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Work and Energy. Pull the overhead projector. How much work do you do?. Force (Pull). Motion. How much work is done?. Aside: What if a student pushes the projector sideways, and at the same time, the teacher pushes the projector downward? Surely the teacher does _ _ work.
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Pull the overhead projector How much work do you do?
Force (Pull) Motion
How much work is done? • Aside: What if a student pushes the projector sideways, and at the same time, the teacher pushes the projector downward? • Surely the teacher does _ _ work.
How much work is done? • Aside: What if a student pushes the projector sideways, and at the same time, the teacher pushes the projector downward? • Surely the teacher does no work. • To sort things out, use the _ _ _ _ _ _ _ _ _ of the force that is in the direction of the motion.
How much work is done? • Aside: What if a student pushes the projector sideways, and at the same time, the teacher pushes the projector downward? • Surely the teacher does no work. • To sort things out, we use the component of the force that is in the direction of the motion.
Force (Pull) Force (Pull) q Motion Component of Force In direction of Motion = Fcos(q) q is the angle between the __________ and the ____________
Force (Pull) Force (Pull) q Motion Component of Force In direction of Motion = Fcos(q) q is the angle between the Force and the Motion .
W = D Fcos(q) This is how we deal with a force that is not in the direction of the motion
An example with numbers. • The train at Memphis Kiddie Park in known to break down a lot. • To haul the train back to the repair shed, the worker pulls it 7 meters. The train must move along the tracks, but the worker cannot stand on the tracks, so he pulls at an angle. • The worker pulls with a force of 80 N, at an angle of 20˚ with the tracks.
Pull q TRAIN Top View
How much work didthe worker do? • What is the component of force that is along the motion? • What are the units of work?
Calculate the Work W = D Fcos(q) W = (7 m) (80 N) cos(20˚) W = (7 m) (75 N) W = 526 Joules
Types of Energy (Classification is satisfying, but here it does not reveal fundamental properties.) • Mechanical • Chemical • Electromagnetic • Thermal • Nuclear • Mass
Types of Mechanical Energy • Kinetic • Gravitational • Elastic • Sound (2nd semester) • …
Kinetic • All moving things have energy. • More mass means more energy. • More speed means LOTS more energy. • KE = (1/2)mv2
Gravitational • More height means more energy. • How high is a stapler on a desk on the second floor? (1 m above floor? 6 m above ground? Only changes in height will matter.) • More mass means more energy. • GPE = mgh
Elastic • More stretch (Dx) means more energy. • More compression (Dx) means more energy. • Tougher springs (greater spring constant) mean more energy. • EPE = (1/2) k(Dx)2
What would you suppose “total energy” means? E = sum of all the types of _ _ _ _ _ _ that an object has.
What would you suppose “total energy” means? E = sum of all the types of Energy that an object has.
Relationship between Work and Total Energy • How much work is done in lifting a 2 kg object 0.4 meters? • The object starts at rest, ends at rest, and is lifted with the minimum force. • W = D Fcos(q) • q is the angle between the force and the motion. What is q in this question?
Calculate the work: W = D Fcos(q) W = D (Mg) cos(0˚) W = (0.4 m) (2 kg) (9.8) 1 W = 7.84 J
Calculate the change in total energy for this system. DE = E2 - E1 = [GPE2 + KE2] - [GPE1 + KE1] = [GPE2 + 0 ] - [ 0 + 0 ] = mgh2 = (2)(9.8)(0.4) = 7.84 J …. Compare to the Work. W = DE
A student is walking in the cafeteria, carrying a tray of lunch. Explain why no work is done. • Hint: “No work” implies “No Change in Total Energy”. • Carrying the food sideways does not change the energy of the food and does not require work. • Also, the force is upward, and has no component in the direction of the motion.
Recall the exploration: How far does the ball slide in its sled? 1 1 2 D = ?
Use Work - Energy TheoremW = DE Work = D Fcos(q) = D Fcos(180˚) = D f(-1) = -D mkN = -DmkMg DE= E2 - E1 = [0] - [GPE1] = -MgH Set W = DE, giving: -DmMg = -MgH D = H/mk Mass & Angle are not expected to matter. [To see why mass did matter, do it again but include the mass of the sled.]
Use the work energy theoremon a cart. • The cart (0.4 kg) accelerates from 2 m/s to 3 m/s on a level table. • It will take a 4 N force to do it, over a distance of 0.25 m. • How much work was done on the cart? • How much was the total energy changed?
Work done on the cart: W = D F cos(q) W = (0.25 m) (4 N) cos(0˚) W = 1.0 Joules
Calculate thechange in total energy DE = E2 - E1 = (1/2)m(v2 )2 - (1/2)m(v1 )2 = (1/2)(.4)32 - (1/2)(.4)22 = 1.8 J - 0.8 J = 1.0 J Compare to the work done.
What if no work is done? • Doing work on a system can _ _ _ _ _ _ _ _ the total energy of the system.
What if no work is done? • Doing work on a system can increase the total energy of the system. • Friction can take energy _ _ _ of a system, or at least seem to. [It matters what you include in the system.]
What if no work is done? • Doing work on a system can increase the total energy of the system. • Friction can take energy out of a system, or at least seem to. [It matters what you include in the system.] …
What if no work is done? • Doing work on a system can increase the total energy of the system. • Friction can take energy out of a system, or at least seem to. [It matters what you include in the system.] • So, … what happens to the equation if you set W = 0 ?
Conservation of Energy E2 = E1 This is one of the most scrutinized patterns in science. Some of the greatest patterns we see are also simple. We know of seven conservation laws, currently. These laws do not tell us what will happen. They do tell us what is possible.
Conservation • Does this mean that the energy of an object cannot change? • The energy of an object can change by work being done.
Conservation of energy - as a tool • First we appreciate a new pattern in nature. • Then, we exploit it.
Use Conservation of Energy • Drop a 1 kg brick from a window at height 8 m. • How fast does it hit the ground? • No work is done on the earth-brick system, so E2 = E1 • Try it
E2 = E1 mgh2 + (1/2)mv22 = mgh1 + (1/2)mv12 0 + (.5)(1)v22 = (1)(9.8)(8) + 0 0.5 v22 = 78.4 v2 = 12.5 m/s This checks with the old method of v2=vo2+2aDy
If something heats up, it appears as though E2 ≠ E1 . • Which one appears to be greater? • How much heat is made? • Heat = E1 - E2 • Example: slide a book, and heat = (1/2)mv2
Power • Do the same job in less time and the work (select one): is more, less, the same?
Power • Do the same job in less time and the work (select one): is more, less, the same? • This does not seem right. You deserve credit for doing the work faster.
Power • Do the same job in less time and the work (select one): is more, less, the same? • This does not seem right. You deserve credit for doing the work faster. • Power = Work ÷ _ _ _ _
Power • Do the same job in less time and the work (select one): is more, less, the same? • This does not seem right. You deserve credit for doing the work faster. • Power = Work ÷ Time • The units for power are _ _ _ _ _
Power • Do the same job in less time and the work (select one): is more, less, the same? • This does not seem right. You deserve credit for doing the work faster. • Power = Work ÷ Time • The units for power are Watts
What is the power of a person who pushes with 4 N over a distance of 30 m, in 2 seconds? • W= FD = (4)(30) = 120 J • P = W÷T = 120 J / 2 s = 60 W • Notice that “W” can mean Work or Watts, (or even Weight).
Now you are ready for: • Conceptual questions about energy • Problem Solving: Energy.
