Answer to Question #185710 in Optics for melvin

Question #185710

 Write the normalized Jones vectors for each of the following waves, and describe completely the state of polarization of each. (a) 𝐸 ⃗ = 𝐸𝑜 cos(𝑘𝑧 − 𝜔𝑡)𝑥 ̂ − 𝐸𝑜 cos(𝑘𝑧 − 𝜔𝑡)𝑦 ̂    
(b) 𝐸 ⃗ = 𝐸𝑜 sin2π(𝑧/lamda − 𝑣𝑡)𝑥 ̂ + 𝐸𝑜 sin2π( 𝑧/lamda − 𝑣𝑡)𝑦 ̂

Expert's answer

"\\vec{E}=E_x\\vec{x}+E_y\\vec{y},"

"E_x=-E_y," here phase difference between x- and y-components is "\\pi,"

"E=\\begin{pmatrix}\n E_x\\\\\n E_y\n\\end{pmatrix}=E_0\\begin{pmatrix}\n 1 \\\\\n -1\n\\end{pmatrix},"

"E^*\\cdot E=1"

"E_0^2(1^2+(-1)^2)=1,"

"E_0=\\frac{1}{\\sqrt 2},"

normalized Jones vector will be

"\\frac{1}{\\sqrt2}\\begin{pmatrix}\n 1 \\\\\n -1\n\\end{pmatrix}," hence it represents linearly –45° polarized light.

"\\vec{E}=E_x\\vec{x}+E_y\\vec{y},"

"E_x=E_y," here phase difference between x- and y-components is "0,"

"E=\\begin{pmatrix}\n E_x\\\\\n E_y\n\\end{pmatrix}=E_0\\begin{pmatrix}\n 1 \\\\\n 1\n\\end{pmatrix},"

"E^*\\cdot E=1"

"E_0^2(1^2+1^2)=1,"

"E_0=\\frac{1}{\\sqrt 2},"

normalized Jones vector will be

"\\frac{1}{\\sqrt2}\\begin{pmatrix}\n 1 \\\\\n 1\n\\end{pmatrix}," hence it represents linearly 45° polarized light.

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Answer to Question #185710 in Optics for melvin

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