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To write an expression describing a transverse wave traveling along a string, we can use the general form of a wave equation. The equation describes the displacement of the wave as a function of position (x) and time (t).

The general form of a transverse wave equation is:

y(x, t) = A * sin(kx - ωt + φ)

where:

  • y(x, t) is the displacement of the wave at position x and time t,
  • A is the amplitude of the wave,
  • k is the wave number (2π divided by the wavelength),
  • ω is the angular frequency (2π times the frequency), and
  • φ is the phase constant.

Given: Wavelength (λ) = 11.4 cm Frequency (f) = 385 Hz Amplitude (A) = 2.13 cm

To find the wave number (k), we use the formula: k = 2π / λ

Substituting the given values: k = 2π / 11.4 cm

To find the angular frequency (ω), we use the formula: ω = 2πf

Substituting the given values: ω = 2π * 385 Hz

Now, we can write the expression for the transverse wave:

y(x, t) = A * sin(kx - ωt + φ)

Substituting the known values: y(x, t) = 2.13 cm * sin((2π / 11.4 cm) * x - (2π * 385 Hz) * t + φ)

Note that the phase constant (φ) is not specified in the given information. If you have a specific phase constant value, you can include it in the expression. Otherwise, you can omit it or set it to zero.

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