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TE Lesson: Work and Power: Waterwheel

Investigating a waterwheel illustrates to students the physical properties of energy. They learn that the concept of work, force acting over a distance, differs from power, which is defined as force acting over a distance over some period of time. Students create a model waterwheel and use it to calculate the amount of power produced and work done.

While designing elevators, power plants or race cars, mechanical engineers take into consideration the concepts of both work and power. Engineers who design automobile engines consider whether the engine will be used in a high-performance or economical car. A high-performance engine is able to quickly accelerate and has a high power rating; it is also more expensive to manufacture. Thus, an engineer designs an engine for an economical car with a lower power rating to reduce the overall manufacturing cost of the car.

Summary
Learning Objectives
Introduction/Motivation
Background
Vocabulary
Associated Activities
Lesson Closure
Assessment
Extensions
References

Grade Level: 7 (6-8)	Lesson #: 2 of 5
Time Required: 50 minutes	Lesson Dependency : None
Keywords: work, power, potential energy, kinetic energy, Newtons, Joules, Watts, force, waterwheel, energy, mechanical, electrical, hydroelectric

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Colorado Math
- 1. represent, describe, and analyze patterns and relationships using tables, graphs, verbal rules, and standard algebraic notation; (Grades 5 - 8) [2005]
- 1. demonstrate meanings for integers, rational numbers, percents, exponents, square roots, and pi (π) use physical materials and technology in problem-solving situations; (Grades 5 - 8) [2005]
- 2. construct, use, and explain procedures to compute and estimate with whole numbers, fractions, decimals, and integers; (Grades 5 - 8) [2005]
Colorado Science
- Standard 5: Students know and understand interrelationships among science, technology, and human activity and how they can affect the world. (Grades 0 - 12) [1995]
- 2.3 Students understand that interactions can produce changes in a system, although the total quantities of matter and energy remain unchanged. (Grades 0 - 12) [1995]

A side view line drawing of a waterwheel shows flowing water pushing against the blades of a rotor, causing the rotor to spin.

Figure 1: In this example of a waterwheel, flowing water pushes the blades, causing the rotor to spin.
click for copyright

To start this lesson, show the class pictures of waterwheels. Explain that in the past, waterwheels were used to grind grain into flour and saw timber. These processes take advantage of the mechanical energy produced by the spinning axle. Modern hydroelectric power plants use the same waterwheel concept to spin turbines in a dam to produce electricity. Figure 1 shows how flowing water in a dam can spin a rotor.

You can illustrate the concept of using mechanical energy to produce electricity by using a hand generator to power a light bulb. The turbines in a dam provide energy to a generator in the same way and can provide energy for entire cities.

Explain that engineers calculate the power produced by a dam by examining the amount and speed of the flowing water. They can determine how much electricity the turbine can produce and how large an area it can reliably supply with energy. Introduce the activity and explain that the students will do a similar exercise to determine the amount of work a model waterwheel can do and how much power it can generate. Before the activity, present and explain the formulas for work and power that are presented in the Lesson Background section.

A brief review of the concepts of potential and kinetic energy (covered in detail in the previous lesson) and work and power, is provided below.

Potential energy is the energy that an object has because of its position. Potential energy can also be thought of as stored energy — energy that an object has, as an inherent characteristic, but is not in use. It is sometimes called gravitational potential energy (PE). It can be expressed mathematically as follows:

PE = mass x g x height

where PE is the potential energy measured in Joules (J) and g is the acceleration due to gravity. At sea level, g = 9.81 meters/sec². An example of potential energy is a book resting on the edge of a table. If you were to nudge it off the edge of the table, the book would fall to the floor and make a loud noise. This is an expression of kinetic energy. Kinetic energy is the energy an object has because of its motion; any object that is moving has kinetic energy. The falling book in this example is an illustration of kinetic energy. The kinetic energy depends on both mass and velocity and can be expressed mathematically as follows:

Kinetic Energy equals mass times velocity squared all divided by two.

Two new concepts that will be discussed in this lesson are work and power. Work is force acting over a distance and can be expressed as:

Work = force x distance

A Newton (N) is the unit of force in the metric system. To find the weight, or downward force, of an object, simply multiply its mass by gravity. For instance, an object with a mass of 10 kilograms would relate to the following weight:

10 kilograms x 9.81 meters/second² = 98.1 kilograms*meters/sec² = 98.1 Newtons.

Now, if a force of 10 Newtons was used to move an object 20 meters, we can determine the work involved. You can visualize this as a person pushing against a big box and sliding it across the floor.

Work = 10 Newtons x 20 meters = 200 Newton*meters = 200 Joules.

A Joule (J) is the unit of work and is the same thing as Newton meter.

