Understanding Key Features of Exponential Functions

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Learn about the key characteristics of exponential functions, such as growth, decay, asymptotes, and y-intercepts. Explore the concept with examples and graphs, including the fascinating case of the U.S.S. Arizona oil leakage. Dive into the world of exponential functions in this informative lesson.

  • Exponential Functions
  • Growth
  • Decay
  • Asymptotes
  • Y-intercepts
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  1. Lesson 3.6 Key Features of Exponential Functions http://youtu.be/FSX1U8u7eb4 http://youtu.be/JiaSTKYz2Vg

  2. U.S.S. Arizona Oil-Leakage On December 6, 1941, the USS Arizona took on a full load of fuel nearly 1.5 million gallons in preparation for its scheduled trip to the mainland later that month. The next day, much of it fed the explosion and subsequent fires that destroyed the ship following its attack by Japanese bombers. However, despite the raging fire and ravages of time, some 500,000 gallons are still slowly seeping out of the ship s submerged wreckage. Nearly 70 years after its demise, the USS Arizona continues to spill up to 9 quarts of oil into the harbor each day. The oil is often referred to the Tears of Arizona or Black Tears .

  3. U.S.S. Arizona Oil-Leakage We can take the data from the oil leakage and make a table and a graph from it. The type of graph that this data will make is what we call in math an Exponential Decay . Time (years) Annual Oil Leakage (quarts) 1941 4,000,000 1990 3,650 2006 3,468 2009 730

  4. Lesson 3.6a Key Features of Exponential Functions Concept: Characteristics of Exponential Functions Lesson EQ: How do we identify the key features of an exponential function? (Standard F.IF.4) Vocabulary: Growth Decay Asymptote y-intercept

  5. Exponential Functions General form ? ? = ???+ ? a = initial value that determines the shape a > 1 stretch; a < 1 shrink; -a = reflection b = growth if the value is > 1 b = decay if the value is between 0 and 1 k = horizontal asymptote & vertical shift

  6. Example: ? ? = ?? a = _____ Reflection? ______ b = _____ Growth or Decay? _________

  7. Asymptote Line that a graph approaches but nevertouches. Example: ? ? = ?? k = _____ Horizontal asymptote is the line y = _____

  8. y-intercept The point where the graph crosses the y-axis. The value of x is 0 at this point. Example: ? ? = ?? Substitute 0 for x and solve to find the y-intercept. y-intercept = _________

  9. Sketch of Graph Example: ? ? = ?? Not a reflection Growth Asymptote: y = 0 y-intercept: (0,1)

  10. ? ? ? Example: ? ? = a = _____ Reflection? ______ b = _____ Growth or Decay? _________ k = _____ Horizontal Asymptote y = _____ y-intercept ______

  11. Sketch of Graph Example: ? ? = ? ? Not a reflection Decay Asymptote: y = 0 y-intercept: (0,1) ?

  12. Example: ? ? = ??+ ? a = _____ Reflection? ______ b = _____ Growth or Decay? _________ k = _____ Horizontal Asymptote y = _____ y-intercept ______

  13. Sketch of Graph Example: ? ? = ??+ ? Not a reflection Growth Asymptote: y = 1 y-intercept: (0,2)

  14. Example: ? ? = ?(?)?+ ? a = _____ Reflection? ______ b = _____ Growth or Decay? _________ k = _____ Horizontal Asymptote y = _____ y-intercept ______

  15. Sketch of Graph Example: ? ? = ?(?)?+ ? A reflection Decay Asymptote: y = 3 y-intercept: (0,2)

  16. Guided Practice Example 1 Create a table of values for the exponential function f(x) = 2xand graph. State whether it s a growth or decay and identify the key features. 16 3.4.2: Graphing Exponential Functions

  17. Guided Practice: Example 1, continued 1. Identify the asymptote of the function. The asymptote of the function is a line that a graph approaches but never touches. In the general form ? ? = ???+ ? the horizontal asymptote is always the constant, k. In the function f(x) = 2x, the value of k is 0. The horizontal asymptote of the function is y = 0. 17 3.4.2: Graphing Exponential Functions

