Answer :
Answer:
The motion, y of the dock with time , t can be represented as a cosine function as presented in the following equation;
[tex]y = 1.8 \times cos(\frac{2\pi }{10} \cdot t) + 13.2[/tex]
Step-by-step explanation:
Here we approximate the motion of the dock as a cosine function as follows
y = a·cos(b(x - c)) + d
a = Amplitude
The period = 2π/b
d = Vertical shift
c = Horizontal shift
Here we have the period given as the time to complete one cycle = 10
The vertical shift, d, is the height above the bottom of the lake + amplitude = 11.4 ft + 3.6 ft/2 =13.2 ft
The amplitude is the distance from the highest point to the neutral point = 3.6/2 = 1.8 ft
Therefore, a = 1.8 ft
Again, we have that at t = 0, we have the dock is at its highest point, therefore, the dock agrees well with the cosine function that has the highest value at 0, therefore c = 0
The cosine function representing the motion of the dock is thus;
y = 1.8·cos(2π/10·t) + 13.2.