Answer:
1.1 rad
Explanation:
Let's use the difference in phase equation
Φ = 2πó / λ
Where
ó = distance between two points==> d sin∅
[tex] d = 5*10^-^6 [/tex]
∅ = 1°
λ = wavelength = 500nm [tex] = 5*10^-^9 [/tex]
Therefore,
Φ = 2πó / λ
Φ = 2π dsin∅ / λ
[tex] = \frac{2pie(5*10^-^6 sin1)}{5*10^-^9} [/tex]
Ф = 1.096rad
= 1.1rad
Answer: b, 1.1 rad
Explanation:
We're going to use the relation between phase difference and path difference to solve this
Δx/λ = ΔΦ/2π, so that
Φ = 2πx / λ
Where
Φ = phase difference between two waves
x = path difference between the two waves
λ = the wavelength
Given
λ = 500 nm
θ = 1°
d = 5*10^-6 m
x = dsinθ, so that
Φ = 2πdsinθ / λ
Φ = [2 * π * 5*10^-6 * sin1°] / 500*10^-9
Φ = [3.142*10^-5 * 0.0175] / 500*10^-9
Φ = 5.483*10^-7 / 500*10^-9
Φ = 1.0966 rad
Φ = 1.1 rad
Therefore, the answer is B, 1.1 rad
