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Inverse Variation Investigate inverse variation through real- world problems Learn the basic inverse variation equations Graph inverse variation functions.

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Presentation on theme: "Inverse Variation Investigate inverse variation through real- world problems Learn the basic inverse variation equations Graph inverse variation functions."— Presentation transcript:

1 Inverse Variation Investigate inverse variation through real- world problems Learn the basic inverse variation equations Graph inverse variation functions

2 In the past investigation you noticed that as one quantity increased the other quantity that was related to it also increased. Name some of the relationships we have studied so far where this is true.

3 ` Now think about this situation. Suppose you opened your classroom door by pushing on it close to the hinges. Then suppose you opened the same door by pushing on it farther from the hinges. As the distance from the hinge increases, the force needed to open the door decreases. This is an example of an inverse relationship.

4 Speed versus Time Page 123 Materials Needed One CBR Graphing Calculator Connecting Cables

5 Set up the course by marking a starting line and finish line 2.0 meters apart. Be sure you have acquired the Inverse Program. Run the Inverse Program and follow the directions on the calculator screen. To begin the walker stands at the starting line and the CBR holder stands 1 meter behind the starting line, facing the walker. The CBR holder presses the TRIGGER on the CBR and the walker starts walking about 1 second later. The walker walks from the starting line to the finish line at a constant rate. The walker stops at the finish line and stands still until the 10 seconds is over.

6 When the walk is complete press ENTER. Isolate the part of the graph that shows the walker moving. From the screen record the total time for the walk and the average speed of the walker. Record this on the chart. Switch jobs and collect additional information until you have 5 sets of data

7 Enter the total time in L1 and average speed in L2. Create a graph of the data. Complete steps 7 and 8. Enter an equation in y1 that is of the form y=a/x that is a good model for the relationship between the total time and the average speed. What does the value of a represent in this problem? Return to the lists and enter L3=L1●L2. What do you notice about L3?

8 Since we can also write or Show that all three expressions are the same.

9 How are the three equations different from the other proportions we were writing?

10 Tyline measured the force needed as she opened a door by pushing at various distances from the hinge. She collected the data in the table at the right. (N=Newtons, a metric measure of force.) Enter the data in your calculator using L1 and L2. Distance (cm) Force (N) 40.020.9 45.018.0 50.016.1 55.014.8 60.013.3 65.012.3 70.511.6 75.010.7

11 Create a graph of the data. Calculate the produce of the distance and force in L3. Find the average value of the products in L3. Write the equation of the form y=a/x that fits this data. Distance (cm) Force (N) 40.020.9 45.018.0 50.016.1 55.014.8 60.013.3 65.012.3 70.511.6 75.010.7

12 After studying example B work with your group to complete problem 11 on page 129. Be prepared to present your solution to the problem.

13 Elaine, Ellen, and Eleanor, who are identical triplets, were playing together on a seesaw. When two of them sat on one side and one on the other, some careful positioning was needed to make the seesaw balance. After playing, they came indoors and did an experiment to understand this relationship. They place a pencil under the center of a 12 inch ruler and gathered a pile of nickels. They placed 2 nickels 3 inches from the center on one side of the “seesaw.” Then they placed different numbers of nickels on the other side and moved them until the balance point was found. Here is the data. Nickels123456 Distance to Center 6321.51.21

14 Check the product of each data pair. Nickels123456 Distance to Center 6321.51.21

15 If 5 nickels are placed 4 inches from the center of the balance, how far will 8 nickels need to be placed from the center of the balance to balance the ruler?

16 If two of the triplets sit 7 feet from the center of the seesaw, how far from the center does the other triplet need to sit to balance the seesaw?

17 Evaluation of the day Please complete the short evaluation of Day 2 of the workshop. Your input on what has taken place is valued.


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