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How do I set this up? "The elastic limit of a piece of steel wire is 2.7 X 10^9 Pa. What is the maximum speed at which transverse wave pulses can propagate along this wire before this stress is exceeded? (The density of steel is 7.86 X 10^3 kg/m^3)
I know v = \sqrt{\frac{T}{\mu}} so I guess I'd solve for T? And how do I pull the force from the elastic limit without the area?
thanx!
How do I set this up? "The elastic limit of a piece of steel wire is 2.7 X 10^9 Pa. What is the maximum speed at which transverse wave pulses can propagate along this wire before this stress is exceeded? (The density of steel is 7.86 X 10^3 kg/m^3)
I know v = \sqrt{\frac{T}{\mu}} so I guess I'd solve for T? And how do I pull the force from the elastic limit without the area?
thanx!
Hi.
Notice that \rho = { mass \over length \times area} and \mu = {mass \over length} so that \rho = {\mu \over area} where, by "area" I mean the cross sectional area.
Also, Pressure = Force over area, so P_{max} = {T_{max} \over area} . With this you should be able to rewrite the speed in terms of the pressure and the volume mass density \rho.
I hope this helps
Patrick
yes it helped! i hope i remember it! thanks!
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