A light-emitting diode (LED) emits light over a narrow range of wavelengths - AQA - A-Level Physics - Question 2 - 2021 - Paper 3

One disadvantage is that the fifth-order maximum might be difficult to observe accurately due to its dispersion and reduced intensity compared to lower orders. This can lead to measurement errors when interpolating results.

To find the activation voltage $V_A$ for $L_R$, examine the graph in Figure 4:

1. Locate the linear portion of the $I-V$ characteristic for $L_R$.
2. Extrapolate the linear section to find the intersection with the horizontal axis. This reading will give the value of $V_A$.

Using the relationship $V_A = \frac{hc}{e\text{λ}_p}$:

1. Rearranging for $h$, we have: $h = \frac{V_A e \text{λ}_p}{c}$.
2. Substitute in values for $V_A$, $e$, and $c$. This will yield a calculated value for the Planck constant.

From the circuit, we have:

• Supply voltage: $6.10 ext{ V}$
• Current through $L_R$: must not exceed $21.0 ext{ mA}$. Using Ohm's law: $R = \frac{V}{I} = \frac{6.10 ext{ V}}{21.0 \times 10^{-3} ext{ A}} \approx 290.48 ext{ Ω}$. Therefore, the minimum value of $R$ is approximately $290.48 ext{ Ω}$.