Elson Posted June 17, 2007 Posted June 17, 2007 Hello i'm new to this forum and i'm facing some problems while dealing with this question. A particle is moving along the x axis in SHM. It starts from the equilibrium position and moves towards the right at t = 0 s. The amplitude of the motion is 2 cm, and the frequency is 1.5 Hz. 1)The equation for velocity can be determined by differentiating the function for displacement w.r.t. t, V = AWn cos (Wn t) Therefore, the maximum speed will be |V max| = A(Wn)(1) <---- what is this? where does the (1) come from? 2)The time that it first occurs could be found as follow; cos(Wnt) = −1, <--- why is it -1? Wt = cos−1(−1), t = 0.33 s.
timo Posted June 17, 2007 Posted June 17, 2007 - What is "SHM" ? - The 1 is the maximum value that |cos(something)| can have. - |cos(something)| = 1 implies that either cos(something)=1 or cos(something)=-1. Since I don't understand the question, I cannot tell you why it is -1. But you could probably plug in both and see which gives a smaller value for t. I'd guess that cos(something)=1 would be the case for t=0 s and therefore give the smaller time. But then, I don't really understand the question, anyways.
imp Posted June 18, 2007 Posted June 18, 2007 - What is "SHM" ? . If your question is not posed as facetious (humorous), "SHM" is usually meant to be "Simple Harmonic Motion". My old Calculus text says the pistons in a typical internal combustion engine move in Simple Harmonic Motion. Do you suppose that is true? imp
timo Posted June 18, 2007 Posted June 18, 2007 Yes, the question was serious. You cannot assume everyone here had his/her physics education in english and knows the common abbrevations. In fact, the use of abbrevations usually is a bad idea when there's a wide target audience. Harmonic motion is the result of movement against a force F = k x, where x is the displacement from some origin and k some constant. I don't see why this should be the case for a combustion engine, but I cannot prove that it isn't the case. If your textbook sais it was the case, then it's probably a reasonably good approximation, at least. It's certainly not true for phases of acceleration (of the car) since harmonic motion implies a constant frequency which clearly isn't the case when you hit the gas pedal.
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