Angular Motion of the System
Differences between linear and angular kinematics
1. Eccentric force is applied, and therefore torque is present. 2. There is a specified axis of rotation. 3. A segment rotating around an axis may have the ability to travel completely in a circle. Therefore, the number of revolutions may be specified.
Angular acceleration
A change in magnitude and/or direction of the angular velocity vector with respect to time
Momentum
A system's quantity of motion **In angular momentum situations, possessing large amounts of momentum means that large torque must be applied to stop rotation.
Centripetal acceleration
Acceleration caused by change in direction of the velocity vector
What force would cause linear acceleration of an object?
Applying a centric force causes linear acceleration of an object.
Instantaneous angular acceleration
Change in angular velocity at one specific instant in time.
Average angular acceleration
Change in angular velocity divided by the entire interval over which it changed.
What results from changes in the radius of rotation or changes in angular velocity?
Changes in angular momentum are normally the result of changes in the radius of rotation (which changes the moment of inertia) or changes in angular velocity Changes in angular momentum are directly related to Newton's first two laws of motion.
Angular position
Distance (radius) from the origin, and the angle between the chosen reference axis and the line formed by connecting the given point to the origin.
What force causes angular acceleration of an object?
Eccentric forces cause angular acceleration of an object
Newtons 3rd law
For every torque, there is a torque of equal magnitude directed in the opposite direction
Newton's 1st law
If an object is at rest it will not undergo angular displacement without the application of an external eccentric force (torque). Without angular displacement, angular velocity is equal to zero. If the object is already rotating with a given velocity, there will be no change in that angular velocity without an externally applied eccentric force. If there is not change in angular velocity, then there is no angular acceleration of the system.
What is the most efficient way to move the human body?
In most situations, the most efficient way to move the human body is to maximize acceleration while minimizing torque requirements
Tangential linear acceleration
Linear acceleration of a point of a rotating segment.
What type of force is required for angular motion to occur?
The applied force must be eccentric
Torque
Torque is applied to the implement by the person The implement exerts a torque of equal magnitude to the person The person and implement share a common axis of rotation Both objects are affected by a common torque
Principle moment of inertia
When referring to the moment of inertia with respect to one of the principle axes of rotation
Angular displacement
change in angular position of a segment or any point on the rotating segment Measured in degrees or radians
Displacement
change in position
Velocity
change in position relative to the interval in which it takes place
Acceleration
change in velocity relative to the interval in which the change takes place observed change in motion
Kinetic energy
energy associated with motion.
Absolute angular position
if the reference axis cannot move
Relative angular position
if the reference axis is capable of moving
Angular impulse
interval of torque application
Tangential linear velocity
linear velocity of a point on a rotating segment *The linear velocity vector of the point on the segment is tangent to the path of the object and perpendicular to the radius of the circular path.
Peak rate of motion
max rate of motion achieved
Work
product of applied force and the magnitude of displacement in the direction of applied force.
Instantaneous speed and instantaneous velocity
rate of motion at one given instant in time
Rotational kinetic energy
rotational inertia and its angular velocity.
Angular speed
scalar rate of angular motion
Rotational power
the amount of angular mechanical work performed during a given interval.
Power
the amount of mechanical work performed in a given interval
Rotational work
the angular displacement of an object about an axis caused by the application of a torque
Rotational inertia
the resistance of an object to having its state of angular motion changed. Mass and mass distribution are factors.
Angular velocity
the vector rate of angular motion
