General plane motion is neither a translation nor a rotation.rotation of about A2 to B2 General Plane Motion.Magnitude and direction of the total acceleration, Sample Problem 5.1 ĭisplacement of particles A and B to A2and B2 can be divided into two parts:
Apply the relations for uniformly accelerated rotation to determine velocity and angular position of pulley after 2 s.The tangential velocity and acceleration of D are equal to the velocity and acceleration of C.Evaluate the initial tangential and normal acceleration components of D.Determine (a) the number of revolutions of the pulley in 2 s, (b) the velocity and change in position of the load B after 2 s, and (c) the acceleration of the point D on the rim of the inner pulley at t = 0. Cable C has a constant acceleration of 9 in/s2 and an initial velocity of 12 in/s, both directed to the right. Apply the relations for uniformly accelerated rotation to determine the velocity and angular position of the pulley after 2 s.Calculate the initial angular velocity and acceleration. Due to the action of the cable, the tangential velocity and acceleration of D are equal to the velocity and acceleration of C.Motion of a rigid body rotating around a fixed axis is often specified by the type of angular acceleration.Uniformly Accelerated Rotation, a = constant: Equations Defining the Rotation of a Rigid Body About a Fixed Axis.Consider the motion of a representative slab in a plane perpendicular to the axis of rotation.Resolving the acceleration into tangential and normal components, Rotation About a Fixed Axis.Acceleration of any point P of the slab,.Acceleration of P is combination of two vectors, Rotation About a Fixed Axis.Consider rotation of rigid body about a fixed axis AA’ĭifferentiating to determine the acceleration,.The same result is obtained from Rotation About a Fixed Axis.
Velocity vector of the particle P is tangent to the path with magnitude
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