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

One potential disadvantage is that the fifth-order maximum is more susceptible to measurement errors due to reduced intensity and potential overlap with other maxima. This can cause inaccuracies in determining the exact angle for the fifth-order maximum, leading to errors in the calculated value of (N). Additionally, higher orders can be less distinct, making them harder to measure accurately.

To find (V_A) for (L_R), we need to extrapolate the linear region of the current-voltage characteristic in Figure 4 to the x-axis. This involves drawing a straight line through the linear portion of the curve until it intersects the x-axis. The x-coordinate at this intersection gives (V_A). After analyzing Figure 4, we find that (V_A \approx 1.80 V) for (L_R).

Using the equation for the activation voltage: $V_A = \frac{hc}{e \lambda_p}$

We can rearrange this to solve for the Planck constant (h): $h = \frac{V_A e \lambda_p}{c}$

Substituting values:

• (V_A \approx 2.00 V) (for (L_G))
• Charge of an electron, (e \approx 1.6 \times 10^{-19} C)
• Speed of light, (c \approx 3.0 \times 10^8 m/s)
• Wavelength, (\lambda_p \approx 650 \times 10^{-9} m)

Now plug in the values: $h = \frac{2.00 \times (1.6 \times 10^{-19}) \times (650 \times 10^{-9})}{3.0 \times 10^8} \approx 1.054 \times 10^{-34} J s$

We use Ohm's law, which states: $V = I R$

Given:

• Total voltage of the supply is 6.10 V.
• The maximum current (I) in (L_R) should not exceed 21.0 mA (0.021 A).

Thus, we rearrange Ohm's law: $R = \frac{V}{I}$

Substituting the values: $R = \frac{6.10}{0.021} \approx 290.48 \Omega$

Therefore, the minimum resistance (R) must be at least 290.48 Ω (rounded to the nearest standard resistor value, 330 Ω could be used).