Question: Suppose that instead of both ends being fixed, the end of the string at x = L is free to move up and down. Then,

Suppose that instead of both ends being fixed, the end of the string at x = L is free to move up and down. Then, the point at x = L is an antinode and not a node. Start with the equation for a standing wave standing (x, t) = 2A sin(kx) cos(wt) and derive the condition for the resonant frequencies in terms of n, v and L?

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