Answer:
I₀ = 1351.1 W / m²
Step-by-step explanation:
This problem can be solved using Malus's law.
I = I₀ cos² θ
Where I is the transmitted intensity, Io is the incident intensity and θ is the angle between the polarization of the light and the polarizer
Let's use this equation for the third polarizer
I₃ = I₂ cos² θ
The angle with respect to the light that reaches it is the angle of the polarized minus the angle with which the light comes
θ = 60 - 30
θ = 30º
We calculate the incident intensity on the third polarized
I₂ = I₃ / cos² 30
I₂ = 380.0 / cos² 30
I₂ = 506.7 w / m²
We calculate the incident intensity on the second polarizer
I₂ = I₁ cos² 30
I₁ = I₂ / cos₂ 30
I₁ = 506.7 / cos² 30
I₁ = 675.6 W / m²
For the first polarizer the incident light is without polarization, so the polarizer lets half of the light pass, therefore, the light transmitted from the middle of the incident
I₁ = I₀ / 2
I₀ = 2 I₁
I₀ = 2 675.6
I₀ = 1351.1 W / m²