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Engineering Mechanics: Statics
Chapter 7: Virtual Work
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Introduction Previous chapters-- FBD & zero-force and zero-moment equations -- Suitable when equilibrium position is known For bodies composed of interconnected members, various equilibrium position is possible. Using equilibrium equations is valid and adequate but the method based on concept of work done by a force is more direct.
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Work A rigid body is sometimes constrained not to travel in the direction of the force. The block is moved a distance Ds due to the externally applied force F, which inclines at an angle a to the horizontal The work done from (a) and (b) are the same, Thus,
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Work Work done along continuous path, Work of a couple, and
Dimensions: joules, J (=N.m) and lb.ft
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Equilibrium - particle
For a particle in static equilibrium position, any assumed and arbitrary small displacement away from this position and consistent with the system constraints is called a virtual displacement. Work done by any force F acting on the particle during the virtual displacement is called “virtual work”. or When there are several forces, For equilibrium, SF = 0. Therefore,
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Equilibrium – rigid body
A rigid body consists of infinite numbers of particles. Virtual work done on each particle in equilibrium is zero. Only virtual work done by external forces appears in evaluation of Since internal forces occur in pairs (which are equal, opposite and collinear), the net work done by these forces is also zero. Example: write the equation of virtual work for this problem.
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Equilibrium – systems of rigid bodies
Three types of forces used in the analysis of virtual work Active forces = external forces capable of doing virtual work Reactive forces = reactions on supports (no displacement – no work done) Internal forces = compression or tension forces that the members carry (Always appear in pairs – net work done is zero) - In virtual work method, active force diagram is used instead of free body diagram!
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Principle of Virtual Work
Principle of virtual work states that: The virtual work done by external active forces on an ideal mechanical system in equilibrium is zero for any and all virtual displacements consistent with the constraints Number of Degrees of Freedom = number of independent coordinates needed to specify completely the configuration of the system.
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Procedure for Analysis
1. Draw the active-force diagram and define the coordinate q (the dof) 2. Sketch the deflected position of the system when the system undergoes a positive virtual displacement dq 3. Indicate position coordinate, s measured from a fixed point directed to the forces that do work and parallel to the force. 4. Relate each position coordinate s to the coordinate q and differentiate these expressions to find ds in terms of dq 5. Write virtual-work equation assuming that (possible or not) all ds are positive. If a force is in the same direction as +ds, the work is positive. Otherwise, it is negative. 6. Express the work equation in terms of dq 7. Factor out the common terms and solve the equation.
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Sample Problem 7/1 Each of the two uniform hinged bars has a mass m and a length l, and is supported and loaded as shown. For a given force P determine the angle q for equilibrium.
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Problem 10.2 (Beer book) Determine the expressions for q and for the tension in the spring which correspond to the equilibrium postion of the mechanism. The unstretched length of the spring is h, and the con
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Problem 7/19 Determine the couple M which must be applied at O in order to support the mechanism in the position q = 30 . The masses of the disk at C, bar OA, and bar BC are mo, m, and 2m, respectively.
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Potential Energy Previous article – members are assumed perfectly rigid. The concept of potential energy is useful for elastic elements (ex. spring) Elastic potential energy Ve= work done stored in the member For a spring of linear stiffness k, the force F required to compress the spring by a distance x, is F = kx Work done by F during a movement dx is dU = Fdx Thus, For torsional spring where K is torsional stiffness
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Potential Energy Gravitational potential energy Vg
Vg is work done on the body by a force (equal and opposite to the weight) to bring the body to the position under consideration from some arbitrary datum positive if the position is higher than the datum negative if the position is lower than the datum
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Potential Energy Energy equation in equilibrium condition is Therefore, important: for this method, spring is internal to the system and weight forces are not shown! work from external active forces The sum of the work done by spring and gravitational forces is equal to the work done by all other active forces.
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Stability of Equilibrium
When there is no work done by external force , the requirement for equilibrium is For a system of 1-dof where the potential energy is continuous function of the single variable (say, x), the equation becomes For systems with several dof’s, the partial derivative of V with respect to each coordinate must be zero for equilibrium
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Stability of Equilibrium
Three possible conditions for Therefore, for a single degree of freedom x, the conditions for equilibrium and stability are: V = minimum – Stable equilibrium V = maximum – Unstable equilibrium V = constant – neutral equilibrium
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Sample Problem 7/4 The 10-kg cylinder is suspended by the spring, which has a stiffness of 2 kN/m. Plot the potential energy V of the system and show that it is minimum at the equilibrium position.
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Sample Problem 7/5 The two uniform links, each of mass m, are in the vertical plane and are connected an constrained as shown. As the angle q between the links increases with the application of the horizontal force P, the light rod, which is connected at A and passes through a pivoted collar at B, compresses the spring of stiffness k. If the spring is uncompressed in the position where q = 0, determine the force P which will produce equilibrium at the angle q.
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Problem 7/37 The bar of mass m with centre of mass at G is hinged about a horizontal axis through O. Prove the stability conditions for the two positions of equilibrium.
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Problem 7/36 The uniform bar of mass m and length L is supported in the vertical plane by two identical springs each of stiffness k and compressed a distance d in the vertical position q = 0. Determine the minimum stiffness k which will ensure a stable equilibrium position with q = 0. The springs may be assumed to act in the horizontal direction during small angular motion of the bar.
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Sample Problem 7/6 The ends of the uniform bar of mass m slide freely in the horizontal and vertical guides. Examine the stability conditions for the positions of equilibrium. The spring of stiffness k is undeformed when x = 0.
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