Lecture powerpoint
... right-handed screws. (And refers to the top of the screw as viewed by the mechanic.) Better is “clockwise-tighty, counterclockwise-loosey.” Question: are there left-handed screws? If so, where? Thanks to Amy Whicker for finding the cool website that has lots of these animations. ...
... right-handed screws. (And refers to the top of the screw as viewed by the mechanic.) Better is “clockwise-tighty, counterclockwise-loosey.” Question: are there left-handed screws? If so, where? Thanks to Amy Whicker for finding the cool website that has lots of these animations. ...
AP Physics ID
... system exert on each other • External – forces that objects outside the system exert on each other ...
... system exert on each other • External – forces that objects outside the system exert on each other ...
Angular Momentum - USU Department of Physics
... • When a star reaches the end of its active life gravity causes it to collapse on itself (as insufficient radiant pressure from nuclear fusion to hold up outer layers of gas). • This causes the moment of inertia of the star to decrease drastically and results in a tremendous increase in its angular ...
... • When a star reaches the end of its active life gravity causes it to collapse on itself (as insufficient radiant pressure from nuclear fusion to hold up outer layers of gas). • This causes the moment of inertia of the star to decrease drastically and results in a tremendous increase in its angular ...
Example2 - mrdsample
... that has mass of 14900kg and is positioned 9.75m from the left end of the bridge. A car with mass 1590kg is located 10.80m from the right side of the bridge. A pickup truck (2409kg) is positioned 5.25m from the right side of the bridge. a) What is the upward force exerted by the pier on the right to ...
... that has mass of 14900kg and is positioned 9.75m from the left end of the bridge. A car with mass 1590kg is located 10.80m from the right side of the bridge. A pickup truck (2409kg) is positioned 5.25m from the right side of the bridge. a) What is the upward force exerted by the pier on the right to ...
Document
... Suppose you have a solid sphere sitting at rest. It has no kinetic energy at all—no motion. Now push on it with a linear force. It accelerates (in the direction of the force) to a non-zero linear velocity. Now it’s moving—it has kinetic energy: KT = (1/2)mv2 Where did that energy come from? It was t ...
... Suppose you have a solid sphere sitting at rest. It has no kinetic energy at all—no motion. Now push on it with a linear force. It accelerates (in the direction of the force) to a non-zero linear velocity. Now it’s moving—it has kinetic energy: KT = (1/2)mv2 Where did that energy come from? It was t ...
Slide 1 - School of Physical Education
... Angular momentum can be transferred from one body segment to the next. Since body segments differ in mass, the moment of inertia of each body will vary. Considering that momentum is conserved, a reduction in the moment of inertia of a body part will result in an increased angular velocity. ...
... Angular momentum can be transferred from one body segment to the next. Since body segments differ in mass, the moment of inertia of each body will vary. Considering that momentum is conserved, a reduction in the moment of inertia of a body part will result in an increased angular velocity. ...
Chapter 7 Gravitation - REDIRECT TO NEW SITE
... Angular Impulse Angular Momentum Theorem – states the angular impulse on an object is equal to the object’s final angular momentum minus the object’s initial ...
... Angular Impulse Angular Momentum Theorem – states the angular impulse on an object is equal to the object’s final angular momentum minus the object’s initial ...
Physics 130 - UND: University of North Dakota
... vSYS = 875/mTotal = 875/135 = 6.5m/s pSYS,i = 0 in the same direction as pSYS,f pSYS,f = 875kg m/s May seem odd that v is less now but = Arctan (450/750) = 31° above there is more mass in the system! horizontal, to the right ...
... vSYS = 875/mTotal = 875/135 = 6.5m/s pSYS,i = 0 in the same direction as pSYS,f pSYS,f = 875kg m/s May seem odd that v is less now but = Arctan (450/750) = 31° above there is more mass in the system! horizontal, to the right ...
rotation
... Constant Angular Acceleration Kinematics The equations for 1-D motion with constant acceleration are a result the dv definitions of the quantities; because a dt it immediately follows that v v0 at if acceleration is constant. Since the angular variables θ, ω, α are related to each other in ex ...
