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This lecture introduces the course goals, physics concepts, and mathematical methods used in intermediate mechanics. Topics covered include Newton's laws, conservation laws, Lagrangian and Hamiltonian formulation, central force problems, and oscillations.
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Intermediate MechanicsPhysics 321 Richard Sonnenfeld New Mexico Tech :00
Lecture #1 of 25 • Course goals • Physics Concepts / Mathematical Methods • Class background / interests / class photo • Course Motivation • “Why you will learn it” • Course outline (hand-out) • Course “mechanics” (hand-outs) • Basic Vector Relationships • Newton’s Laws • Worked problems • Inertia of brick and ketchup III-3,4 :02
Physics Concepts • Classical Mechanics • Study of how things move • Newton’s laws • Conservation laws • Solutions in different reference frames (including rotating and accelerated reference frames) • Lagrangian formulation (and Hamiltonian form.) • Central force problems – orbital mechanics • Rigid body-motion • Oscillations lightly • Chaos :04
Mathematical Methods • Vector Calculus • Differential equations of vector quantities • Partial differential equations • More tricks w/ cross product and dot product • Stokes Theorem • “Div, grad, curl and all that” • Matrices • Coordinate change / rotations • Diagonalization / eigenvalues / principal axes • Lagrangian formulation • Calculus of variations • “Functionals” and operators • Lagrange multipliers for constraints • General Mathematical competence :06
Class Background and Interests • Majors • Physics? EE? CS? Other? • Preparation • Assume Math 231 (Vector Calc) • Assume Phys 242 (Waves) • Assume Math 335 (Diff. Eq) concurrent • Assume Phys 333 (E&M) concurrent • Year at tech • 2nd 3rd 4th 5th • Graduate school? • Greatest area of interest in mechanics :08
Physics Motivation • Physics component • Classical mechanics is incredibly useful • Applies to everything bigger than an atom and slower than about 100,000 miles/sec • Lagrangian method allows “automatic” generation of correct differential equations for complex mechanical systems, in generalized coordinates, with constraints • Machines and structures / Electron beams / atmospheric phenomena / stellar-planetary motions / vehicles / fluids in pipes :10
Mathematics Motivation • Mathematics component • Hamiltonian formulation transfers DIRECTLY to quantum mechanics • Matrix approaches also critical for quantum • Differential equations and vector calculus completely relevant for advanced E&M and wave propagation classes • Functionals, partial derivatives, vector calculus. “Real math”. Good grad-school preparation. :12
About instructor • 15 years post-doctoral industry experience • Materials studies (tribology) for hard-drives • Automated mechanical and magnetic measurements of hard-drives • Bringing a 20-million unit/year product to market • Likes engineering applications of physics • Will endeavor to provide interesting problems that correspond to the real world :16
Course “Mechanics” • WebCT / Syllabus and Homework • Office hours, Testing and Grading :26
Vectors and Central forces • Vectors • Many forces are of form • Remove dependence of result on choice of origin Origin 1 Origin 2 :30
Vector relationships • Vectors • Allow ready representation of 3 (or more!) components at once. • Equations written in vector notation are more compact :33
Vector Relationships -- Problem #1-1“The dot-product trick” B Given vectors A and B which correspond to symmetry axes of a crystal: Calculate: Where theta is angle between A and B A :38
Vector relationships II – Cross product • Determinant • Is a convenient formalism to remember the signs in the cross-product • Levi-Civita Density (epsilon) • Is a fancy notation worth noting for future reference (and means the same thing) • For any two indices equal • I,j,k even permutation of 1,2,3 • I,j,k odd permutation of 1,2,3
Newton’s Laws • A Body at rest remains at rest, while a body in motion at constant velocity remains in motion Unless acted on by an external force • The rate of change of momentum is directly proportional to the applied force. • Two bodies exert equal and opposite forces on each other <--- Using 2 and 3 Together :42
Newton’s Laws imply momentum conservation In absence of external force, momentum change is equal and opposite in two-body system. Regroup terms Integrate. Q.E.D. Newton’s laws are valid in all inertial (i.e. constant velocity) reference frames :45
Two types of mass? Gravitational mass mG W= mGg Inertial mass mI F=mIa mG g a=0 mI a>0 “Gravitational forces and acceleration are fundamentally indistinguishable” – A.Einstein :48
Momentum Conservation -- Problem #1-2“A car crash” James and Joan were drinking straight tequila while driving two cars of mass 1000 kg and 2000 kg with velocity vectors and Their vehicles collide “perfectly inelastically” (i.e. they stick together) Assume that the resultant wreck slides with velocity vector Friction has not had time to work yet. Calculate :55
Two types of mass -- Problem #1-3 a-b“Galileo in an alternate universe” A cannonball (mG = 10 kg) and a golf-ball (mG = 0.1 kg) are simultaneously dropped from a 98 m tall leaning tower in Italy. Neglect air-resistance How long does each ball take to hit the ground if: • mI=mG • mI =mG * mG :65
Lecture #1 Wind-up • . • Buy the book!! • First homework due in class Thursday 8/29 • Office hours today 3-5 • Get on WebCT