I. Warm-UP. Revolve, Rotate & Roll: Physics 203, Yaverbaum John Jay College of Criminal Justice, the CUNY Given g, the rate of free-fall acceleration near Earth s surface, and r, the radius of a VERTICAL circle in which a bucket of water, mass m, will be swung, derive v(min): the lowest speed at which the bucket could pass through the TOP point of the circle and spill no water. II. CONICAL PENDULUM. Without anything touching it, a small brass disc of mass m hangs vertically from the end of a light string. The mass sits stably. The string is L meters long. g is g. At some moment, the disc is displaced a small angle θ from the vertical and held at this otherwise unstable location. The disc is given a tiny initial velocity perpendicular to the line pointing from mass to vertical. It starts swinging in a horizontal circle around the vertical. The shape of the entire apparatus resembles a cone. i. In terms of given constants, derive T the period of oscillation for this conical pendulum. ii. Show how the period of a conical reduces to the period of a planar pendulum in the limit as the angle approaches 0. iii. iii. In no more than 3 complete sentences of English, explain the physical meaning the situation referred to in (ii), above. That is, how can we picture or believe in a pendulum that is angularly displaced from the vertical by an angle that is arbitrarily close to zero degrees/radians? How, moreover, can we believe that such a pendulum would take a finite amount of time to complete a full trip around?
III. BANKED CURVE. a) In Edition 10, Extended, of our Halliday, Resnick, Walker text, carefully read Sample Problems 6.05 and 6.06. In this particular edition, you will find these Sample Problems on pages 136-138 of your text, carefully read both Sample Problems. If you are using a different edition, please note that these two problems describe a car making a turn on a frictional surface. The first Sample analyzes a purely horizontal version of the scenario. The second Sample analyzes the more general frictional Banked Curve. This is challenging, but classic. You MUST know how to analyze the Frictional Banked Curve. b) Solve for the (horizontal but) BANKED CURVE situation IN GENERAL: That is, given a banked curve of radius r, bank angle Ɵ (and acceleration due to gravity g), find: i. The unique speed at which a car can stably complete the curve--in the absence of friction and ii. The range of accelerations at which a car can stably complete the curve--if friction is present, coefficient µ and iii. The range of speeds at which a car can stably complete the curve--if friction is present, coefficient µ.
IV. Torque A long, uniform rod of mass M and length l is supported at the left end by a horizontal axis into the page and perpendicular to the rod, as shown above. The right end is connected to the ceiling by a thin vertical thread so that the rod is horizontal. The moment of inertia of the rod about the axis at the end of the rod is Ml 2 /3. Express the answers to all parts of this question in terms of M, l, and g. a. Determine the magnitude and direction of the force exerted on the rod by the axis. The thread is then burned by a match. For the time immediately after the thread breaks, determine each of the following: b. The angular acceleration of the rod about the axis c. The translational acceleration of the center of mass of the rod d. The force exerted on the end of the rod by the axis The rod rotates about the axis and swings down from the horizontal position. e. Determine the angular velocity of the rod as a function of θ, the arbitrary angle through which the rod has swung.
V. Systems Block A of mass 2M hangs from a cord that passes over a pulley and is connected to block B of mass 3M that is free to move on a frictionless horizontal surface, as shown above. The pulley is a disk with frictionless bearings, having a radius R and moment of inertia 3MR 2. Block C of mass 4M is on top of block B. The surface between blocks B and C is NOT frictionless. Shortly after the system is released from rest, block A moves with a downward acceleration a, and the two blocks on the table move relative to each other. In terms of M, g, and a, determine the a. tension T v in the vertical section of the cord b. tension T h in the horizontal section of the cord If a = 2 meters per second squared, determine the c. coefficient of kinetic friction between blocks B and C d. acceleration of block C
VI. Conservation of Angular Momentum A thin, uniform rod of mass M 1 and length L, is initially at rest on a frictionless horizontal surface. The moment of inertia of the rod about its center of mass is M 1 L 2 /12. As shown in Figure I, the rod is struck at point P by a mass m 2 whose initial velocity v is perpendicular to the rod. After the collision, mass m 2 has velocity -½v as shown in Figure II. Answer the following in terms of the symbols given. a. Using the principle of conservation of linear momentum, determine the velocity v of the center of mass of this rod after the collision. b. Using the principle of conservation of angular momentum, determine the angular velocity, ω, of the rod about its center of mass after the collision. c. Determine the change in kinetic energy of the system resulting from the collision.
VII. Rolling on an Incline. A large sphere rolls without slipping across a horizontal surface. The sphere has a constant translational speed of 10 meters per second, a mass m of 25 kilograms, and a radius r of 0.2 meter. The moment of inertia of the sphere about its center of mass is I = 2mr 2 /5. The sphere approaches a 25 incline of height 3 meters as shown above and rolls up the incline without slipping. a. Calculate the total kinetic energy of the sphere as it rolls along the horizontal surface. b. i. Calculate the magnitude of the sphere's velocity just as it leaves the top of the incline. ii. Specify the direction of the sphere's velocity just as it leaves the top of the incline. c. Neglecting air resistance, calculate the horizontal distance from the point where the sphere leaves the incline to the point where the sphere strikes the level surface. d. Suppose, instead, that the sphere were to roll toward the incline as stated above, but the incline were frictionless. State whether the speed of the sphere just as it leaves the top of the incline would be less than, equal to, or greater than the speed calculated in (b). Explain briefly.
VIII. TOPspin *** (BONUS) *** A tennis ball, mass 8 grams, radius 5 centimeters, is given an initial translational velocity of 5 m/s relative to a rough horizontal ground. But it is given NO initial angular velocity! The coefficients of static and kinetic friction from the ground are.6 and.4, respectively. That is, the tennis ball has a significant amount of "top-spin" and skids along the ground for a while --until the tennis ball FINALLY achieves a "static roll". The question is: How far does the tennis ball travel before its roll becomes "static" (no backspin/no topspin)?! Hints: 1. This problem is not easy, but it is entirely solvable. Break it down into tiny steps. You will need to consider F = ma AND τ = Iα 2. Friction most certainly MUST act on the ball. Ask yourself: Is it static or kinetic? In which direction does it act? 3. In the final moment, once the top-spin is gone and the ball rolls stably, ω =!, etc. But until then, such relations do not hold.!