Position vs Time Graph: Simple Harmonic Motion

Join the discussion
Ask a follow-up here, or get your own question answered by working scientists, mathematicians and engineers — people, not an autocomplete.
Real named experts · corrections over time · the nuance an AI answer skips
8 replies · 3K views
Dorian
Messages
10
Reaction score
1

Homework Statement



[see attached photo]

I seek specific help with (a) only. The answers to this question are provided in the back of the textbook, so I know the answers (I hope).

Homework Equations



##x(t)=Acos(\omega t+\phi _{0}),##

##v_{x}(t)=-A\omega sin(\omega t+\phi _{0})=-v_{max}sin(\omega t+\phi _{0}),##

##v_{max}=\frac{2\pi A}{T}##

The Attempt at a Solution



For (b), I got ##v_{x}(0)=13.6 \frac{cm}{s}##

For (c), I got ##v_{max}=15.7 \frac{cm}{s}##

Both of these answers are correct, according to the back of the textbook

For (a) (the phase constant), however, the back of the book says the correct answer is ##\phi _{0}=-\frac{2\pi}{3}##

I got: ##\frac{1}{2}A=Acos(\phi _{0})\Rightarrow cos^{-1}(\frac{1}{2})=\phi _{0}=\pm \frac{\pi}{3}##, for which I got ##-\frac{\pi}{3}## since it's moving to the right at ##t=0 s##

With this answer, I was able to acquire the right answers for (b) and (c). Furthermore, I was able to accurately graph the same graph provided in the text using my answer, but not so with the answer given in the textbook. I'm lost, really. Can someone please help point something out that I'm missing?
 

Attachments

  • 15.7 question randall knight 4th.png
    15.7 question randall knight 4th.png
    83.1 KB · Views: 936
Physics news on Phys.org
Thank you both for your help! And yes, the cos is what's in the textbook, although I remember from a trigonometry textbook I used once upon a time that both cos and sin can work.
 
haruspex said:
Sure, but in order to define the phase you need to know which is to be used.

I'm aware :) Thanks!

I'm more concerned that the textbook had a wrong answer (if this is in fact the case), which made me question my understanding in an unproductive way.