CaptainBlood Posted April 4, 2011 Posted April 4, 2011 (edited) An object is moving counterclockwise in a circle of radius r at constant speed v. The center of the circle is at the origin of rectangular coordinates (x, y), and at t = 0 the particle is at (r, 0). If the angular frequency is given by ω = v/r, show that x'' + ω^2 r = 0 and y'' + ω^2 r = 0 Attempted Solution:If particle is at (r,0) then r = x we know: ar = v2/r = ω^2 since velocity is constant ar = so x'' has to equal 0 thus x'' + ω2 r = 0 the same argument can be applied to y'' + ω^2 r = 0 proving the second statement Is this correct? Is there a better way of showing the two statements are true? Edited April 4, 2011 by CaptainBlood
DrRocket Posted April 4, 2011 Posted April 4, 2011 An object is moving counterclockwise in a circle of radius r at constant speed v. The center of the cir- cle is at the origin of rectangular coordinates (x, y), and at t = 0 the particle is at (r, 0). If the "angular frequency" is given by ω = v/r, show that x'' + ω2 r = 0 and y'' + ω2 r = 0 Attempted Solution: If particle is at (r,0) then r = x This is true for t=0 and ωt = 2n pi we know: ar = v2/r = ω2 rsince velocity is constant ar = 0 I assume ar is radial acceleration and not a x r. In any case velocity is not constant. Speed is constant. If ar = v2/r and v2 is constant then ar is not zero unless v is also zero. If ar were 0 there would be no such thing as centripetal acceleration. so x'' has to equal 0 thus x'' + ω2 r = 0 nope I would approach this by noting that for uniform circular motion x = r cos( ωt) and y = r sin(ωt) and then differentiate to get velocity and acceleration. Your equations are not true in general, but x'' + ω2 r = 0 is true for t=0 while y'' + ω2 r = 0 is not.
CaptainBlood Posted April 4, 2011 Author Posted April 4, 2011 (edited) I'm sorry, I don't understand what is t and what is n in ωt = 2n pi. Also why are you using ωt in x = r cos (ωt) instead of theta? Edited April 4, 2011 by CaptainBlood
DrRocket Posted April 5, 2011 Posted April 5, 2011 (edited) I'm sorry, I don't understand what is t and what is n in ωt = 2n pi. Also why are you using ωt in x = r cos (ωt) instead of theta? t is time. n is an integer. [math]\omega t = 2n \pi [/math] is required in order that [math] cos( \omega t) = 1 [/math] [math]\omega t = \theta[/math] in uniform circular motion. It would help if you indicated your level of education and where you are encountering this problem. Edited April 5, 2011 by DrRocket
CaptainBlood Posted April 5, 2011 Author Posted April 5, 2011 (edited) Great, thank you very much DrRocket, I gotta run now but I'll try to solve this a little later. This problem is given in the first semester Physics course and unfortunately before we learned about rotational motion besides the ar = v^2/r , I'm undergrad. Edited April 5, 2011 by CaptainBlood
CaptainBlood Posted April 5, 2011 Author Posted April 5, 2011 (edited) Ok, I did it. Thanks a lot for your help I really appreciate it. Edited April 5, 2011 by CaptainBlood
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