What Is Conservation of Momentum? | Physics in Motion

00:09:33
https://www.youtube.com/watch?v=w2zQJ8JMlBA

Summary

TLDRThe video segment discusses the principle of conservation of momentum, providing real-life examples such as playing pool and roller skating. It explains that momentum—defined as mass times velocity—is a conserved quantity in closed and isolated systems, meaning it doesn't change in the total sum through collisions. Using Newton's Third Law of Motion, the segment illustrates how momentum is transferred in billiard ball collisions and similar scenarios. It provides practical problems to demonstrate how to calculate the conservation of momentum using mathematical equations. The segment also highlights the broader significance of conservation laws in physics, allowing for predictions of system behavior over time.

Takeaways

  • 🎱 Momentum is a conserved quantity in physics, important for understanding collisions.
  • 🔄 Momentum remains constant in closed, isolated systems, illustrating Newton's Third Law.
  • 🎯 The pool game is used as an example to demonstrate momentum transfer between objects.
  • 📚 Conservation laws help predict system behavior without knowing every interacting detail.
  • 🤝 Roller skating serves as a practical illustration of momentum conservation between two people.
  • 🛠 Practical problems show how to compute final velocities after collisions using momentum conservation.
  • 🔬 Equations and measurements are critical in physics to apply momentum concepts accurately.
  • 📏 The concept of momentum includes both speed and direction, as it is a vector quantity.
  • 🧪 Experiments and activities can enhance understanding of momentum principles.
  • 🚀 Momentum conservation appears in various scenarios like launching rockets or shooting arrows.

Timeline

  • 00:00:00 - 00:09:33

    In this segment from "Physics in Motion," the concept of the conservation of momentum is explained using a game of pool as an illustration. The fundamental principle of momentum conservation states that the total momentum in a closed and isolated system remains constant through collisions. The momentum is transferred between objects, exemplified when a pool cue ball strikes another ball, transferring its momentum and stopping at the collision. The program further explores how momentum is maintained when two objects, like billiard balls, collide at an angle, emphasizing that even though the direction and velocity might change, the overall momentum is conserved as a vector quantity. Equations are introduced to calculate momentum before and after a collision, facilitating problem-solving by using an example involving pool balls.

Mind Map

Video Q&A

  • What is the main topic of this segment?

    The segment focuses on the law of the conservation of momentum through practical examples.

  • How is momentum related to collisions?

    Momentum is conserved in collisions, meaning the total momentum before and after remains the same in a closed system.

  • What is momentum?

    Momentum is a vector quantity, calculated by multiplying an object's mass by its velocity. It is conserved in collisions.

  • How is conservation of momentum demonstrated in pool?

    When billiard balls collide, the momentum from one ball can be transferred to another, demonstrating momentum conservation.

  • What physical laws are connected to momentum conservation?

    Newton's Third Law of Motion, which states every action has an equal and opposite reaction, supports the conservation of momentum.

  • How do momentum conservation principles apply to roller skating?

    When two skaters push off from each other, they move in opposite directions with conserved total momentum, demonstrating this principle.

  • Why is it important to understand conservation laws in physics?

    Conservation laws help predict system behavior without needing to account for every detail by understanding initial conditions.