... Constant Angular Acceleration Kinematics The equations for 1-D motion with constant acceleration are a result the dv definitions of the quantities; because a dt it immediately follows that v v0 at if acceleration is constant. Since the angular variables θ, ω, α are related to each other in ex ...
MollyHungEmilyROTMOT
... The Moment of Inertia Moment of inertia—resistance to rotation. I=m(r^2) The moment of inertia of a point mass is equal to the mass of the object times the square of the object’s distance from the axis of rotation. ...
... The Moment of Inertia Moment of inertia—resistance to rotation. I=m(r^2) The moment of inertia of a point mass is equal to the mass of the object times the square of the object’s distance from the axis of rotation. ...
Impact and Momentum - definition and units
... Impact and Momentum - definition and units In this leaflet the concepts of Impulse and Momentum will be introduced. Momentum If the mass of an object is m and it has a velocity v, then the momentum of the object is defined to be its mass multiplied by its velocity. momentum= mv Momentum has both mag ...
... Impact and Momentum - definition and units In this leaflet the concepts of Impulse and Momentum will be introduced. Momentum If the mass of an object is m and it has a velocity v, then the momentum of the object is defined to be its mass multiplied by its velocity. momentum= mv Momentum has both mag ...
Chapter 11
... Both the magnitude and direction of the angular momentum depend on the choice of origin The magnitude is L = mvr sin f f is the angle between p and r The direction of L is perpendicular to the plane formed by r and p ...
... Both the magnitude and direction of the angular momentum depend on the choice of origin The magnitude is L = mvr sin f f is the angle between p and r The direction of L is perpendicular to the plane formed by r and p ...
Relativistic angular momentum
""Angular momentum tensor"" redirects to here.In physics, relativistic angular momentum refers to the mathematical formalisms and physical concepts that define angular momentum in special relativity (SR) and general relativity (GR). The relativistic quantity is subtly different from the three-dimensional quantity in classical mechanics.Angular momentum is a dynamical quantity derived from position and momentum, and is important; angular momentum is a measure of an object's ""amount of rotational motion"" and resistance to stop rotating. Also, in the same way momentum conservation corresponds to translational symmetry, angular momentum conservation corresponds to rotational symmetry – the connection between symmetries and conservation laws is made by Noether's theorem. While these concepts were originally discovered in classical mechanics – they are also true and significant in special and general relativity. In terms of abstract algebra; the invariance of angular momentum, four-momentum, and other symmetries in spacetime, are described by the Poincaré group and Lorentz group.Physical quantities which remain separate in classical physics are naturally combined in SR and GR by enforcing the postulates of relativity, an appealing characteristic. Most notably; space and time coordinates combine into the four-position, and energy and momentum combine into the four-momentum. These four-vectors depend on the frame of reference used, and change under Lorentz transformations to other inertial frames or accelerated frames.Relativistic angular momentum is less obvious. The classical definition of angular momentum is the cross product of position x with momentum p to obtain a pseudovector x×p, or alternatively as the exterior product to obtain a second order antisymmetric tensor x∧p. What does this combine with, if anything? There is another vector quantity not often discussed – it is the time-varying moment of mass (not the moment of inertia) related to the boost of the centre of mass of the system, and this combines with the classical angular momentum to form an antisymmetric tensor of second order. For rotating mass–energy distributions (such as gyroscopes, planets, stars, and black holes) instead of point-like particles, the angular momentum tensor is expressed in terms of the stress–energy tensor of the rotating object.In special relativity alone, in the rest frame of a spinning object; there is an intrinsic angular momentum analogous to the ""spin"" in quantum mechanics and relativistic quantum mechanics, although for an extended body rather than a point particle. In relativistic quantum mechanics, elementary particles have spin and this is an additional contribution to the orbital angular momentum operator, yielding the total angular momentum tensor operator. In any case, the intrinsic ""spin"" addition to the orbital angular momentum of an object can be expressed in terms of the Pauli–Lubanski pseudovector.