differentiate the given equation PV = 8.31T with respect to each variable:
- d(PV) = d(8.31T)
- P*dV + V*dP = 8.31*dT
2. We are interested in finding the change in pressure, so we'll focus on dP:
- P*dV + V*dP = 8.31*dT
- V*dP = 8.31*dT - P*dV
3. We can now substitute the specific values provided:
- V = 12.3 L - 12 L = 0.3 L (change in volume)
- T = 305 K - 310 K = -5 K (change in temperature)
4. Substituting these values into the equation, we get:
- 0.3*dP = 8.31*(-5) - P*dV
5. Since dP represents the approximate change in pressure, we can solve for it:
- 0.3*dP = -41.55 - 12*dP
- 12.3*dP = -41.55
- dP ≈ -41.55 / 12.3
6. Evaluating the expression, we find that the approximate change in pressure is approximately -3.38 kilopascals.
Therefore, when the volume increases from 12 L to 12.3 L and the temperature decreases from 310 K to 305 K, the pressure is estimated to decrease by approximately 3.38 kilopascals.