Simple Harmonic Motion: What is Phase Constant?

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The phase constant \(\phi\) in Simple Harmonic Motion (SHM) represents the initial angle or phase of the motion at time \(t = 0\). It determines the starting position of the particle on the sinusoidal graph, affecting where the motion begins for a given amplitude and frequency. While it can be eliminated by adjusting the starting time, different values of \(\phi\) will result in different starting points on the graph. The discussion emphasizes that the presence of \(\phi\) does not change the fundamental characteristics of the motion, just its initial conditions. Understanding the phase constant is crucial for accurately describing the motion of particles in SHM.
justwild
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I just started learning Simple Harmonic Motion and encountered a word Phase Constant \phi .
Actually it appeared as
f(t)=rsin(\omega t+\phi)
I am confused whether phase constant is actually the initial position of the particle(which execute SHM) and therefore the point on graph at time=0 or not!
 
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welcome to pf!

hi justwild! welcome to pf! :wink:

you're right, the phase constant is the initial angle (or initial phase): the angle (or phase) at t = 0 :smile:
 
what is the harm if we just take \omega t as the argument.
 
You just shift the motion in phase slightly. All te same key features are there.
 
If \phi is the initial angle then I think the sinusoidal graph will show different starting points(t=0) for different values of \phi of the same amplitude and frequency of vibration. Is that so?
 
justwild said:
what is the harm if we just take \omega t as the argument.

you can eliminate the phase constant by changing the starting time …

if you replace t by t + φ/ω, then the phase constant is zero :smile:
justwild said:
If \phi is the initial angle then I think the sinusoidal graph will show different starting points(t=0) for different values of \phi of the same amplitude and frequency of vibration. Is that so?

not following you :confused:
 

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