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Mathematical & Mechanical Method in Mechanical Engineering. Dr. Wang Xingbo Fall , 2005. Mathematical & Mechanical Method in Mechanical Engineering. Introduction to Lagrangian Mechanics. Generalized coordinates, generalized forces and constraints Generalized Newton’s 2nd Law
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Mathematical & Mechanical Method in Mechanical Engineering Dr. Wang Xingbo Fall,2005
Mathematical & Mechanical Method in Mechanical Engineering Introduction to Lagrangian Mechanics • Generalized coordinates, generalized forces and constraints • Generalized Newton’s 2nd Law • Generalized Equation of Motion • Lagrange’s Equations (Scalar Potential Case)
Mathematical & Mechanical Method in Mechanical Engineering Coordinates In two-dimensions the positions of a point can be specified either by its rectangular coordinates (x, y) or by its polar coordinates. There are other possibilities such as confocal conical coordinates that might be less familiar. In three dimensions there are the options of rectangular coordinates (x, y, z), or cylindrical coordinates (ρ, , z) or spherical coordinates (r, θ, ) (see Fig. 9.1) – or again there may be others that may be of use forspecialized purposes (inclined coordinates in crystallography, for example, or a more general curvilinear coordinate system).
Mathematical & Mechanical Method in Mechanical Engineering Generalized coordinates In many cases, other more generalized coordinates are needed to describe a dynamic system Any that is used to describe the dynamic state of a system is called generalized coordinate.
Mathematical & Mechanical Method in Mechanical Engineering Constraints In many systems, the particles may not be free to wander anywhere at will; The particle’s motion may be constrained to lie within a submanifold of the full configuration space A constraint that can be described by an equation relating the coordinates (and perhaps also the time) is called a holonomic constraint.
Mathematical & Mechanical Method in Mechanical Engineering Degrees of freedom The total number of generalized coordinates minus the number of holonomic constraints contributes the degrees of freedom of a system. If a system of N particles is subject to k holonomic constraints , then the degree of freedom is 3N-k
Mathematical & Mechanical Method in Mechanical Engineering Generalized Newton’s 2nd Law Generalized dynamics—the derivation of differential equations (equations of motion) for the time evolution of the generalized coordinates the goal of generalized dynamics is to find universal forms of the equations of motion
Mathematical & Mechanical Method in Mechanical Engineering Generalized dynamics Position of each of the N particles making up the system be given as a function of the n generalized coordinates q by rk = xk(q, t), k = 1, . . . ,N. the virtual work done on the system in displacing it by an arbitrary infinitesimal amountδqat fixed time t is given by
Mathematical & Mechanical Method in Mechanical Engineering Generalized dynamics Calculate the virtual work in terms of the displacements of the N particles assumed to make up the system and the forces Fk acting on them
Mathematical & Mechanical Method in Mechanical Engineering Generalized dynamics Generalized force
Mathematical & mechanical Method in Mechanical Engineering Generalized forces When there are holonomic constraints on the system we decompose the forces acting on the particles into what we shall call explicit forces and forces of constraint. By forces of constraint, , mean those imposed on the particles by the rigid rods, joints, sliding planes etc The explicit force on each particle, , is the vector sum of any externally imposed forces, such as those due to an external gravitational or electric field, plus any interaction forces between particles such as those due to elastic springs coupling point masses, or to electrostatic attractions between charged particles
Mathematical & mechanical Method in Mechanical Engineering Properties ofCross Product The force of constraint is N
Mathematical & mechanical Method in Mechanical Engineering Generalized Equation of Motion
Mathematical & mechanical Method in Mechanical Engineering Generalized Equation of Motion
Mathematical & mechanical Method in Mechanical Engineering Generalized Equation of Motion
Mathematical & mechanical Method in Mechanical Engineering Generalized Newton’s second law
Mathematical & mechanical Method in Mechanical Engineering Example 9.1 Let us check in Cartesian system a motion that we can recover Newton’s equations of motion as a special case when q = {x, y, z}
Mathematical & mechanical Method in Mechanical Engineering Example 9.2
Mathematical & mechanical Method in Mechanical Engineering Example 9.2 L=T-V
Mathematical & mechanical Method in Mechanical Engineering Lagrange’s Equations (Scalar Potential Case) In many problems in physics the forces Fk are derivable from a potential, V (r1, r2, · · · , rN). The classical N-body problem the particles are assumed to interact pairwise via a two-body interaction potential Vk,l(rk, rl) ≡ Uk,l(|rk - rl|) such that the force on particle k due to particle l is given by
Mathematical & mechanical Method in Mechanical Engineering Lagrange’s Equations
Mathematical & mechanical Method in Mechanical Engineering Example of fields L ≡ T - V
Mathematical & mechanical Method in Mechanical Engineering Hamilton’s Principle Physical paths in configuration space are those for which the action integral is stationary against all infinitesimal variations that keep the endpoints fixed
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