Recent content by AToMic93

So I completely redid the problem a different way and I think this is right. Let me know if it is or not: Equations: 1) v=√(T/μ) 2) v=(2Lf)/n Attempt at solution: Solve equation 1 for μ=T/v2, then solve equation 2 for f=vn/2L. Then derive f equation to get in terms of df/dn (slope of...

HELP: Solving for equation of linear mass density of a string Homework Statement You will plot frequency vs. number of segments and determine a slope. Write the expression which will allow you to solve for the linear mass density of the string in terms of L, T, and the slope of your plot...

Alright I got it. Thanks

So the main question I have then is for when I'm deriving how do I deal with the θmax? Do I treat it just like θ or do I treat it like a constant?

Would you take the second derivative with respect to time? (giving d2/dt2) then set this equal to the other equation?

Homework Statement Derive the angular frequency equation (ω=√(g/L) from following equations: Homework Equations 1) ((d^2)*θ)/(d*t^2)= (-g/L)*θ 2) θ=θmaxcos(ωt+δ) The Attempt at a Solution I don't even know where to start