Given the wave functions y1 (x, t) = A sin (kx − ωt) and y2 (x, t) = A sin (kx − ωt + ϕ) with ϕ ≠ π/2 , show that y1 (x, t) + y2 (x, t) is a solution to the linear wave equation with a wave velocity of v = √(ω/k).

Given the wave functions y1 (x, t) = A sin (kx − ωt) and y2 (x, t) = A sin (kx − ωt + ϕ) with ϕ ≠ π/2 , show that y1 (x, t) + y2 (x, t) is a solution to the linear wave equation with a wave velocity of v = √(ω/k).

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Question

Given the wave functions y₁ (x, t) = A sin (kx − ωt) and y₂ (x, t) = A sin (kx − ωt + ϕ) with ϕ ≠ π/2 , show that y₁ (x, t) + y₂ (x, t) is a solution to the linear wave equation with a wave velocity of v = √(ω/k).

Expert Solution