A parallel plate capacitor is connected across a battery and the energy stored in the capacitor is $E$ - AQA - A-Level Physics - Question 20 - 2022 - Paper 2

When the separation of the plates is halved, the capacitance changes. The capacitance $C$ of a parallel plate capacitor is given by: C = rac{ ext{ε} A}{d} where $ext{ε}$ is the permittivity of the material between the plates, $A$ is the area of the plates, and $d$ is the separation between them. By halving $d$, the new capacitance $C'$ becomes: C' = rac{ ext{ε} A}{d/2} = 2 imes rac{ ext{ε} A}{d} = 2C

Since the capacitor remains connected to the battery, the voltage $V$ across the capacitor does not change. Thus, we can calculate the new energy stored using the new capacitance: U' = rac{1}{2} C' V^2 = rac{1}{2} (2C) V^2 = 2 imes rac{1}{2} C V^2 = 2E Therefore, the energy now stored in the capacitor is $2E$.