MATH133 Unit 4: Functions and Their Graphs

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MATH133 Unit 4: Functions and Their Graphs

 

Individual Project Assignment: Version 2A

 

Show all of your work details, explanations, and answers on the Unit 4 IP Answer Form provided.

Problem 1: Children’s Growth

A study of the data representing the approximate average heights of children from birth to 12 years (144 months) has shown the following two equations. The function is the radical function representing the girls’ heights in inches after x months, and the function is the radical function representing the boys’ heights in inches after x months ( months).

() ()

1. Choose five different values of x between 0 and 144 months, and calculate the values of each of these functions for the chosen x values. Show all of your work and display these calculated values of ( ) and ( ) in “t-tables” in the Answer Form supplied.

  1. Use these five different values of x and the corresponding calculated values of both functions, together with Excel or another graphing utility, to draw the graphs of these two functions. These graphs should be drawn on the same coordinate system so that the two functions can be easily compared. Insert those graphs into the Answer Form.

  2. Set the two functions equal to each other, and solve the resulting radical equation for x. This value of x will be the age in months when boys and girls are the same height. (Show all of the steps for solving this radical equation on the Answer Form provided.)

  3. What is the height in inches when boys and girls (according to these radical functions) are the same height? (Show all of your work on the Answer Form provided.)

  4. Based on each of the two radical functions above, what is the average change in height per month for girls and the average change in height per month for boys between the two values of x (x = 30 months and x = 60 months)? (Show all of your work on the Answer Form provided.)

√ √

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  1. Describe the transformations of the radical function ( ) that will result in each of these functions.

  2. Which intellipath Learning Nodes helped you with this problem?

Problem 2: Average Cost

Your company is making a product item. The fixed costs for making this product are b, and the variable costs are mx, where x is the number of items produced. The cost function is the following linear function:

()

The average cost is the total costs divided by the number of items produced, which is a rational function, as follows:

̅

1. Based on the first letter of your last name, choose values for m and b from the following tables (Neither m nor b has to be a whole number):

First letter of your last name

Possible values for m

AF

$10$19

GL

$20$29

MR

$30$39

SZ

$40$49

First letter of your last name

Possible values for b

AF

$100$149

GL

$150$199

MR

$200$299

SZ

$300$399

2. Make up the type of company and a product that you think fits the values of m and b that you have chosen in Question 1, and briefly describe the company and product. (There is no wrong

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answer except to not answer the question. Be creative in developing your scenario, but do not

overdo it.)

  1. Important: By Wednesday night at midnight, submit in a Word document only your name and your chosen values for m and b. Submit this in the Unit 4 submissions area. This submitted Word document will be used to determine the Last Day of Attendance for government reporting purposes.

  2. Choose five values of x < 50, and calculate the corresponding values of ̅( ). Display these x and

̅( ) values in a t-table. (Show all of your work details for these calculations. Please review this

Web site to see how to type mathematics using the keyboard symbols.)

  1. Using Excel or another graphing utility, draw the graph of your average cost function, as follows:

    ̅

  2. What happens to your average cost rational function when x gets very large? Explain your answer.

  3. How many items must be produced before the average cost is 1.5 times your chosen value of m? (Show all of your work.)

  4. Describe the transformations of the rational function ( ) that will result in your average cost function. (Hint: What transformation types are used to get from ( ) to ( )

    ( )?)

  5. Does your average cost function have a horizontal asymptote? If so, what is that horizontal asymptote equation? (Explain your answer.)

  6. Which intellipath Learning Nodes helped you with this problem?

 

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