Answer to Question #211077 in Optics for Anas

Question #211077

An electromagnetic wave in free space has an electric-eld vector E = f(t - z/c0).x, where ^x is a unit

vector in the x direction, and f(t) = e^-t^2=2

e^j2pv0t, where y is a constant. Describe the physical nature

of this wave and determine an expression for the magnetic-eld vector.

Expert's answer

Gives

"E=f(t-\\frac{z}{c_0})\\hat{x}"

"f(t)=e^{-t^2},y=2e^{j2\\pi v_0t}=2e^{jwt}"

We know that wave equation

"y=Ae^{(jw_0t+\\phi)}"

Where A=amplitude

"w_0=" Anguler frequency

"\\phi" =phase

"y=2e^{j2\\pi v_0t}=2e^{jwt}\\rightarrow(1)"

equation (1) is showing wave equation

equation (1)is

Phase

"\\phi" =0°

Amplitude=2

Anguler frequency

"w=2\\pi v_0"

Magnetic field vector

"B=\\frac{E}{c}"

"B=\\frac{E}{c}=\\frac{f(t-\\frac{z}{c_0})\\hat{x}}{c}"

Where

"f(t)=e^{-t^2}"

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