Momentum Conservation Conservation of Linear Momentum The net

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Momentum Conservation

Momentum Conservation

Conservation of Linear Momentum The net force acting on an object is the rate

Conservation of Linear Momentum The net force acting on an object is the rate of change of its momentum: If the net force is zero, the momentum does not change:

Conservation of Linear Momentum Internal Versus External Forces: Internal forces act between objects within

Conservation of Linear Momentum Internal Versus External Forces: Internal forces act between objects within the system. As with all forces, they occur in action-reaction pairs. As all pairs act between objects in the system, the internal forces always sum to zero: Therefore, the net force acting on a system is the sum of the external forces acting on it.

Conservation of Linear Momentum Furthermore, internal forces cannot change the momentum of a system.

Conservation of Linear Momentum Furthermore, internal forces cannot change the momentum of a system. However, the momenta of components of the system may change.

Conservation of Linear Momentum An example of internal forces moving components of a system:

Conservation of Linear Momentum An example of internal forces moving components of a system:

Canoe Example Two groups of canoeists meet in the middle of a lake. After

Canoe Example Two groups of canoeists meet in the middle of a lake. After a brief visit, a person in Canoe 1 (total mass 130 kg) pushes on Canoe 2 (total mass 250 kg) with a force of 46 N to separate the canoes. Find the momentum of each canoe after 1. 20 s of pushing. Net momentum = 0

Example: Velocity of a Bee A honeybee with a mass of 0. 150 g

Example: Velocity of a Bee A honeybee with a mass of 0. 150 g lands on one end of a floating 4. 75 g popsicle stick. After sitting at rest for a moment, it runs to the other end of the stick with a velocity vb relative to still water. The stick moves in the opposite direction with a velocity of 0. 120 cm/s. Find the velocity vb of the bee.

Inelastic Collisions Collision: two objects striking one another. Time of collision is short enough

Inelastic Collisions Collision: two objects striking one another. Time of collision is short enough that external forces may be ignored. Inelastic collision: momentum is conserved but kinetic energy is not: pf = pi but Kf ≠ Ki. Completely inelastic collision: objects stick together afterwards: pf = pi 1 + pi 2

Inelastic Collisions A completely inelastic collision:

Inelastic Collisions A completely inelastic collision:

Example: Goal-Line Stand On a touchdown attempt, a 95. 0 kg running back runs

Example: Goal-Line Stand On a touchdown attempt, a 95. 0 kg running back runs toward the end zone at 3. 75 m/s. A 111 kg line backer moving at 4. 10 m/s meets the runner in a head-on collision and locks his arms around the runner. (a) Find their velocity immediately after the collisions. (b) Find the initial and final kinetic energies and the energy DK lost in the collision.

Inelastic Collisions Ballistic pendulum: the height h can be found using conservation of mechanical

Inelastic Collisions Ballistic pendulum: the height h can be found using conservation of mechanical energy after the object is embedded in the block.

Example: Ballistic Pendulum A projectile of mass m is fired with an initial speed

Example: Ballistic Pendulum A projectile of mass m is fired with an initial speed v 0 at the bob of a pendulum. The bob has mass M and is suspended by a rod of negligible mass. After the collision the projectile and bob stick together and swing at speed vf through an arc reaching height h. Find the height h.

Inelastic Collisions For collisions in two dimensions, conservation of momentum is applied separately along

Inelastic Collisions For collisions in two dimensions, conservation of momentum is applied separately along each axis:

Example: A Traffic Accident A car of mass m 1 = 950 kg and

Example: A Traffic Accident A car of mass m 1 = 950 kg and a speed v 1, i = 16 m/s approaches an intersection. A minivan of mass m 2 = 1300 kg and speed v 2, i = 21 m/s enters the same intersection. The cars collide and stick together. Find the direction q and final speed vf of the wrecked vehicles just after the collision.

Explosions An explosion in which the particles of a system move apart from each

Explosions An explosion in which the particles of a system move apart from each other after a brief, intense interaction, is the opposite of a collision. The explosive forces, which could be from an expanding spring or from expanding hot gases, are internal forces. If the system is isolated, its total momentum will be conserved during the explosion, so the net momentum of the fragments equals the initial momentum.

Elastic Collision 31. • A 722 -kg car stopped at an intersection is rear-ended

Elastic Collision 31. • A 722 -kg car stopped at an intersection is rear-ended by a 1620 -kg truck moving with a speed of 14. 5 m/s. If the car was in neutral and its brakes were off, so that the collision is approximately elastic, find the final speed of both vehicles after the collision. 0