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MIT 2 003J - Rigid Body Dynamics

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Rigid Body Dynamics1.0 Where are we in the course?1.1 The Dumbbell Problem: Why Did we Do It?2.0 The Dynamics of Rigid Bodies2.1 Equivalence of Force-Torque Systems2.2 Equations for a Rigid Ensemble of Particles2.3 Simplifying2.3.1 Simplification #1: About the Center of Mass2.3.2 Simplification #2: About the Instantaneous Center of Rotation2.3.3 Simplification #3: My Grandmother Lives in Quito3.0 Energy: The Easy Free Equation3.1 Work Done by External Forces3.2 Potential Energy3.3 Kinetic Energy3.3.1 Kinetic Energy About the Center of Mass3.3.2 Kinetic Energy about the ICR3.4 The Work-Energy Principle4.0 Power5.0 How to Lay Out the Equations of MotionRigid Body Dynamics Professor Sanjay Sarma October 21, 2007 1.0 Where are we in the course? During the class of September 19th (about a month ago) I finished our coverage of kine-matics of frames, systems of particles, and to a large extent, rigid bodies. We developed three key concepts. Do you remember what they were? 1. The concept of frames of reference, and derivatives with respect to frames. This is the key concept. The concepts below can be derived from this first statement, and are sim-ply matters of convenience. 2. The magic formula for simplifying the taking of derivatives: A Bdr dr AB= + ω × r .dt dt 3. The super-ultra magic formula which you can use when there is a particle moving with respect to a frame of reference which is itself moving: AS AP BS AB PSAB AB PS AB BS a = a + a + α × r + ω × ( ω × r ) + 2 ω × V . During the subsequent three lectures, I covered kinetics of a single particle (momentum, Newton’s laws, work-energy principle, angular momentum) and collisions. At that time, in terms of a roadmap of the course, we were as shown below. We said we would start examining the kinetics and the constitutive relationships of systems of parti-cles and proceed to rigid bodies. System Kinematics Kinetics & Constitutive Particle System of particles Rigid Bodies Lagrangian formulation Oscillations 1.1 The Dumbbell Problem: Why Did we Do It? During the lecture on the 10th of October, I analyzed the equations of motion of a dumb-bell. Why did I do it? There were two reasons: 1. First, notice that I solved the dumbbell problem using nothing more than the kinematics that we had just derived, and Newton’s Laws. The primary point I was making was that we actually have all the basic machinery to solve complex problems with multiple par-Rigid Body Dynamics October 21, 2007 Cite as: Sanjay Sarma, Nicholas Makris, Yahya Modarres-Sadeghi, and Peter So, course materials for 2.003J/1.053J Dynamics and Control I, Fall 2007. MIT OpenCourseWare (http://ocw.mit.edu), Massachusetts Institute of Technology. Downloaded on [DD Month YYYY]. 1O a1 a2 A e f P Q C r OC rCQ r CP b2 b1 θ FQ FP ticles, like the dumbbell. It might be tedious, but it is there. Now we seek ways to sim-plify the analysis. 2. We solved the dumbbell problem the hard way: by formulating the equations of motion for the particles individually. Each particle was treated as if it had two degrees of free-dom in 2D. We modeled the constraint that the particles couldn’t move with respect to each other, and we explicitly put down the internal forces, which we also cancelled.1 How do we simplify the analysis? Well, when we did the analysis, this is what we found that the equations of motion boiled down to: ACFP + FQ = m a (EQ 1) and CQ AB r× (FP – FQ) = (2ml2)α . (EQ 2) In other words, for this rigid body: • the total force equals mass times centroidal acceleration; and • the total torque equals a new term called the moment of inertia multiplied by angular acceleration. That’s a total of 3 equations. 2.0 The Dynamics of Rigid Bodies This is a fantastic discovery if we can generalize it. The consequences: • In 2D, a rigid body has 3 degrees of freedom—two translation and one rotation. Guess what, the vector equations of the form above would give us 3 scalar equations—just what we need. • In 3D, a rigid body has 6 degrees of freedom—three translation and three rotation. Guess what, vector equations of the type above would give us 6 scalar equations—just what we need. Here’s the great part: we can indeed generalize Equations 1 and 2. Let’s recap where we ended up for rigid bodies. First, though, a small digression on force-torque equivalence. 1. When I was in college, I had a friend who misread the term “internal forces” and thought they were called “infernal forces.” I thought it was a very apt Freudian slip. Rigid Body Dynamics October 21, 2007 2 Cite as: Sanjay Sarma, Nicholas Makris, Yahya Modarres-Sadeghi, and Peter So, course materials for 2.003J/1.053J Dynamics and Control I, Fall 2007. MIT OpenCourseWare (http://ocw.mit.edu), Massachusetts Institute of Technology. Downloaded on [DD Month YYYY].2.1 Equivalence of Force-Torque Systems A key principle in rigid-body dynamics, which everyone takes for granted is the principle of equivalence of different force-torque systems. The principles of equivalence are sum-marized below. = F F = F -F d F -F d A force can move along its line of action and be completely equivalent Two equal and opposite forces as shown create a pure moment, also called a couple. A couple can be moved around and be completely Center of mass C, or = FSi∑ r CSi FSi×∑ SiFSi Combining the two: any system of forces can be replaced by the total force, applied through C, and the total torque about C, applied as a pure moment. equivalent as far as its effect. indeed, any point. a)A force through a point can be replaced with the same force through any other point which is in the same line and have the exact same effect on the rigid body. b)A perfect couple of forces (i.e., equal and opposite forces separated by some perpendic-ular distance) can be moved to any point on the rigid body and still have the same effect. This is called a pure moment or a couple. c)Any system of forces can be replaced by an equivalent system of forces where: • There is one force, equal to the total of all the forces, through the center of mass; • And one pure moment, equal to the torque of all the forces about the center of mass. • In fact you can do this with any point, not just the center of mass. This cool principle reduces any complex set of forces on a rigid body to a canonical form consisting of one force (a vector in 2D) and a torque (effectively a scalar in 2D). OK, with that done,


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MIT 2 003J - Rigid Body Dynamics

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