Physics I: Classical Mechanics Exam 1 with Useful Equations Sheet, Exams of Classical Mechanics

Download Physics I: Classical Mechanics Exam 1 with Useful Equations Sheet and more Exams Classical Mechanics in PDF only on Docsity! MIT OpenCourseWare http://ocw.mit.edu 8.012 Physics I: Classical Mechanics Fall 2008 For information about citing these materials or our Terms of Use, visit: http://ocw.mit.edu/terms. MASSACHUSETTS INSTITUTE OF TECHNOLOGY Department of Physics Physics 8.012 Fall 2008 Exam 1 NAME: _____________ _ _ _ __________________ Instructions: 1. Do all FIVE (5) problems. You have 90 minutes. 2. SHOW ALL WORK. Be sure to circle your final answer. 3. Read the questions carefully. 4. All work must be done in this booklet in workspace provided. Extra blank pages are provided at the end if needed. 5. NO books, notes, calculators or computers are permitted. A sheet of useful equations is provided on the last page. Your Scores Problem Maximum Score Grader 1 10 2 30 3 20 4 20 5 20 Total 100 8.012 Fall 2008 Quiz 1 Problem 2: The Accelerated Atwood Machine [30 pts] Two blocks of masses M1 and M2 (M2 > M1) are stacked on top of each other and start at rest on the surface of a frictionless table. The masses are connected via an ideal pulley (massless string and nearly massless pulley wheel), and the coefficient of static friction (assumed equal to the coefficient of kinetic friction) between the block surfaces is µS. The pulley is accelerated to the right by a force , resulting in an acceleration of the pulley wheel of . Assume that gravity acts with constant acceleration g downward. (a) [5 pts] Draw force diagrams for each of the blocks and the pulley wheel, clearly indicating all horizontal and vertical forces acting on them. (b) [5 pts] If the blocks do not slip relative to each other, what are their accelerations? (c) [10 pts] Assume that the blocks do slip relative to each other. Determine each block’s horizontal acceleration as a function of the parameters specified above (i.e., M1, M2, µS, g, a and F). Which block has a higher acceleration? Be sure to work in an inertial reference frame! (d) [10 pts] What is the minimum force F required to cause one block to slip relative to the other? Assume that the mass of the pulley is negligible compared to those of the blocks. Page 4 of 8 8.012 Fall 2008 Quiz 1 Problem 3: Hanging Rope [20 pts] Consider a rope of total mass M and length L suspended at rest from a fixed mount. The rope has a linear mass density that varies with height as λ(z) = λ0sin(πz/L) where λ0 is a constant. Constant gravitational acceleration g acts downward. (a) [5 pts] Determine the constant λ0. (b) [5 pts] What is the tension force at the free (bottom) end of the rope? (c) [10 pts] Calculate the tension along the rope as a function of distance z below the mount. Page 5 of 8 8.012 Fall 2008 Quiz 1 Problem 4: Don’t Slip! [20 pts] µ M r An 8.012 student of mass M stands on a rigid disk at a distance r from the center axis. Assume that the coefficient of friction between the student’s shoes and the disk surface is µ. At time t = 0, the disk begins to rotate with a constant angular acceleration rate . Assume that gravity acts with constant acceleration g downward. (a) [5 pts] What is the maximum value of angular acceleration rate (αmax) such that the student does not immediately slip? (b) [10 pts] Assuming that α < αmax, what is the total friction force acting on the student as a function of time (prior to slipping)? Write your answer as a vector in polar coordinates. (c) [5 pts] Assuming that α < αmax, how long after the disk starts rotating will the student slip? Page 6 of 8