  18. Guided Practice: Example 1, continued 3. Determine the y-intercept of the function. The y-intercept is where the graph crosses the y- axis. The value of x is 0 at this point. Substitute 0 for x and solve to find the y- intercept. y-intercept = (0, 1) It can also be seen in the table that when x = 0, f(x) =1. 18 3.4.2: Graphing Exponential Functions

  19. Guided Practice: Example 1, continued 1. Create a table of values. Choose values of x and solve for the corresponding values of f(x). ? ? = 2? Growth or Decay? x f(x) 2 1 0 1 2 19 3.4.2: Graphing Exponential Functions

  20. Guided Practice: Example 1, continued 4. Graph the function. Use the table of values to create a graph of the function. ? ? = 2? x f(x) .25 .50 1 2 4 2 1 0 1 2 20 3.4.2: Graphing Exponential Functions

  21. Guided Practice: Example 1, continued 5. State the Domain and Range of the function. The domain is all x-values. Domain = all real numbers because any number can be used as x. The range is all y-values. Range = all numbers > asymptote. y > 0 21 3.4.2: Graphing Exponential Functions

  22. Guided Practice: Example 1, continued 6. Describe the end behavior of the graph. The end behavior is what happens at the ends of the graph. Exponential functions have 2 end behaviors. One towards + or - infinity and the one towards the horizontal asymptote. As x + , y + As x - , y 0 22 3.4.2: Graphing Exponential Functions

  23. Guided Practice Example 2 Create a table of values for the exponential function 1 2 decay and identify the key features. ?and graph. State whether it s a growth or ? ? = 23 3.4.2: Graphing Exponential Functions

  24. Guided Practice: Example 2, continued 1. Create a table of values. Choose values of x and solve for the corresponding values of f(x). ? ? = ? 1 2 Growth or Decay? x f(x) 2 1 0 1 2 24 3.4.2: Graphing Exponential Functions

  25. Guided Practice: Example 2, continued 2. Graph the function. Use the table of values to create a graph of the function. ? 1 2 ? ? = x f(x) 4 2 1 .5 .25 2 1 0 1 2 25 3.4.2: Graphing Exponential Functions

  26. ? 1 2 Example 2: ?(?) = Horizontal Asymptote: y-intercept: Domain: All real #s Range: End behavior: As x + , y As x - , y

  27. Guided Practice: Example 1, continued play-button-lg.png 27 27 3.4.2: Graphing Exponential Functions

  28. Think/Pair/Share Between you and your partner, who has the longest hair? This person is the 2 2s explain to the 1s how they can tell if it is a growth or decay. 1s explain to the 2s how to find the y- intercept and asymptote. 2s explain to the 1s the domain and range. 1s explain to the 2s the end behavior.

  29. Your turn For each problem graph the function and identify the y-intercept, asymptote, domain and range, and end behavior. 1. ?(?) = 3? ? 1 4 2. ?(?) =

  30. 1. f(x) = 3x Asymptote: y-intercept: Domain: Range: End behavior:

  31. ? 1 4 2. ?(?) = Asymptote: y-intercept: Domain: Range: End behavior:

  32. Guided Practice Example 3 Create a table of values for the exponential function ? ? = 3?+1 and graph. State whether it s a growth or decay and identify the key features. 32 3.4.2: Graphing Exponential Functions

  33. Guided Practice: Example 3, continued 1. Create a table of values. Choose values of x and solve for the corresponding values of f(x). ? ? = 3?+ 1 Growth or Decay? x f(x) 2 1 0 1 2 33 3.4.2: Graphing Exponential Functions

  34. Guided Practice: Example 3, continued 2. Graph the function. Use the table of values to create a graph of the function. ? ? = 3?+ 1 x f(x) 10/9 4/3 2 4 10 2 1 0 1 2 34 3.4.2: Graphing Exponential Functions

  35. Example 3: ? ? = 3?+ 1 Horizontal Asymptote: y-intercept: Domain: All real #s Range: End behavior: As x + , y As x - , y

  36. Summarizing Strategy: Example for Absent friend Your absent friend needs you to show them an example of what they missed. Choose 3 of the following 5 features to identify for this exponential function: f(x) = 3x 2 Asymptote y-intercept Domain Range End Behavior

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