nathangrand
Dec7-10, 06:42 AM
A light rigid pendulum of length l with a bob of mass M is to be used as the
timing element of a mechanical clock. Write down the equation of motion for the
system and hence determine the period of oscillation T. A second mass m is now attached to the pendulum arm at a distance x from the pivot, where 0 < x < l. Obtain an expression for the new period of oscillation T0. Assuming that the mass m is much smaller than M, determine the position
x at which it exerts its greatest infuence on the period T0.
For first part got d''(theta)/dt^2 (g/l)theta =0
which gives T=2Pi*SQRT(L/g)
For second part get equation d''(theta)/dt^2 + theta(Mgl + mgx)/(mx^2 + Ml^2) = 0
and T0 of 2pi* SQRT((mx^2 + Ml^2)/(Mgl + mgx))
I have no real idea though how to find the value for x at which the small mass has the largest influence on T0......thought about differentiating something perhaps?
timing element of a mechanical clock. Write down the equation of motion for the
system and hence determine the period of oscillation T. A second mass m is now attached to the pendulum arm at a distance x from the pivot, where 0 < x < l. Obtain an expression for the new period of oscillation T0. Assuming that the mass m is much smaller than M, determine the position
x at which it exerts its greatest infuence on the period T0.
For first part got d''(theta)/dt^2 (g/l)theta =0
which gives T=2Pi*SQRT(L/g)
For second part get equation d''(theta)/dt^2 + theta(Mgl + mgx)/(mx^2 + Ml^2) = 0
and T0 of 2pi* SQRT((mx^2 + Ml^2)/(Mgl + mgx))
I have no real idea though how to find the value for x at which the small mass has the largest influence on T0......thought about differentiating something perhaps?