Oscillator Max Speed - Calculate Vmax

AI Thread Summary
To determine the maximum speed (Vmax) of a 284 g oscillator, the relationship Vmax = 2πfA is utilized, where A is the amplitude and f is the frequency. The user is confused about how to find the amplitude (A) using the given speeds and displacements, and they have derived the equation (v/w)² + x² = A² to relate the variables. With two sets of values for speed and displacement, they can solve for the angular frequency (w) and subsequently for A. The mass of the oscillator is deemed unnecessary for this particular calculation unless additional information is provided regarding the spring constant. The discussion focuses on the mathematical approach to solving for Vmax using the provided data points.
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Homework Statement



A 284 g oscillator has a speed of 94.86 cm/s when its displacement is 2.98 cm and 74.06 cm/s when its displacement is 5.92 cm. What is the oscillator's maximum speed?

Homework Equations


Vmax=2pi*f*A


The Attempt at a Solution


confused as to wat the AMP would be
 
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If you let x = A*sin(w*t) then v = A*w*cos(w*t).

Then you can see that (v/w)^2 + x^2 = A^2.

Thats enough information to solve for w because you have 2 points given:

(v1/w)^2 + x1^2 = (v2/w)^2 + x2^2.

In turn you can solve for A and finally vmax.

I don't see any use for the mass unless there is another part to the problem to find the spring constant or something like that.
 
When you wrote w, did you mean omega or weight?
 
ok i solved for w
and i was going to put it into the other equation u gave me for A but i don't kno which V or X to put in for it
 
v1, x1 : a speed of 94.86 cm/s when its displacement is 2.98 cm
v2, x2 : 74.06 cm/s when its displacement is 5.92 cm
 

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