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  • 00:00:00
    ♪♪
  • 00:00:22
    Nice shot, Tom.
  • 00:00:25
    (sighs)
  • 00:00:28
    Ooh, mine, not so much.
  • 00:00:30
    Seems like the momentum of my ball got lost, or did it?
  • 00:00:35
    Pool is a game of real skill,
  • 00:00:36
    and it's also a way to look at
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    one of the most powerful laws of physics.
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    We'll find out how
  • 00:00:41
    in this segment of "Physics in Motion,"
  • 00:00:43
    as we look at the law of the conservation of momentum.
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    During this series,
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    we'll talk about a few conservation laws,
  • 00:00:50
    specifically for energy, momentum, charge, and mass.
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    These fundamental quantities
  • 00:00:56
    cannot be created or destroyed.
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    They can only be changed from one form to another,
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    or transferred from one object to another.
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    So, what do you think happens to the momentum
  • 00:01:06
    of billiard balls when they strike another ball?
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    If you figured that the momentum is conserved,
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    you're right.
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    The law of the conservation of momentum says that
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    in a collision between objects
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    in a closed and isolated system,
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    the total momentum of the objects in the system
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    before the collision is equal to the total momentum
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    of the objects in the system after the collision.
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    Just like the other laws of conservation,
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    momentum is not created or destroyed.
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    There's another law of physics that might sound familiar
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    when we talk about collisions.
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    Remember Newton's laws,
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    which predict the motion of most objects?
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    His third law of motion states
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    that for every action,
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    there is an equal and opposite reaction.
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    This means that objects exert equal forces
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    on one another when they interact.
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    One of the consequences of Newton's third law
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    is the law of conservation of momentum.
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    We can see it in action when you hit a straight shot,
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    like this, and it does this.
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    You exert a force on the cue ball,
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    which makes it gain momentum.
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    When you strike the ball,
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    that momentum is transferred to it.
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    When the ball collides with the other ball
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    and the first ball stops,
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    all the momentum has been transferred
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    from the first ball to the second ball.
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    But what about in this case?
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    This time, the cue ball hits the other ball at an angle,
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    and both balls are moving.
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    So, was the momentum conserved?
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    If you answered yes, you're right.
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    Remember that momentum, like velocity and direction,
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    is a vector quantity.
  • 00:02:42
    When the first ball travels in this direction,
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    it carries some of the momentum with it.
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    The rest is transferred to the second ball,
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    but not enough to reach the pocket.
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    However, none of the momentum was lost,
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    only transferred.
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    In equation form, we see that the total momentum, P,
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    before objects interact with one another,
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    is equal to the total momentum of all the objects
  • 00:03:05
    after they interact.
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    Now, ready to try solving a problem?
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    A pool player is about to use the cue ball
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    to make a direct hit on the eight ball,
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    which is at rest.
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    Each ball has a mass of 170.0 grams,
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    and the cue ball's initial speed
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    is 6.00 meters per second.
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    After the collision, the cue ball comes to a stop.
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    If no momentum is lost in the collision,
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    what is the total momentum of this system,
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    and how fast is the eight ball moving after the collision?
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    Remember, the momentum of an object
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    is equal to its mass times its velocity.
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    P equals M times V.
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    The unit for momentum is kilogram meters per second.
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    To be consistent, we'll convert the mass to kilograms.
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    The cue ball has a mass of 0.170 kilograms.
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    So, let's multiply that by the velocity
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    of 6.00 meters per second.
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    So, the momentum of the cue ball before the collision
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    is 1.02 kilograms meters per second.
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    Since objects at rest do not have momentum,
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    the eight ball begins with zero momentum.
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    So, the total momentum of the cue ball
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    and the eight ball together before the collision
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    is also 1.02 kilograms meters per second,
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    and because momentum is conserved,
  • 00:04:34
    1.02 kilograms meters per second
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    is the system's total momentum after the collision, too.
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    Now, what about the final velocity of the eight ball?
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    Since the collision brings the cue ball to rest,
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    the eight ball carries all the system's momentum.
