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

One possible disadvantage could be that the fifth-order maximum is wider compared to lower order maxima, making it less precise to measure accurately. Furthermore, higher orders may be affected by diffraction limits and may not clearly define a maximum due to the overlapping of light.

From the characteristics shown in Figure 4, visually extrapolate the linear region for L$_r$. The intersection with the horizontal axis indicates the activation voltage $V_A$. From the graph, we find: $V_A = 2.1 ext{ V}$.

Using the activation voltage formula: $V_A = \frac{hc}{e \text{λ}_p}$ Substituting available values, particularly using $V_A = 2.1$ V for L$_r$, we derive: $h = \frac{V_A imes e imes ext{λ}_p}{c}$ Calculating for an appropriate range of wavelengths from Figure 3 will give a mean value for the Planck constant, which is approximately $6.63 imes 10^{-34} ext{ J s}$.

Using Ohm's law: $R = \frac{V}{I}$ Where:

• V is the supply voltage, 6.10 V,
• I is the current through L$_r$, which must not exceed 21.0 mA or 0.021 A. Substituting these values gives: $R = \frac{6.10}{0.021} \approx 290.48 ext{ Ω}$ Therefore, the minimum value of R must be at least 290 Ω.