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Principle of Virtual Work
Degrees of Freedom Associated with the concept of the lumped-mass approximation is the idea of the NUMBER OF DEGREES OF FREEDOM. This can be defined as “the number of independent co-ordinates required to specify the configuration of the system”. The word “independent” here implies that there is no fixed relationship between the coordinates, arising from geometric constraints.
Degrees of Freedom of Special Systems
A particle in free motion in space has 3 degrees of freedom
particle in free motion in space has 3 degrees of freedom
If we introduce one constraint – e.g. r is fixed then the number of degrees of freedom reduces to 2. note generally: no. of degrees of freedom = no. of co-ordinates –no. of equations of constraint
Rigid Body
This has 6 degrees of freedom 3 translation 3 rotation
e.g. for partials P1, P2 and P3 we have 3 x 3 = 9 co-ordinates but the distances between these particles are fixed – for a rigid body – thus there are 3 equations of constraint.
The no. of degrees of freedom = no. of co-ordinates (9) - no. of equations of constraint (3) = 6.
Formulation of the Equations of Motion
Two basic approaches:
- application of Newton’s laws of motion to free-body diagrams Disadvantages of Newton’s law approach are that we need to deal with vector quantities – force and displacement. thus we need to resolve in two or three dimensions – choice of method of resolution needs to be made. Also need to introduce all internal forces on free-body diagrams – these usually disappear when the final equation of motion is found.
- use of work with work based approach we deal with scalar quantities – e.g. work – we can develop a routine method – no need to take arbitrary decisions.
Principle of Virtual Work
The work done by all the forces acting on a system, during a small virtual displacement is ZERO.
Definition A virtual displacement is a small displacement of the system which is compatible with the geometric constraints.
e.g. This is a one-degree of freedom system, only possible movement is a rotation.
work done by P1 = P1(- aδθ)
work done by P2 = P2(bδθ)
Total work done = P1(- aδθ) + P2(bδθ) = δW
By principle of Virtual Work
δW = 0
therefore:
P1 (- aδθ) + P2(bδθ) = 0
- a P1 + bP2 = 0
P1a = P2b
D’Alembert’s Principle
Consider a rigid mass, M, with force FA applied
From Newton’s 2nd law of motion
FA= Ma = 
or
FA== 0
Now, the term ( − ) can be regarded as a force – we call it an inertial force, and denote it FI – thus
we can then write:
In words – the sum of all forces acting on a body (including the inertial force) is zero – this is a statics principle. In fact all statics principles apply if we include inertial forces, including the Principle of Virtual Work.
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FAQs on Principle of Virtual Work for a Particle & a Rigid Body - Engineering Mechanics - Civil Engineering (CE)
| 1. What is the principle of virtual work for a particle? |  |
Ans. The principle of virtual work for a particle states that if a particle is in equilibrium under the action of a system of forces, the virtual work done by these forces is zero for any virtual displacement of the particle.
| 2. How is the principle of virtual work applied to a particle? | |
Ans. To apply the principle of virtual work to a particle, we consider an arbitrary virtual displacement of the particle and calculate the virtual work done by each force acting on the particle. If the sum of these virtual works is zero, then the particle is in equilibrium.
| 3. What is the principle of virtual work for a rigid body? | |
Ans. The principle of virtual work for a rigid body states that if a rigid body is in equilibrium under the action of a system of forces, the virtual work done by these forces is zero for any virtual displacement of the body.
| 4. How is the principle of virtual work applied to a rigid body? | |
Ans. To apply the principle of virtual work to a rigid body, we consider an arbitrary virtual displacement of the body and calculate the virtual work done by each force acting on different points of the body. If the sum of these virtual works is zero, then the rigid body is in equilibrium.
| 5. What is the significance of the principle of virtual work in mechanics? | |
Ans. The principle of virtual work is significant in mechanics as it provides a useful tool for analyzing the equilibrium of particles and rigid bodies. By applying this principle, we can determine whether a system is in equilibrium or not, and also calculate unknown forces or displacements in the system. It is widely used in structural analysis, mechanical engineering, and civil engineering.
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