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

One disadvantage of using the fifth-order maximum is that it may not be well-defined due to wider peaks, which could lead to inaccuracies in measuring the angle and thus determining N.

To find the activation voltage $ext{V}_A$ for LR, we need to extrapolate the linear part of the current-voltage characteristic until it meets the horizontal axis. The value at the intersection point, according to Figure 4, is approximately 2.12 V.

Using the relationship $\text{V}_A = \frac{hc}{e\text{λ}_p}$, we can rearrange this to find Planck's constant (h): $h = \frac{\text{V}_A e \text{λ}_p}{c}$ Substituting in values:

• $ext{V}_A ext{ for LR} \approx 2.12 ext{ V}$,
• $e \approx 1.60 \times 10^{-19} ext{ C}$,
• $ext{λ}_p \approx 650 \times 10^{-9} ext{ m}$,
• $c \approx 3.00 \times 10^8 ext{ m/s}$, we find: $h \approx \frac{(2.12)(1.60 \times 10^{-19})(650 \times 10^{-9})}{3.00 \times 10^8} \approx 1.05 \times 10^{-34} ext{ J s}$

To find the minimum value of R, we use Ohm's Law: $V = IR$ Given that the power supply voltage is 6.10 V and the maximum current in LR is 21.0 mA, we can find: Using $I = 21.0 \times 10^{-3} \text{ A}$, we rearrange for R: $R = \frac{V}{I} = \frac{6.10 ext{ V}}{21.0 \times 10^{-3} ext{ A}} \approx 290.48 \text{ Ω}$ Thus, the minimum value of R is approximately 290 Ω.