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    That means we can divide 1.02 kilograms meters per second
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    by 0.170 kilograms, the eight ball's mass,
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    to find its velocity,
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    and that turns out to be 6.00 meters per second,
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    the same as the cue ball had at first.
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    See how the law of conservation of momentum
  • 00:05:11
    helped us solve this equation?
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    You apply the law of conservation of momentum
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    only when a collision happens in a closed,
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    isolated system.
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    That means matter and energy
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    do not enter or leave the system,
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    which means there are no net outside forces
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    acting on the system.
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    In our example, the two pool balls are the system.
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    They don't enter or leave, so the system is closed.
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    The only force we consider
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    is the force between the two balls when they collide.
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    We're not concerned about the initial force of the cue stick
  • 00:05:44
    or the friction between the balls and the table.
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    So we say that the system is isolated.
  • 00:05:49
    ♪♪
  • 00:05:55
    Let's do one more where we can look at speed and direction,
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    but this time, we'll do it while roller skating.
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    We have two people facing each other.
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    Chirag is 60.0 kilograms, and Summer is 45.0 kilograms.
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    Both are at rest.
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    Okay, so, put your hands together.
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    Now, push.
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    Chirag is moving in one direction
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    at a speed of 2.00 meters per second.
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    What is Summer's speed and direction?
  • 00:06:23
    We're doing this mathematically, remember.
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    First, we establish their initial momentum.
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    That would be zero because they're at rest.
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    The final momentum of the system
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    will be the sum of the momentum values for Summer and Chirag,
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    which are equal to their mass times their final velocity.
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    If the total initial momentum of the system is zero,
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    the total final momentum of the system
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    must also be zero.
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    So, we know that Chirag and Summer must have equal
  • 00:06:51
    and opposite momenta.
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    Now, let's substitute the mass of Chirag and Summer
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    in our values and Chirag's final velocity
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    to determine Summer's final velocity.
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    We know that Summer's mass is 45.0 kilograms.
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    Chirag's mass is 60.0 kilograms,
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    and his final velocity is 2.00 meters per second.
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    The only other value in the equation
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    is Summer's final velocity,
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    which is what we're solving for.
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    We multiply Chirag's mass times his final velocity
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    to get a final momentum of 120.0 kilograms meters per second.
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    Remember, the sign indicates the direction of motion
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    of Chirag and Summer.
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    And because they're moving in opposite directions,
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    they should have opposite signs.
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    We divide both sides by 45.0 kilograms
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    to get Summer's final velocity,
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    and that turns out to be
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    negative 2.70 meters per second.
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    So, let's check.
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    Does this answer make sense?
  • 00:07:57
    Does the sign in front of Summer's velocity
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    represent the direction of her motion
  • 00:08:02
    compared to the direction of Chirag?
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    And secondly, does the value of Summer's speed
  • 00:08:08
    compare reasonably to the value of Chirag's speed?
  • 00:08:11
    The answer to both of these questions is yes.
  • 00:08:15
    Chirag's had a final velocity of positive
  • 00:08:18
    2.00 meters per second,
  • 00:08:21
    and Summer's was negative 2.70 meters per second.
  • 00:08:25
    The sign indicated the direction of motion,
  • 00:08:28
    and when they pushed off of one another,
  • 00:08:30
    they moved in opposite directions.
  • 00:08:33
    We see the conservation of momentum at work
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    all around us.
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    When you step onto a dock from a boat,
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    you push forward, and the boat moves backward.
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    When you shoot an arrow at a target,
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    the recoil of the bow has the opposite
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    and equal momentum of the arrow.
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    And when you launch a rocket,
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    the exhaust pushes it forward in equal and opposite measure,
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    sending it out of the earth's atmosphere
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    with power and precision.
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    Conservation laws,
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    including the conservation of momentum,
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    are vital in physics
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    because they make it possible to predict
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    how a system will behave
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    without having to consider every detail.
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    Once you know a few things about the initial condition,
  • 00:09:12
    you can say a lot about the final state of a system.
  • 00:09:15
    For more practice with momentum,
  • 00:09:17
    check out our Closer Look.
  • 00:09:19
    That's it for this segment of "Physics in Motion,"
  • 00:09:21
    and we'll see you guys next time.
  • 00:09:26
    For more practice problems,
  • 00:09:27
    lab activities, and note-taking guides,
  • 00:09:30
    check out the "Physics in Motion" toolkit.
Tags
  • Physics
  • Momentum
  • Conservation Laws
  • Newton's Third Law
  • Collisions
  • Pool
  • Roller Skating
  • Vector Quantity