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21 February, 01:44

O see how two traveling waves of the same frequency create a standing wave. Consider a traveling wave described by the formula y1 (x, t) = Asin (kx-ωt). This function might represent the lateral displacement of a string, a local electric field, the position of the surface of a body of water, or any of a number of other physical manifestations of waves.

Find ye (x) and yt (t). Keep in mind that yt (t) should be a trigonometric function of unit amplitude.

Express your answers in terms of A, k, x,?, and t. Separate the two functions with a comma.?

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  1. 21 February, 02:05
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    yt (t) = cos (wt)

    ye (t) = 2*A*sin (kx)

    Explanation:

    Given:-

    Consider a traveling wave described by the formula

    y (x, t) = Asin (kx-ωt)

    Find:-

    Find ye (x) and yt (t). Keep in mind that yt (t) should be a trigonometric function of unit amplitude.

    Express your answers in terms of A, k, x,?, and t.

    Solution:-

    - We are to express the given y1 (x, t) in the form of sum of two waves y1 and y2:

    y (x, t) = y1 (x, t) + y2 (x, t)

    Where,

    y1 (x, t) = A*sin (kx-ωt) ... wave travelling in + x direction

    y2 (x, t) = A*sin (kx+wt) ... wave travelling in - x direction

    - Such that ye (x) is a single variable function of x and yt (t) is a single variable unit amplitude function of (t).

    y (x, t) = y1 (x, t) + y2 (x, t) = ye (x) * yt (t)

    A*sin (kx-ωt) + A*sin (kx+wt) = ye (x) * yt (t)

    - Apply sum to product formula on the left hand side:

    = 2A * [ sin ((kx - wt + kx + wt) / 2) * cos (((kx - wt - kx - wt) / 2) ]

    = 2*A*[sin (kx) * cos (-wt) ]

    Where,

    cos (-wt) = cos (wt)

    = 2*A*sin (kx) * cos (wt)

    - The function yt (t) must be a unit amplitude:

    yt (t) = cos (wt)

    ye (t) = 2*A*sin (kx)
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