Perform the following steps to verify by substitution that C and D are solutions

Question

Perform the following steps to verify by substitution that C and D are solutions to equation A and B, respectively. Partial^2E/Partial x^2 = epsilon0 mu0 Partial^2E/Partial t^2 E = E_max cos(kx = omega t) Equation A Equation C Partial^2B/Partial x^2 = epsilon0 mu0 Partial^2B/Partial t^2 B = B_max cos(kx = omega t) Equation B Equation D calculate the first partial derivatives listed below. (Use the following as k, omega, x, t, and either E_max or B_max.) Partial E/Partial x = -kE_max sin(kx - omega t) Partial B/Partial x = -kB_max sin(kx - omega t) Partial E/Partial t = -omega E_max sin(kx - omega t) calculate the second partial derivatives listed below. (Use the following as k, omega, x, t, and either E_max or B_max.) Partial^2 E/Partial x^2 = Partial^2 B/Partial x^2 = Partial^2 E/Partial t^2 = Partial^2 B/Partial t^2 = Given k^2/omega^2 = (1/f lambda)^2, calculate the ratios of the second partial derivatives below. (use the following as necessary: c.) Partial^2 E/Partial x^2 = Partial^2 E/Partial t^2 = Partial^2 B/Partial x^2 = Partial^2 B/Partial t^2 = Express epsilon0 mu0. (Use the following as necessary: c.) epsilon0 mu0 =

Explanation / Answer

dE/dx = -kEmax sin(kx -wt)

d^2E/dx^2 = -k^2 Emax cos(kx -wt)

dB/dx = -kBmax sin(kx -wt)

d^2B/dx^2 = -k^2 Bmax cos(kx -wt)

dE/dt = wEmax sin(kx -wt)

d^2E/dt^2 = -w^2 Emax cos(kx -wt)

dB/dt = wBmax sin(kx -wt)

d^2B/dt^2 = -w^2 Bmax cos(kx -wt)

(d^2E/dx^2)/(d^2E/dt^2) = k^2/w^2 = (1/f*lamda)^2 = 1/c^2

(d^2E/dx^2)/(d^2E/dt^2) = (1/c)^2

(d^2B/dx^2)/(d^2B/dt^2) = k^2/w^2

(d^2B/dx^2)/(d^2B/dt^2) = (1/c)^2

(d) eo*uo = = (1/c)^2

Here (1/c)^2 = 1.11*10^-17 s^2/m^2

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