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Chapter 18- Planar Kinetics of a Rigid Body: Work and Energy. STATICS and DYNAMICS- 11 th Ed., R . C. Hibbeler and A. Gupta Course Instructor: Miss Saman Shahid. Objective:.
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Chapter 18- Planar Kinetics of a Rigid Body: Work and Energy STATICS and DYNAMICS- 11th Ed., R. C. Hibbeler and A. GuptaCourse Instructor: Miss SamanShahid
Objective: • We will apply work and energy methods to problems involving force, velocity, and displacement related to the planar motion of a rigid body.
Kinetic Energy • Calculating rigid body’s KE when it is subjected to • (i) translation, • (ii) rotation about a fixed axis, or • (iii) general plane motion. Consider the rigid body shown in inertial x-y plane. An arbitrary ith particle of the body, having mass dm, is located at r from the arbitrary point P. Here I(G) is the moment of inertia for the body about an axis which is perpendicular to the plane of motion and passes through the mass center.
1-Translation • When a rigid body of mass m is subjected to either rectilinear or translation, the KE due to rotation is zero, since ω =0 • where v(G) is the magnitude of the translational velocity v at the instant considered.
2-Rotation About a Fixed Axis • When a rigid body is rotating about a fixed axis passing through point O, the body has both translational and rotational KE. • The body’s KE may also be formulated by noting that v(G)=r(G)ω • by the Parallel-Axis theorem, the terms inside the parentheses represent the moment of inertia I(O) of the body about an axis perpendicular to the plane of motion and passing through point O.
3-General Plane Motion • When a rigid body is subjected to general plane motion, it has an angular velocity ω and its mass center has a velocity v(G). • Total KE of the body consists of the scalar sum of the body’s translational KE and rotational KE about its mass center. • The equation can also be expressed in terms of body’s motion about its instantaneous center of zero velocity, • Where I(IC) is the moment of inertial of the body about its instantaneous center.
The Work of a Force • By variable force • By constant force • By weight • By a spring force
1) Work of a Variable Force • If an external force F acts on a rigid body, the work done by the force when it moves along the path s. • Here θ is the angle between the tails of the force vector and the differential displacement.
2) Work of a Constant Force • If an external force F(c) acts on a rigid body, and maintains a constant magnitude and constant direction, while the body undergoes a translation s.
3) Work of a Weight • The weight of a body does work only when the body’s center of mass G undergoes a vertical displacement Δy. If this displacement is upward, the work is negative, since the weight and displacement are in opposite directions.
4) Work of a Spring Force • If linear elastic spring is attached to a body, the spring force F(s)=ks, acting on the body does work when the spring either stretches or compresses from s1 to a further position s2. • In both cases, the work will be negative since the displacement of the body is in the opposite direction to the force. • Where |s2|>|s1|
Force That Do Not Work • There are some external forces that do not work when the body is displaced. • There forces can act either at fixed points on the body, or they can have a direction perpendicular to their displacement. • Examples: • 1- Reactions at a Pin support about which a body rotates • 2- Normal reaction acting on a body that moves along a fixed surface. • 3- Weight of a body when the center of gravity of the body moves in a horizontal plane.
Explanation: • A frictional force F(f) acting on a round body as it rolls without slipping over a rough surface also does no work. • This is because, during any instant of time dt, F(f) acts at a point on the body which has zero velocity (instantaneous center IC) and so the work done by the force on the point is zero. • In other words, the point is not displaced in the direction of the force during this instant. Since F(f) contacts successive points for only an instant, the work of F(f) will be zero.
The Work of a Couple • When a body subjected to a couple undergoes general plane motion, the two couple forces do work only when the body undergoes a rotation. • Consider the body which is subjected to a couple moment M=Fr • When the body translates, such that the component of displacement along the line of action of the forces is ds(t). • The positive work of one force cancels the negative work of the other.
Contd. • If the body undergoes a differential rotation dθ about an axis which is perpendicular to the plane of the couple and intersects the plane at point O, • Then, each force undergoes a displacement ds(θ)=(r/2) dθin the direction of the force.