The rod Pendulum The torque about the rotation(z) axis is t=-mgd =-mgL2sine x-mgL210 for small 0 n this case I=。mL Soτ= la becomes L2 mg-0=mla XCM dL g a=-@ 0 where 2L Physics 121: Lecture 22, Pg 6
Physics 121: Lecture 22, Pg 6 The Rod Pendulum... The torque about the rotation (z) axis is = -mgd = -mg{L/2}sin -mg{L/2} for small In this case So = Ia becomes d L mg z L/2 xCM I = 1 3 2 mL a 2 3 1 2 mL L − mg = a 2 = − = 3 2 g L where d I
Lecture 22: Act 1 Period has the same period as the rod pendulum? so that What length do we make the simple pendulum R 3 a R R Physics 121: Lecture 22, Pg7
Physics 121: Lecture 22, Pg 7 Lecture 22: Act 1 Period (a) (b) (c) What length do we make the simple pendulum so that it has the same period as the rod pendulum? LR LS S LR 3 2 S LR L = 2 3 L = LS = LR
General Physical Pendulum Suppose we have some arbitrarily shaped solid of mass M hung on a fixed axis, that we know where the cm is located and what the moment of inertia I about the axis is Z-aXIs The torque about the rotation(z) axis for small e is(sin0≈0) d20 T=-Mgd≈-MgR MgRe=/ at e CM d20 o 0 where IgR 0=θcos(ot+d Physics 121: Lecture 22, Pg 8
Physics 121: Lecture 22, Pg 8 General Physical Pendulum Suppose we have some arbitrarily shaped solid of mass M hung on a fixed axis, that we know where the CM is located and what the moment of inertia I about the axis is. The torque about the rotation (z) axis for small is (sin ) = -Mgd -MgR d Mg z-axis R xCM d dt 2 2 2 = − = MgR I where = 0 cos(t + ) 2 2 dt d MgR I − = a
Lecture 22: Act 2 Physical Pendulum a pendulum is made by hanging a thin hoola-hoop of diameter D on a small nail What is the angular frequency of oscillation of the hoop for small displacements? (IcM mR2 for a hoop) pivot(nail a D (b) D VD 2D Physics 121: Lecture 22, Pg 9
Physics 121: Lecture 22, Pg 9 Lecture 22: Act 2 Physical Pendulum A pendulum is made by hanging a thin hoola-hoop of diameter D on a small nail. What is the angular frequency of oscillation of the hoop for small displacements ? (ICM = mR2 for a hoop) (a) (b) (c) = g D = 2g D = g 2D D pivot (nail)
Torsion Pendulum Consider an object suspended by a wire attached at its cm. the wire defines the rotation axis, and the moment of inertia I about this axis is known The wire acts like a rotational spring When this produces a torque that he object is rotated, the wire is 0 twisted T (L opposes the rotation In analogy with a spring, the torque produced is proportional to the displacement: t=-k0 Physics 121: Lecture 22, Pg 10
Physics 121: Lecture 22, Pg 10 Torsion Pendulum Consider an object suspended by a wire attached at its CM. The wire defines the rotation axis, and the moment of inertia I about this axis is known. The wire acts like a “rotational spring”. When the object is rotated, the wire is twisted. This produces a torque that opposes the rotation. In analogy with a spring, the torque produced is proportional to the displacement: = -k I wire