circular motion terms the point or line that is the center of the circle is the axis of rotation. ...
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Circular Motion TermsThe 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 VelocityObjects 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 VelocityObjects 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, (Greek letter omega)
Rotational/Angular Velocity
• Rotational velocity = Change in angletime
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 VelocityLinear 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
v
r
AccelerationAs 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 AccelerationThe 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 AccelerationThe centripetal acceleration depends
on: The speed of the object. The radius of the circle.
Acent = v2
r
Centripetal ForceNewton’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 ForceCentripetal 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 ForceThe 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= mr2
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.
Rotational Motion of an Object
Rotational Motion All Spinning Objects Axis of Rotation
The line about which everything rotates. Speed of Rotation
Period of rotation The time of a single complete rotation (T)
Frequency of rotation The number of cycles completed in a given time (f = hertz)
Period = 1/Frequency or Frequency = 1/Period T= 1/f f=1/T
Rotational Motion
Spinning
Angular speed
= s/r ( is measured in radians)For 360 degreed, s = 2r
3600 = 2 radians
Angular speed = 2f
t
Time
angle Rotational
Spinning Angular speed
= s/r ( is measured in radians)
For 360 degreed, s = 2r
3600 = 2 radians
Angular speed = 2f
Torque
Angular MomentumMoment of inertia
In general, the farther away a mass is from the axis the greater its moment of inertia is.
I = kmr2
Angular Momentum (Cont.) Momentum of inertia
times angular speed L = I
Conservation of Angular momentum
Direction of Rotation The right hand rule
Moment of Inertia Momentum of inertia
equals the resistance to motion
I = mr2
Moment of Inertia = mass times the distance from the axis squared
Angular acceleration
Center of GravityCenter of Mass
"All of science is nothing more than the refinement of everyday thinking."-- Albert Einstein
Center of Gravity
Point of an object located at the average position of weight.
Center of Gravity
Point of an object located at the average position of weight.
Center of GravityPoint of an object located at the average position of weight.
Center of Mass
The Average position of matter
Center of Mass
The Average position of matter
Center of Mass
The Average position of matter
Center of Mass
The Average position of matter
Toppling
Toppling occurs when the center of gravity extends beyond the support base.
StabilityUnstable – CG is lowered with
displacementStable – work must be done to raise the
CGNeutral – displacement neither raises or
lowers the CG
Coriolis “force” An apparent force
that seems to deflect a moving object from its path
Only observed in rotating references
Related to Centifrugal “force”
Coriolis “force” An apparent force
that seems to deflect a moving object from its path
Only observed in rotating references
Related to Centifrugal “force”
Coriolis “force” An apparent force
that seems to deflect a moving object from its path
Only observed in rotating references
Related to Centifrugal “force”
Objects rotate around their center of gravity.
Center of Gravity
Center of GravityThrow a ball through the air and it travels a
smooth parabolic path. Throw a bat through the air and it wobbles all over the place (class example: marker). However if you watch the path of the bat, the middle
of it follows the same path that the ball followed. The bat is a sum of two motions.
A spin around the center point A movement through the air as if all
the weight were concentrated at this point.
The Center of Gravity for an object is the point located at the object’s average position of weight.
For a symmetrical object this point would be located at the center
For an irregular shaped object, the center of gravity is toward the heavier end ( i.e. bat)
Center of Mass
Center of Gravity is often called Center of Mass, which is the average positions of all the particles of mass that make up an object.
The Center of mass or center of gravity can lie outside of the object (i.e. Donut, tire, banana, chair
Finding center of mass for a 1-D situation. We can use the equation:
Xcm = (m1x1 + m2x2 + …) / (m1 + m2 + …) 2-D is easy to follow the same trend, but
use Ycm as well.
Locating the Center of GravityUsing a plumb line and bob, you can
suspend the object from some other point and constructing a second vertical line. The Center of Gravity is where the two lines intersect.
Toppling The rule for Toppling:
If the center of gravity of an object is above the area of support, the object will remain upright. If the Center of Gravity extends outside the area of support, the object will topple.
Example: When a male tries to push a penny with his nose on the floor. The center of gravity extends beyond the supports and he will fall over.
The Leaning Tower of Pisa does not topple over, WHY??
Stability We say that an object balanced so that any
displacement lowers its center of gravity is in Unstable Equilibrium. An example would be a cone that was point down, if it
is moved, it’s center of gravity would lower and it would then topple.
We say an object that is balanced so that any displacement raises its center of gravity is in Stable Equilibrium. An example would be a cone that was point up. Any
movement would cause the center of gravity to rise up. So that would need to be overcome before toppling can happen.
Place the cone on its side and its center of gravity is neither raised nor lowered with displacement.
This is called Neutral Equilibrium.
A book that is standing is at stable Equilibrium and so is a book laying flat. Which one is more stable and why?
Why does a tightrope walker use a long poll that bends downward?
Center of Gravity of People What happens when we touch our toes?
Isn’t it true that we push our but back to touch our toes? Why?
When we stand our center of gravity is generally a few cm’s below our navel. Women are typically lower than men.
What happens when we stand against the wall and then try to lean forward and touch our toes?
The End