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Goal: To understand momentum Objectives: 1) To Learn about What momentum is 2) To learn about how to calculate Momentum in 2 dimensions 3) To understand How is momentum changed? 4) To understand the Conservation of momentum 5) To learn about Why momentum is useful to understand. 6) In the 2nd hour: To learn about applications to the conservation of momentum What is momentum? • You have probably used the word momentum tossed out in everyday life – but not necessarily 100% correctly. • With a neighbor discuss where you have heard momentum talked about, and try to figure out from that what the average person probably thinks momentum means. Will the real momentum please stand up? • In reality momentum is quite simply a measure of your mass times your velocity. • Momentum = mass * velocity • Anytime you have a collision or separation it will be a momentum problem • Lets do some a sample: • 1) A car with mass of 500 kg moves at a velocity of 20 m/s. What is the car’s momentum? Another example: • Two cars are headed towards one another. • The first car has 700 kg of mass and moves at a velocity of 20 m/s North • The 2nd car has 1400 kg of mass and moves at a velocity of 10 m/s South. • A) How much momentum does each car have in the North direction (yes momentum has direction)? • B) What is the combined momentum of the cars? Momentum in 2 dimensions… Each dimension has momentum. • So, you have to find the total momentum for each dimension separately. • Then at the end you can get a magnitude if you want, but usually it is more useful to keep them separate much like you keep a checking account separate from a savings account. Changing momentum • • • • • How do you change momentum? You use what is called an “impulse”. Impulse = force * time Note that force = mass * acceleration So, Impulse = mass * (acceleration * time) • What does acceleration * time equal? Impulse • Acceleration * time = change in velocity • So, Impulse = mass * change in velocity in essence. • However, you will almost always be given a force and time to find it. Example: • A car runs into a mailbox. • The mass of the mailbox is 10 kg and the mass of the car is 800 kg. • If the car imparts a 2000 N force to the mailbox for 0.4 seconds find: • A) The impulse on the mailbox • B) The new velocity of the mailbox (set impulse = to mass * change in velocity)? • C) What is the impulse the mailbox imparts on the car? (What, you have forgotten about Newton’s 3rd law already?) • D) How much does the car’s momentum change? • E) What is the net change in momentum (i.e. if you add the changes in momentum of the car and mailbox what do you get)? Conservation of momentum! • Momentum is almost always conserved in a collision. • In fact it is conserved for each dimension. • Quick question – will kinetic energy be conserved? • KE = 0.5 * mass * velocity * velocity Energy? • Sometimes kinetic energy is also conserved. • Collisions that conserve kinetic energy are called elastic collisions. • Collisions where energy is not conserved are called inelastic collisions. • However, what happens to the “lost” energy for an inelastic collision? “Oooh, oooh, fender bender” The pips from that car commercial • In many collisions energy is transferred. • Energy is transferred to sound energy, heat energy, and used to crumple a car. • These collisions are always inelastic collisions. • So, if you get hit by a car, you want it to be an elastic collision! • You will fly faster and further, but the initial impact won’t use energy to bend and break things. Uses • Well, using momentum we can better predict what will happen in many collisions. • When might this be useful? Useful when: • • • • Playing pool Bowling Making safety features for cars or other things Making a racecar safe (parts fly off at high speed so that the rest of the car can more safely loose momentum – protecting the driver). • Military – bombs ect – especially if you want to prevent hurting innocent bystanders • Sports Conclusion for this hour • We learned that momentum = mass * velocity • Momentum has direction and breaks into dimensions • Changing momentum requires impulses • Momentum is conserved even when kinetic energy is not • Knowing about momentum helps In this hour • We will apply the conservation of momentum to some real life problems. • Example 1 importance of the follow through: • Two hitters hit a 0.6 kg ball coming at them at 40 m/s South (90 mph). • The first applies a force of 320 N North for 0.2 seconds. • The second applies a force of 80 N North for 1.2 seconds (he follows through) • What will the velocities of the hit balls be for each hitter and which did a better job of hitting the ball? Rear end crash • A speeding car of mass 800 kg attempting to elude the police crashes into a 600 kg car sitting parked at the intersection. • Ignoring breaks and friction, if the initial velocity of the speeding car is 50 m/s and the final velocity of the speeding car is 10 m/s then what will the final velocity of the other car be? Head on collision • • • • Car 1: 25 m/s East and a mass of 800 kg. Car 2: 30 m/s West and a mass of 900 kg. A) What is the momentum of each car. B) What is the net momentum of the two cars combined. • C) After the crash Car 1 moves West at a velocity of 5 m/s. What will the final velocity of car 2 be? Ball off a wall • You bounce a 0.1 kg ball off of the wall. • The ball hits the wall at 20 m/s and when it bounces it returns at 80% of the speed of when it hit the wall. • A) What is the change in velocity for the ball (remember direction)? • B) What is the change in momentum? • C) If the ball is in contact with the wall for 0.6 seconds then what is the average force that the wall imparts to the ball? • D) What is the acceleration the wall gives the ball? • E) If you ran into the wall and were given that acceleration what would happen? Conclusion • Momentum = mass * velocity • Momentum is conserved! • Momentum is conserved in every direction! • If you run into something – or it runs into you – at high velocity – don’t bounce!