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Circular motion notes

This document defines key terms related to circular motion, including: - Axis of rotation, which is the center point or line of a rotating object. An object spins if the axis is inside and revolves if outside. - Tangential/linear velocity, which is the distance traveled per time. Rotational/angular velocity is the rate of angular position change. - Centripetal acceleration points toward the center and depends on speed and radius. Centripetal force provides the necessary inward force for circular motion and depends on mass, speed, and radius. - Centripetal force does no work since it is always perpendicular to velocity. "Centrifugal force" is not a real force but rather an object's

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Concept Summary Batesville High School Physics
Circular Motion Terms  The point or line that is the center of the circle is the axis of rotation.  If the axis of rotation is inside the object, the object is rotating (spinning).  If the axis of rotation is outside the object, the object is revolving.
Linear/Tangential Velocity  Objects moving in a circle still have a linear velocity = distance/time.  This is often called tangential velocity, since the direction of the linear velocity is tangent to the circle. v
Rotational/Angular Velocity  Objects moving in a circle also have a rotational or angular velocity, which is the rate angular position changes.  Rotational velocity is measured in degrees/second, rotations/minute (rpm), etc.  Common symbol, ω (Greek letter omega)
Rotational/Angular Velocity • Rotational velocity = Change in angle time
Rotational & Linear Velocity  If an object is rotating:  All points on the object have the same rotational (angular) velocity.  All points on the object do not have the same linear (tangential) velocity.
Rotational & Linear Velocity  Linear velocity of a point depends on:  The rotational velocity of the point.  More rotational velocity means more linear velocity.  The distance from the point to the axis of rotation.  More distance from the axis means more linear velocity.
Rotational & Linear Velocity  In symbols: v = r ω v r ω
Acceleration  As an object moves around a circle, its direction of motion is constantly changing.  Therefore its velocity is changing.  Therefore an object moving in a circle is constantly accelerating.
Centripetal Acceleration  The acceleration of an object moving in a circle points toward the center of the circle.  This is called a centripetal (center pointing) acceleration. a
Centripetal Acceleration  The centripetal acceleration depends on:  The speed of the object.  The radius of the circle. Acent = v2 r
Centripetal Force  Newton’s Second Law says that if an object is accelerating, there must be a net force on it.  For an object moving in a circle, this is called the centripetal force.  The centripetal force points toward the center of the circle.
Centripetal Force  In order to make an object revolve about an axis, the net force on the object must pull it toward the center of the circle.  This force is called a centripetal (center seeking) force. Fnet
Centripetal Force  Centripetal force on an object depends on:  The object’s mass - more mass means more force.  The object’s speed - more speed means more force.  And…
Centripetal Force  The centripetal force on an object also depends on:  The object’s distance from the axis (radius).  If linear velocity is held constant, more distance requires less force.  If rotational velocity is held constant, more distance requires more force.
Centripetal Force  In symbols: Fcent= mv2 r = mrω2
Work Done by the Centripetal Force  Since the centripetal force on an object is always perpendicular to the object’s velocity, the centripetal force never does work on the object - no energy is transformed. v Fcent
“Centrifugal Force”  “Centrifugal force” is a fictitious force - it is not an interaction between 2 objects, and therefore not a real force. Nothing pulls an object away from the center of the circle.
“Centrifugal Force”  What is erroneously attributed to “centrifugal force” is actually the action of the object’s inertia - whatever velocity it has (speed + direction) it wants to keep.
The End

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Circular motion notes

  • 1.
  • 2.
    Circular Motion Terms The point or line that is the center of the circle is the axis of rotation.  If the axis of rotation is inside the object, the object is rotating (spinning).  If the axis of rotation is outside the object, the object is revolving.
  • 3.
    Linear/Tangential Velocity  Objectsmoving in a circle still have a linear velocity = distance/time.  This is often called tangential velocity, since the direction of the linear velocity is tangent to the circle. v
  • 4.
    Rotational/Angular Velocity  Objectsmoving in a circle also have a rotational or angular velocity, which is the rate angular position changes.  Rotational velocity is measured in degrees/second, rotations/minute (rpm), etc.  Common symbol, ω (Greek letter omega)
  • 5.
    Rotational/Angular Velocity • Rotationalvelocity = Change in angle time
  • 6.
    Rotational & LinearVelocity  If an object is rotating:  All points on the object have the same rotational (angular) velocity.  All points on the object do not have the same linear (tangential) velocity.
  • 7.
    Rotational & LinearVelocity  Linear velocity of a point depends on:  The rotational velocity of the point.  More rotational velocity means more linear velocity.  The distance from the point to the axis of rotation.  More distance from the axis means more linear velocity.
  • 8.
    Rotational & LinearVelocity  In symbols: v = r ω v r ω
  • 9.
    Acceleration  As anobject moves around a circle, its direction of motion is constantly changing.  Therefore its velocity is changing.  Therefore an object moving in a circle is constantly accelerating.
  • 10.
    Centripetal Acceleration  Theacceleration of an object moving in a circle points toward the center of the circle.  This is called a centripetal (center pointing) acceleration. a
  • 11.
    Centripetal Acceleration  Thecentripetal acceleration depends on:  The speed of the object.  The radius of the circle. Acent = v2 r
  • 12.
    Centripetal Force  Newton’sSecond Law says that if an object is accelerating, there must be a net force on it.  For an object moving in a circle, this is called the centripetal force.  The centripetal force points toward the center of the circle.
  • 13.
    Centripetal Force  Inorder to make an object revolve about an axis, the net force on the object must pull it toward the center of the circle.  This force is called a centripetal (center seeking) force. Fnet
  • 14.
    Centripetal Force  Centripetalforce on an object depends on:  The object’s mass - more mass means more force.  The object’s speed - more speed means more force.  And…
  • 15.
    Centripetal Force  Thecentripetal force on an object also depends on:  The object’s distance from the axis (radius).  If linear velocity is held constant, more distance requires less force.  If rotational velocity is held constant, more distance requires more force.
  • 16.
    Centripetal Force  Insymbols: Fcent= mv2 r = mrω2
  • 17.
    Work Done bythe Centripetal Force  Since the centripetal force on an object is always perpendicular to the object’s velocity, the centripetal force never does work on the object - no energy is transformed. v Fcent
  • 18.
    “Centrifugal Force”  “Centrifugalforce” is a fictitious force - it is not an interaction between 2 objects, and therefore not a real force. Nothing pulls an object away from the center of the circle.
  • 19.
    “Centrifugal Force”  Whatis erroneously attributed to “centrifugal force” is actually the action of the object’s inertia - whatever velocity it has (speed + direction) it wants to keep.
  • 20.