Answer:
1360 cm
Explanation:
Oscillating Motion
The shadow of a pendulum's x-coordinate is given by
x(t) = 34cos(πt)
Where 34 cm is the amplitude of the oscillation and [tex]w=\pi[/tex] is the angular frequency. Each time the shadow completes a whole cycle, it travels four times the amplitude: Twice from the peak to the valley and twice from the valley back to the peak. This means that each cycle the shadow travels 4*34=136 cm
Let's find the period of the oscillations. Given w, we can know the period by the formula
[tex]\displaystyle T=\frac{2\pi}{w}=\frac{2\pi}{\pi}=2\ sec[/tex]
If we want to calculate the distance traveled by the shadow in 20 seconds, we can see it makes 20/2=10 full cycles, each one traveling 136 cm, thus the total distance traveled is 10*136=1360 cm
