Amplitude:
min = 6
max = 14
so logically the oscillations will go back and forth between 6 and 14 about the midpoint of 6 and 14. The amp. would then be (14-6)/2 = 4.
Period:
Low tide @ 5:30 (or 5.5)
High tide @ 11.30 (or 11.5)
using the symmetry of SHM, the period of motion can be found by (11.5-5.5)*2 = 12 (12 hrs per oscillation)
Part b:
with the obtained information u can find the equation of motion quite simply. I know there are many ways to do this, but the following way I find most easy:
Since the SHM starts at an extremity, i.e. low tide, let the motion be defined by x = -4cos(nt + a) where a is the phase.
We know it starts at 5.5 (5:30 am) so noting this, we can eliminate a by letting the origin of the number plane be (5.5,10). (i prefer to do this than to find a)
Now to find n: we know the period is 12 = 2*pi / n (by definition)
so n = pi/6
Thus x = -4cos(pi*t/6) with the origin at 5.5 (remember)
For 11m of depth, x needs to be 1 (because origin at (5.5,10))
so to solve 1 = -4cos(...) is quite simple. The first solution of t comes down to be 3.4826... but remembering the origin is at x = 5.5, u add 5.5 to this result, giving 8.9826... which is approx 9.
