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11.6 Potential-Energy Criterion for Equilibrium. System having One Degree of Freedom When the displacement of a frictionless connected system is infinitesimal, from q to q + dq dU = V (q) – V (q + dq) Or dU = -dV
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11.6 Potential-Energy Criterion for Equilibrium System having One Degree of Freedom • When the displacement of a frictionless connected system is infinitesimal, from q to q + dq dU = V (q) – V (q + dq) Or dU = -dV • If the system undergoes a virtual displacement δq, rather than an actual displacement dq, δU = -δV • For equilibrium, principle of work requires δU = 0, provided that the potential function for the system is known, δV = 0
11.6 Potential-Energy Criterion for Equilibrium System having One Degree of Freedom dV/dq = 0 • When a frictionless connected system of rigid bodies is in equilibrium, the first variation or change in V is zero • Change is determined by taking first derivative of the potential function and setting it to zero Example • To determine equilibrium position of spring and block
11.6 Potential-Energy Criterion for Equilibrium System having One Degree of Freedom dV/dy = -W + ky = 0 • Hence equilibrium posyion y = yeq yeq = W/k • Same results obtained by applying ∑Fy = 0 to the forces acting on the FBD of the block
11.6 Potential-Energy Criterion for Equilibrium System having n Degree of Freedom • When the system of n connected bodies has n degrees of freedom, total potential energy stored in the system is a function of n independent coordinates qn, V = V (q1, q2, … , qn) • In order to apply the equilibrium criterion, δV = 0, determine change in potential energy δV by using chain rule of differential calculus δV = (∂V/∂q1)δq1 + (∂V/∂q2)δq2 + … + (∂V/∂qn)δqn • Virtual displacements δq1, δq2, … , δqn are independent of one another
11.6 Potential-Energy Criterion for Equilibrium System having n Degree of Freedom • Equation is satisfied ∂V/∂q1 = 0, ∂V/∂q2 = 0, ∂V/∂qn = 0 • It is possible to write n independent equations for a system having n degrees of freedom
11.7 Stability of Equilibrium • Once the equilibrium configuration for a body or system of connected bodies are defined, it is sometimes important to investigate the type of equilibrium or the stability of the configuration Example • Consider a ball resting on each of the three paths • Each situation represent an equilibrium state for the ball
11.7 Stability of Equilibrium • When the ball is at A, it is at stable equilibrium • Given a small displacement up the hill, it will always return to its original, lowest, position • At A, total potential energy is a minimum • When the ball is at B, it is in neutral equilibrium • A small displacement to either the left or right of B will not alter this condition • The balls remains in equilibrium in the displaced position and therefore, potential energy is constant
11.7 Stability of Equilibrium • When the ball is at C, it is in unstable equilibrium • A small displacement will cause the ball’s potential energy to be decreased, and so it will roll farther away from its original, highest position • At C, potential energy of the ball is maximum
11.7 Stability of Equilibrium Types of Equilibrium • Stable equilibrium occurs when a small displacement of the system causes the system to return to its original position. Original potential energy is a minimum • Neutral equilibrium occurs when a small displacement of the system causes the system to remain in its displaced state. Potential energy remains constant • Unstable equilibrium occurs when a small displacement of the system causes the system to move farther from its original position. Original potential energy is a maximum
11.7 Stability of Equilibrium System having One Degree of Freedom • For equilibrium, dV/dq = 0 • For potential function V = V(q), first derivative (equilibrium position) is represented as the slope dV/dq which is zero when the function is maximum, minimum, or an inflexion point • Determine second derivative and evaluate at q = qeq for stability of the system
11.7 Stability of Equilibrium System having One Degree of Freedom • If V = V(q) is a minimum, dV/dq = 0 d2V/dq2 > 0 stable equilibrium • If V = V(q) is a maximum dV/dq = 0 d2V/dq2 < 0 unstable equilibrium
11.7 Stability of Equilibrium System having One Degree of Freedom • If d2V/dq2 = 0, necessary to investigate higher-order derivatives to determine stability • Stable equilibrium occur if the order of the lowest remaining non-zero derivative is even and the is positive when evaluated at q = qeq • Otherwise, it is unstable • For system in neutral equilibrium, dV/dq = d2V/dq2 = d3V/dq3 = 0
11.7 Stability of Equilibrium System having Two Degree of Freedom • A criterion for investigating the stability becomes increasingly complex as the number for degrees of freedom for the system increases • For a system having 2 degrees of freedom, equilibrium and stability occur at a point (q1eq, q2eq) when δV/δq1 = δV/δq2 = 0 [(δ2V/δq1δq2)2 – (δ2V/δq12)(δ2V/δq22)] < 0 δ2V/δq12 > 0 or δ2V/δq22 >0
11.7 Stability of Equilibrium System having Two Degree of Freedom • Both equilibrium and stability occur when δV/δq1 = δV/δq2 = 0 [(δ2V/δq1δq2)2 – (δ2V/δq12)(δ2V/δq22)] < 0 δ2V/δq12 > 0 or δ2V/δq22 >0
11.7 Stability of Equilibrium Procedure for Analysis Potential Function • Sketch the system so that it is located at some arbitrary position specified by the independent coordinate q • Establish a horizontal datum through a fixed point and express the gravitational potential energy Vg in terms of the weight W of each member and its vertical distance y from the datum, Vg = Wy • Express the elastic energy Ve of the system in terms of the sketch or compression, s, of any connecting spring and the spring’s stiffness, Ve = ½ ks2
11.7 Stability of Equilibrium Procedure for Analysis Potential Function • Formulate the potential function V = Vg + Ve and express the position coordinates y and s in terms of the independent coordinate q Equilibrium Position • The equilibrium position is determined by taking first derivative of V and setting it to zero, δV = 0
11.7 Stability of Equilibrium Procedure for Analysis Stability • Stability at the equilibrium position is determined by evaluating the second or higher-order derivatives of V • If the second derivative is greater than zero, the body is stable • If the second derivative is less than zero, the body is unstable • If the second derivative is equal to zero, the body is neutral
11.7 Stability of Equilibrium Example 11.5 The uniform link has a mass of 10kg. The spring is un-stretched when θ = 0°. Determine the angle θ for equilibrium and investigate the stability at the equilibrium position.
