What torque would have to be applied to a rod with a length of #4 m# and a mass of #3 kg# to change its horizontal spin by a frequency of #2 Hz# over #3 s#?
1 Answer
I got
The sum of the torques for a rod is written as:
#\mathbf(sum vectau = Ibaralpha)#
I assume we are looking at a rod rotating horizontally on a flat surface (so that no vertical forces apply), changing in angular velocity over time.
Then, we are looking at the average angular acceleration
#\mathbf(baralpha = (Deltavecomega)/(Deltat) = (vecomega_f - vecomega_i)/(t_f - t_i) = (vecomega_f)/t),# where if we assume the initial angular velocity
#vecomega_i = 0# , then#vecomega_f = Deltavecomega# , and with initial time#t_i = 0, t_f = t# .
Next, for this ideal rod of length
#color(green)(I_"cm") = m/Lint_(-L/2)^(L/2) r^2dr# where
#r# would be the distance from the center of mass to the end of the rod, or#L/2# .
#= m/L|[r^3/3]|_(-L/2)^(L/2)#
#= m/L[(L/2)^3/3 - (-L/2)^3/3]#
#= m/L[L^3/24 + L^3/24]#
#= m/L[L^3/12]#
#= color(green)(1/12mL^2)#
Lastly, we should recognize that the frequency is not equal to
#2pif = omega#
So, the torque needed should be:
#color(blue)(sum vectau) = vectau_(vec"F"_"app") = I_"cm"baralpha#
#= (mL^2)/12(vecomega_f)/t#
#= (("3 kg"cdot("4 m")^2)/12)((2pi*"2 s"^(-1))/("3 s"))#
#= color(blue)(5.bar"33"pi)# #color(blue)("N"cdot"m")#
