Problem Statement
Unpolarized light of intensity $I_0$ passes through three polarizers. The second is at $30°$ to the first, the third at $30°$ to the second ($60°$ total to the first). Find the final intensity.
Given Information
- See problem statement for all given quantities.
Physical Concepts & Formulas
This problem applies fundamental physics principles to the scenario described. The solution requires identifying the relevant conservation laws and equations of motion, then solving systematically with careful attention to units and sign conventions.
- See the step-by-step solution for the specific equations applied.
- All quantities are in SI units unless otherwise stated.
Step-by-Step Solution
Step 1 — Identify given quantities and set up the problem: After polarizer 1: $I_1 = I_0/2$.
Step 2 — Apply the relevant physical law or equation: After polarizer 2 (Malus, $30°$): $I_2 = I_1\cos^2 30° = (I_0/2)(3/4) = 3I_0/8$.
Step 3 — Solve algebraically for the unknown: After polarizer 3 ($30°$ to polarizer 2): $I_3 = I_2\cos^2 30° = (3I_0/8)(3/4) = 9I_0/32$.
Step 4 — Substitute numerical values with units: $$\boxed{I_3 = \frac{9I_0}{32} \approx 0.281\,I_0}$$
Worked Calculation
$$\boxed{I_3 = \frac{9I_0}{32} \approx 0.281\,I_0}$$
$$\text{Numerical result} = \text{given expression substituted with values}$$
$$\boxed{\boxed{I_3 = \frac{9I_0}{32} \approx 0.281\,I_0}}$$
After polarizer 1: $I_1 = I_0/2$.
After polarizer 2 (Malus, $30°$): $I_2 = I_1\cos^2 30° = (I_0/2)(3/4) = 3I_0/8$.
After polarizer 3 ($30°$ to polarizer 2): $I_3 = I_2\cos^2 30° = (3I_0/8)(3/4) = 9I_0/32$.
$$\boxed{I_3 = \frac{9I_0}{32} \approx 0.281\,I_0}$$
Answer
$$\boxed{I_3 = \frac{9I_0}{32} \approx 0.281\,I_0}$$
Physical Interpretation
The numerical answer is physically reasonable — matching expected orders of magnitude and dimensional analysis. The result confirms the theoretical prediction and provides quantitative insight into the system’s behaviour.
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