Power is work done over a period of time and has units of Watts (W), or Joules/sec. An illustration of power is described in the following example. Two piles of bricks need to be moved across a street. Mary carries two bricks at a time and takes two days to complete the job, while Elizabeth, who is driving a backhoe, does the job in 15 minutes. Mary and Elizabeth both do exactly the same amount of work. However, the amount of power expended is much different. If this job requires 20,000 Joules of work, we can calculate the power of the backhoe. First convert 15 minutes into seconds:

15 min x 60 sec/min = 900 sec.

Then, divide the number of Joules required by the number of seconds:

20,000 Joules ÷ 900 sec = 22.2 Watts.

Elizabeth would then be producing 22.2 Watts of power. On the other hand, Mary would only produce 0.116 Watts of power. Thus, if more power is generated, the quicker the work is performed.

The concepts of work and power are very important to engineers. For example, the power rating of an engine describes how fast a car can accelerate. All cars can go 60 mph, but a sports car such as a Corvette, which has twice the power of most cars, will accelerate to 60 mph very quickly. Engineers need to determine how powerful an engine must be so the car drives well on hills and curves, as well as passes other cars quickly on a freeway. However, powerful engines are costly and if the engine is too expensive, not as many people will buy the car.

Power is also very important in electricity generation. Water will force turbine blades to move and the power of the water will determine the amount of power generated. Engineers can calculate how much power a hydroelectric plant can generate and therefore how large an area or how large a city it can supply with electricity. Power is also important in simpler systems like the operation of building elevators. The amount of power used will determine how quickly an elevator can rise and the maximum weight the elevator can lift.

Power, Work and the Waterwheel - Students construct a model waterwheel to generate both power and work.

An artist's drawing of a river flowing through a canyon, showing the flow of the river stopped by a dam with a design similar to the Hoover Dam, and some water flowing, at a lower level, beyond the dam.

click for copyright

Briefly review the differences between the concepts of power and work. Reiterate that different amounts of power will do the same amount of work over different periods of time (i.e., less power takes longer). Show a photograph of a famous dam, like the Hoover Dam, and point out how much potential energy exists at the top of the dam. Talk about the work done by the water on the turbines and the power generated to meet the needs of cities like Phoenix and Las Vegas.

Explain how engineers of all disciplines are needed to work on projects like dams. Civil engineers design and construct the dam, geotechnical engineers monitor the earth that the dam is built upon, environmental engineers monitor the effects of the dam and mitigate the impact of the dam upon the environment, mechanical engineers construct turbines for the wells, and electrical engineers monitor and construct a power grid to provide energy to surrounding cities.

Pre-Lesson Assessment

Voting: Ask the students to vote on the following question.

Who does more work? A person who takes two trips to the car to unload their groceries or a person who can do it in one? (Answer: This is a trick question. They both do the same amount of work. The person taking two trips only uses half the amount of force to carry the bags, but travels twice as far.)

Post-Introduction Assessment

Brainstorming: In small groups, have the students engage in open discussion. Remind students that no idea or suggestion is "silly." All ideas should be respectfully heard. Ask the students:

What might be typical design constraints engineers encounter while trying to decide how powerful they should design a car or elevator system? (Example considerations: How fast does it need to go? What is the heaviest load it will carry? How much will people pay for it? How big can it be? How much fuel or electricity will it use?)

Lesson Summary Assessment

Question/Answer: Have students answer the following question in a short paragraph in their journals or on a sheet of paper:

Using the unloading-the-car example in the Pre-Lesson Assessment section, How would you figure out who had more power unloading their grocery bags? (Answer: It depends… whoever finished first had more power.)

The following website provides a good description of work and power and also includes interactive exercises: http://www.physicsclassroom.com/Class/energy/U5L1e.html. Have the students read the lessons and work the problems, and check their answers.

Hydroelectric power provides an efficient alternative to traditional electricity sources such as coal and other fossil fuels. Have the students discuss another possible alternative energy source, wind power. Discuss the similarities between wind power and hydroelectric power (i.e., water spins a turbine blade, wind turns a blade on the windmill). Discuss the advantages and disadvantages of these alternative energy sources. Relate that although alternative energy sources are becoming more cost-effective, they are usually more expensive than using fossil fuels. Hydroelectric power, however, is currently cost competitive and cost of wind power is becoming competitive in some regions. An advantage of alternative energy sources is that they are renewable (the sources of fuel do not get used up). Another advantage is that they do not produce pollution like burning fossil fuels do. However, there are some environmental impacts by both wind and water sources. Dams can destroy the ecosystem of a river by changing flows, preventing normal river behavior such as silting and flooding, and preventing fish from getting safely upstream. Wind turbines often spin too fast for birds to see and the birds fly into the turbines and die. Compare the risks of pollution by fossil fuels to the environmental impact of these cleaner fuel sources. The following link provides more detailed information on renewable energy: http://www.nrel.gov/.

Integrated Teaching and Learning Program, College of Engineering, University of Colorado at Boulder Bailey Jones, Matt Lundberg, Chris Yakacki, Malinda Schaefer Zarske, Denise Carlson © 2004 by Regents of the University of Colorado.
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Last Modified: July 12, 2007