Test 2 Material
Axis of Rotation
- A fixed line about which a body rotates - Will always be perpendicular to its plane
Rigid Body
A body that maintains a constant shape Example: A baseball bat
Displacement
A change in position
Position
A distance from the origin
Center of Mass (COM)
A fictitious point where all mass is considered to be connected
Linear velocity (v)
A point on a rotating body is determined by: - Angular velocity of the rigid body - Distance from the axis of rotation on the body v = lr x ω ω must be converted from deg/sec to rad/sec
Inertia
A resistance to change in motion, specifically a resistance to change in a body's velocity - Applies to: Bodies at rest Bodies moving linearly bodies rotating
Plane
A smooth, flat space defined by two axes
Parabola
A type of plane curve
Resultant
A vector that is equivalent to the combined effect of two or more vectors
Gravity
Acceleration of a body due to the force of gravity; attraction between two objects, for projectile motion, the Earth and a person/object
Cosine (cos)
Adjacent/Hypotenuse
Velocity
Amount of displacement in a given time
Momentum (L)
An object's linear inertia (L) must include: - Mass (m) - Linear velocity (v) A resistance to change in velocity of a moving body "Quantity of motion" L = m(v)
Projectile
Any airborne body that is only subjected to gravity and wind resistance after it has left the ground
Planar
Any motion in plane
Zero
At the apex, the instantaneous Yv is ?
- Gravity alters the path of the projectile in the vertical (y) direction - The magnitude of the alteration is not constant - As time increases, there will be a greater change in the trajectory - The relationship is not a linear one
Based on gravity we can extract what three key points
Centripetal
Change in direction of the linear velocity Centripetal a = v^2/l^2 = lr(ω^2)
Tangential
Change in magnitude of the linear velocity tan a = lra
Acceleration
Change in velocity in a given time
vf2 = vi2 + 2a∆p
Equation for horizontal or vertical displacement
- Solve for the x and y components - Solve for time from a to b, b to c, and a to c - Solve for horizontal displacement - Solve for vertical displacement
For a Projectile Leaving and Landing at the Same Height
Weight (W)
Force due to gravity - Acts only in the downward, vertical direction - Magnitude of 9.81 m/s^2 times the body's mass Quantity: Vector
- The maximum value along an axis occurs when the vector is parallel to that axis: the angle is 0, and the correction factor is 1 - A larger angle will result in a smaller magnitude of the component parallel to that axis and a larger magnitude of the component perpendicular to that axis - The magnitude of the components will be equal at 45 - The magnitude of the resultant is always larger than the two components
General Rules for Correction Factors
Angular Momentum (H)
H = I x (ω)
Angular Speed
How fast a body is rotating Quantity: Scalar
Angular Velocity (ω)
How fast a body is rotating in a particular direction The rate at which angular position changes ω = ∆Ɵ/ ∆t = Ɵ' - Ɵ/ t' - t Quantity: Vector Typical unit: °/s or rad/s
Angular acceleration (α)
How quickly a body is speeding up or slowing down its rotation in a particular direction Time rate of change of angular velocity α = ∆ω/∆t = ω'-ω/ t'-t Quantity: Vector Typical unit: °/s2 or rad/s2
Dynamic
Moving - Mass X Velocity = Inertia (Momentum)
Static
Not moving - Mass = inertia
Constant Acting downward (negative) = -9.81 m/s^2 = -32 ft/s^2
On Earth gravity is ?
57.3 degrees (180/pi)
One radian = ?
Tangent (tan)
Opposite/Adjacent
Sine (sin)
Opposite/Hypotenuse
Three-dimensional
Our world is ?
Component
Parts of a resultant vector; two or more vectors that are acting in different directions
Radius of gyration
Represents the object's mass distribution with respect to a given axis of rotation K is the distance known as ?
Angular
Rotational - Moment of inertia x angular velocity (angular momentum)
Clockwise
Rotations are negative
Counterclockwise
Rotations are positive
Mass (m)
The amount of matter in an object - the amount of "stuff" in an object - Direct relationship with resistance to change in motion - Quantity: Scalar
Moment of Inertia (I)
The angular equivalent of mass Gives an indication of how difficult it will be to rotate an object Explains how the mass is distributed relative to the axis of rotation I = mp2 I = mk2
Angular Displacement (∆Ɵ)
The change in orientation of a rigid body in reference to some axis - Change in angular position between two time periods of interest ∆Ɵ = Ɵ' - Ɵ
Apex
The highest point of a trajectory
Range
The horizontal displacement of a projectile
Angular Position (Ɵ)
The orientation of a rigid body in reference to some axis. It can be measured in degrees (°), radians (rads)
Trajectory
The path of a projectile
Correction factor
The sine or cosine acts as that ______________
Not Constant
The velocity due to gravity is ?
Perpendicular
The velocity vector will always be __________________ to the rigid body
Height
The vertical displacement of a projectile
Tangential Centripetal
Two kinds of linear velocity
- Initial position - Initial velocity - Net acceleration - Change in time
What are the determinants of the final position?
Correct for it
When a vector is not parallel to an axis you must ______________ ____________ ____
