A student assembles the circuit in Figure 6 - AQA - A-Level Physics - Question 4 - 2022 - Paper 1

Given that the terminal pd across the battery is 6.2 V and the internal resistance of the battery is 2.5 Ω, we can first calculate the total current in the circuit. The resistance of the lamp is about 9 Ω, making the total circuit resistance: $R_{total} = R_{lamp} + R_{internal} = 9 + 2.5 = 11.5 \ ext{Ω}$ Using Ohm's Law, we calculate the current: $I = \frac{V}{R} = \frac{6.2}{11.5} \approx 0.54 \text{ A}$ Now we can calculate the emf of the battery using:

The resistivity can be calculated using the formula: $\rho = R \frac{A}{L}$ Here, the resistance (R) is 9.0 Ω, the length (L) is 5.0 m, and the area (A) can be calculated from the diameter of 0.19 mm. First, convert the diameter to meters: $d = 0.19 \text{ mm} = 0.19 \times 10^{-3} \text{ m}$ The radius (r) is: $r = \frac{d}{2} = \frac{0.19 \times 10^{-3}}{2} = 0.095 \times 10^{-3} \text{ m}$ So, the area is:

As the contact is moved to increase the length of the wire in series with the lamp, the resistance of the overall circuit increases. This increase in resistance leads to a decrease in the current flowing through the lamp. Consequently, the brightness of the lamp dims because less current means less power being consumed by the lamp.

When the variable resistor is connected in parallel with the lamp and the contact is moved, it reduces the overall resistance in the circuit. This decrease in resistance allows more current to flow through the lamp than in the previous configuration. Therefore, the brightness of the lamp will increase as more current results in greater power consumption, making the lamp brighter.