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In a simple harmonic oscillator, the displacement of the oscillator as a function of time is given by the equation:

x(t) = A * cos(ωt + φ)

Where: x(t) is the displacement at time t, A is the amplitude of the oscillator, ω is the angular frequency of the oscillator (ω = 2πf, where f is the frequency), t is the time, and φ is the phase constant.

For a simple harmonic oscillator starting from an extreme position, the phase constant φ is either 0 or π, depending on whether the initial displacement is in the positive or negative direction.

If the time is 3/2 T, where T is the period of the oscillator, we can substitute t = 3/2 T into the equation to find the displacement at that time:

x(3/2 T) = A * cos(ω * (3/2 T) + φ)

Since the cosine function has a period of 2π, and the period of the oscillator is T, we can rewrite ω * (3/2 T) as 3π:

x(3/2 T) = A * cos(3π + φ)

If the phase constant φ is 0, then:

x(3/2 T) = A * cos(3π) = -A

If the phase constant φ is π, then:

x(3/2 T) = A * cos(3π + π) = A

So, depending on the phase constant, the displacement covered by the simple harmonic oscillator starting from an extreme position in a time of 3/2 T with amplitude A will be either -A or A.

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