The time that elapses between a moment of maximum speed and the next moment of maximum acceleration is called half-period.
The relationship between the period of oscillation, T, and the angular frequency, ω, is given by the equation:
T = 2π / ω
The angular frequency, in turn, is related to the acceleration, a, by the equation:
ω = √(a/x)
where x is the amplitude of oscillation.
Since we know the maximum acceleration, we can find the angular frequency:
ω = √(5.77 m/s^2 / x)
And since we know the angular frequency, we can find the period:
T = 2π / ω
We know that half of the period is the time that elapses between a moment of maximum speed and the next moment of maximum acceleration, so we can find the time between these two moments by dividing the period by 2:
t = T/2
Therefore, the time elapses between a moment of maximum speed and the next moment of maximum acceleration is half a period of oscillation.