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Linear Momentum AP Physics C
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What is Momentum? What is its definition? Momentum: the product of an object’s mass and its velocity Momentum: “mass in motion” Momentum: “quantity of motion” -Newton Momentum: It is a vector! Momentum: is sometimes called linear momentum
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What is Momentum? How do we calculate it? What are its units? If object is moving in arbitrary direction:
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Examples: Calculate the momentum of: A)Calculate the momentum of a 5 kg object that is moving 3 m/s to the right? Left? B)A 3.00 kg particle has a velocity of Find its x and y components of momentum. Find the magnitude and direction of its momentum.
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How is momentum related to other physics concepts that we have already studied? We will soon see that it has many things in common with Energy, Newton’s 3 rd law, and The Calculus. The time rate of change of linear momentum of a particle is equal to the net force acting on the particle.
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Pause to think about calculus concepts: Why is a derivative involved? What does this say about the slope of a momentum- time graph? The area under which graph might be meaningful? So, how might an integral be involved? Momentum may be changing non-uniformly with time The slope of a momentum-time graph is net force! The area under a force-time graph is a change in momentum! The integral of force with respect to time is a change in momentum!
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Pause to think about calculus concepts: The integral of force with respect to time is a change in momentum! We call the left-hand side of this equation the IMPULSE of the force
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Pause to think about calculus concepts: The slope of a momentum-time graph is net force! The area under a force-time graph is a change in momentum or an impulse
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Examples An object experience a net force that varies with time such that: F(t) = 3t 2 + 2t + 3. Find the impulse given to the object between the times of 0 and 3 seconds. Find the change in momentum. According to the graph below, what is the change in momentum of the 2.00 kg particle? If the particle originally has a speed of 2 m/s, what is its speed after the impulse is provided?
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Impulse-Momentum Theorem: The impulse of a force F equals the change in momentum of the particle. This is another way of saying that a net force must be applied to change an objects state of motion. Why does this look different from the last equation? Because the force might be constant!
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A few things about IMPULSE: It is a vector in the same direction as the change in momentum. It is not a property of an object! It is a measure of the degree to which a force changes a particles momentum. We say an impulse is given to a particle. What are its units? From the equation we see that they must be the same as momentum’s units (kgm/s). Impulse approximation: assume the force is applied only for an instant and that it is much greater than other forces present.
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Things you should have seen from the Investigation.
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Quick Conceptual Quiz Can a hummingbird have more momentum than a rhino? Why might an out of control truck hit a haystack or barrels and pile of sand as opposed to a wall as an emergency stop? How is a ninja’s ability to break stacks of wood related to impulse and momentum? What good is it to know an object’s momentum?
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When a dish falls, will the impulse be less if it lands on a carpet than if it lands on a hard floor? No – the same impulse – the force exerted on the dish is less because the time of momentum change increases.
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Example: Conservation of Momentum in Two Dimensions Peregrine falcons often grab their prey from above while both falcon and prey are in flight. A 0.8 kg falcon, flying at 18 m/s, swoops down at 45˚ angle from behind the a 0.36 kg pigeon flying horizontally at 9.0 m/s. What are the speed and direction of the falcon (now holding the pigeon) immediately after impact?
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Example: Conservation of Momentum in Two Dimensions A 10 g projectile is traveling east at 2.0 m/s, when it suddenly explodes into three pieces. A 3.0 g fragment is shot due west at 10 m/s while another 3.0 g fragment travels 40˚ north of east at 12 m/s. What are the speed and direction of the third fragment?
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Example: Conservation of Momentum in Two Dimensions A firecracker traveling with a velocity of 3 m/s in the direction of the +x axis, explodes and breaks up into two equal pieces. After the explosion, one piece flies off with a velocity of 2 m/s at an angle of 30 degrees above the +x axis. Find the velocity of the second piece.
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