11.7 Stability of Equilibrium Solution Potential Function • Datum established at the top of the link when the spring is un-stretched • When the link is located at arbitrary position θ, the spring increases its potential energy by stretching and the weight decreases its potential energy
11.7 Stability of Equilibrium Solution
11.7 Stability of Equilibrium Solution Equilibrium Position • For first derivative of V, or • Equation is satisfied provided
11.7 Stability of Equilibrium Solution Stability • For second derivative of V, • Substituting values for constants
11.7 Stability of Equilibrium Example 11.6 Determine the mass m of the block required for equilibrium of the uniform 10kg rod when θ = 20°. Investigate the stability at the equilibrium position.
11.7 Stability of Equilibrium Solution • Datum established through point A • When θ = 0°, assume block to be suspended (yw)1 below the datum • Hence in position θ, V = Ve + Vg = 9.81(1.5sinθ/2) – m(9.81)(Δy)
11.7 Stability of Equilibrium Solution • Distance Δy = (yw)2 - (yw)1 may be related to the independent coordinate θ by measuring the difference in cord lengths B’C and BC
11.7 Stability of Equilibrium Solution Equilibrium Position • For first derivative of V, • For mass,
11.7 Stability of Equilibrium Solution Stability • For second derivative of V, • For equilibrium position,
11.7 Stability of Equilibrium Example 11.7 The homogenous block having a mass m rest on the top surface of the cylinder. Show that this is a condition of unstable equilibrium if h > 2R.
11.7 Stability of Equilibrium View Free Body Diagram Solution • Datum established at the base of the cylinder • If the block is displaced by an amount θ from the equilibrium position, for potential function, V = Ve + Vg = 0 + mgy y = (R + h/2)cosθ + Rθsinθ • Thus, V = mg[(R + h/2)cosθ + Rθsinθ]
11.7 Stability of Equilibrium Solution Equilibrium Position dV/dθ = mg[-(R + h/2)sinθ + Rsinθ +Rθcosθ]=0 =mg[-(h/2)sinθ + Rθsinθ] = 0 • Obviously, θ = 0° is the equilibrium position that satisfies this equation
11.7 Stability of Equilibrium Solution Stability • For second derivative of V, d2V/dθ2 = mg[-(h/2)cosθ + Rcosθ - Rθsinθ] • At θ = 0°, d2V/dθ2 = - mg[(h/2) – R] • Since all the constants are positive, the block is in unstable equilibrium • If h > 2R, then d2V/dθ2 < 0
Chapter Summary Principle of Virtual Work • The forces on a body will do virtual work when the body undergoes an imaginary differential displacement or rotation • For equilibrium, the sum of virtual work done by all the forces acting on the body must be equal to zero for any virtual displacement • This is referred to as the principle of virtual work, and it is used to find the equilibrium configuration for a mechanism or a reactive force acting on a series of connected members
Chapter Summary Principle of Virtual Work • If this system has one degree of freedom, its position can be specified by one independent coordinate q • To apply principle of virtual work, use position coordinates to locate all the forces and mechanism that will do work when the mechanism undergoes a virtual movement δq • The coordinates are related to the independent coordinate q and these expressions differentiated to relate the virtual coordinate displacements to δq
Chapter Summary Principle of Virtual Work • Equation of virtual work is written for the mechanism in terms of the common displacement δq, then it is set to zero • By factoring δq out of the equation, it is possible to determine either the unknown force or couple moment, or the equilibrium position q
Chapter Summary Potential Energy Criterion for Equilibrium • When a system is subjected only to conservative forces, such as the weight or spring forces, then the equilibrium configuration can be determined using the potential energy function V for the system • This function is established by expressing the weight and spring potential energy for the system in terms of the independent coordinate q • Once it is formulated, first derivative, dV/dq = 0
Chapter Summary Potential Energy Criterion for Equilibrium • The solution yields equilibrium position qeq for the system • Stability of the system can be investigated by taking the second derivative of V • If this is evaluated at qeq and d2V/dq2 > 0, stable equilibrium occurs • If this is evaluated at qeq and d2V/dq2 < 0, unstable equilibrium occurs • If all higher derivatives equals zero, the system is in neutral equilibrium
