1. Work, Energy & Power AP Physics B

2. There are many different TYPES of Energy. Energy is expressed in JOULES (J) 4.19 J = 1 calorie Energy can be expressed more specifically by using the term WORK(W) Work = The Scalar Dot Product between Force and Displacement. So that means if you apply a force on an object and it covers a displacement you have supplied ENERGY or done WORK on that object.

3. Scalar Dot Product? A product is obviously a result of multiplying 2 numbers. A scalar is a quantity with NO DIRECTION. So basically Work is found by multiplying the Force times the displacement and result is ENERGY, which has no direction associated with it. A dot product is basically a CONSTRAINT on the formula. In this case it means that F and x MUST be parallel. To ensure that they are parallel we add the cosine on the end. W = Fx Area = Base x Height

4. Work The VERTICAL component of the force DOES NOT cause the block to move the right. The energy imparted to the box is evident by its motion to the right. Therefore ONLY the HORIZONTAL COMPONENT of the force actually creates energy or WORK. When the FORCE and DISPLACEMENT are in the SAME DIRECTION you get a POSITIVE WORK VALUE. The ANGLE between the force and displacement is ZERO degrees. What happens when you put this in for the COSINE? When the FORCE and DISPLACEMENT are in the OPPOSITE direction, yet still on the same axis, you get a NEGATIVE WORK VALUE. This negative doesn't mean the direction!!!! IT simply means that the force and displacement oppose each other. The ANGLE between the force and displacement in this case is 180 degrees. What happens when you put this in for the COSINE? When the FORCE and DISPLACEMENT are PERPENDICULAR, you get NO WORK!!! The ANGLE between the force and displacement in this case is 90 degrees. What happens when you put this in for the COSINE?

5. The Work Energy Theorem Up to this point we have learned Kinematics and Newton's Laws. Let 's see what happens when we apply BOTH to our new formula for WORK! 1.We will start by applying Newton's second law! 2.Using Kinematic #3! v 2 = v o 2 + 2 a x 3.An interesting term appears called KINETIC ENERGY or the ENERGY OF MOTION!

6. The Work Energy Theorem And so what we really have is called the WORK-ENERGY THEOREM. It basically means that if we impart work to an object it will undergo a CHANGE in speed and thus a change in KINETIC ENERGY. Since both WORK and KINETIC ENERGY are expressed in JOULES, they are EQUIVALENT TERMS! " The net WORK done on an object is equal to the change in kinetic energy of the object.” KE increases, W is positive, KE decreases, W is negative. W = ΔKE

7. Example W=Fxcos  A 70 kg base-runner begins to slide into second base when moving at a speed of 4.0 m/s. The coefficient of kinetic friction between his clothes and the earth is 0.70. He slides so that his speed is zero just as he reaches the base (a) How much energy is lost due to friction acting on the runner? (b) How far does he slide?

8. Example A 5.00 g bullet moving at 600 m/s penetrates a tree trunk to a depth of 4.00 cm. (a) Use the work-energy theorem, to determine the average frictional force that stops the bullet. (b) Assuming that the frictional force is constant, determine how much time elapses between the moment the bullet enters the tree and the moment it stops moving

9. Lifting mass at a constant speed Suppose you lift a mass upward at a constant speed,  v = 0 &  K=0. What does the work equal now? Since you are lifting at a constant speed, your APPLIED FORCE equals the WEIGHT of the object you are lifting. Since you are lifting you are raising the object a certain “y” displacement or height above the ground. When you lift an object above the ground it is said to have POTENTIAL ENERGY

10. Suppose you throw a ball upward What does work while it is flying through the air? Is the CHANGE in kinetic energy POSITIVE or NEGATIVE? Is the CHANGE in potential energy POSITIVE or NEGATIVE?

11. ENERGY IS CONSERVED The law of conservation of mechanical energy states: Energy cannot be created or destroyed, only transformed! Energy InitialEnergy Final

12. Mechanical Energy and Its Conservation If there are no nonconservative forces, the sum of the changes in the kinetic energy and in the potential energy is zero – the kinetic and potential energy changes are equal but opposite in sign. This allows us to define the total mechanical energy: And its conservation:

13. Using Conservation of Mechanical Energy In the image on the left, the total mechanical energy is: The energy buckets (right) show how the energy moves from all potential to all kinetic.

14. A rock falls from a height of 3.0 m. Calculate the rock’s speed when it has fallen 2.0 m using conservation of energy.

15. Energy consistently changes forms

16. PositionmvUKME 1 Am I above the ground? Am I moving? (= U+K)

17. Energy consistently changes forms PositionmvUKME 160 kg8 m/s0 J1920 J 260 kg

18. Energy consistently changes forms PositionmvUKME 160 kg8 m/s0 J1920 J 260 kg6.66 m/s588 J1332 J1920 J 360 kg1920 J Am I moving at the top?No, v = 0 m/s

19. Example A 2.0 m pendulum is released from rest when the support string is at an angle of 25 degrees with the vertical. What is the speed of the bob at the bottom of the string? L  Lcos  h E B = E A

20. Elastic Potential Energy Potential energy can also be stored in a spring when it is compressed; the figure below shows potential energy yielding kinetic energy.

21. Elastic Potential Energy The force required to compress or stretch a spring is: where k is called the spring constant, and needs to be measured for each spring.

22. Elastic Potential Energy The force increases as the spring is stretched or compressed further. We find that the potential energy of the compressed or stretched spring, measured from its equilibrium position, can be written:

23. Dart Gun Problem m = 0.100 kg k = 250 N/m At what speed is the dart shot?

24. Energy Conservation with Dissipative Processes; Solving Problems If there is a nonconservative force such as friction, where do the kinetic and potential energies go? They become heat; the actual temperature rise of the materials involved can be calculated.

25. Conservative and Nonconservative Forces Therefore, we distinguish between the work done by conservative forces and the work done by nonconservative forces. We find that the work done by nonconservative forces is equal to the total change in kinetic and potential energies:

26. Because of friction, a roller coaster car does not reach the original height on the second hill. Estimate the average friction force on the car (mass = 1000 kg).

27. Power One useful application of Energy is to determine the RATE at which we store or use it. We call this application POWER! As we use this new application, we have to keep in mind all the different kinds of substitutions we can make. P=W/t Unit = WATT

28. Example What is the average power needed to accelerate a 950-kg car from 0 to 65 mi/h in 6.0 seconds? Assume that all forms of frictional losses can be ignored.

29. Example A kayaker paddles with a power output of 50.0 W to maintain a steady speed of 1.50 m/s. (a) Calculate the resistive force exerted by the water on the kayak. (b) If the kayaker doubles her power output, and the resistive force due to the water remains the same, by what factor does the kayaker’s speed change?