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Notes Over 5.1

Notes Over 5.1. Graphing Exponential Functions. Graph both functions on the same graph. A larger base makes it increase faster. Notes Over 5.1. Graphing Exponential Functions. Graph both functions on the same graph. A larger base makes it decrease faster. Notes Over 5.1.

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Notes Over 5.1

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  1. Notes Over 5.1 Graphing Exponential Functions Graph both functions on the same graph. A larger base makes it increase faster.

  2. Notes Over 5.1 Graphing Exponential Functions Graph both functions on the same graph. A larger base makes it decrease faster.

  3. Notes Over 5.1 Graphing Exponential Functions 3. Compare the graphs both functions in Example 1 and 2. Reflects over the y-axis Reflects over the y-axis Domain: Range: y-int: Inc/Dec: asymp: Contin:

  4. Notes Over 5.1 Transformations of Exponential Functions Graph the transformation of the function. Move curve 2 units to the right and 4 units up All real numbers Domain: Range: Asymptote:

  5. Notes Over 5.1 Transformations of Exponential Functions Use the graph of f to describe the transformation that yields the graph of g. Reflect over x-axis, move curve 4 units to the left and 3 units down

  6. Notes Over 5.1 Evaluating the Natural Exponential Function Use a calculator to evaluate each expression.

  7. Notes Over 5.1 Graphing Natural Exponential Functions Graph both functions on the same graph. The first is increasing while the second is decreasing.

  8. Notes Over 5.1 Compound Interest Continuous Compounding Modeling Exponential Growth P is initial amount t is the time period r is the growth rate n is the number of times per year P is initial amount t is the time period r is the growth rate

  9. Notes Over 5.1 Modeling Exponential Growth 9. A customer purchases a television set for $800 using a credit card. The interest is charged on any unpaid balance at a rate of 18% per year compounded monthly. If the customer makes no payment for one year, how much is owed at the end of the year? $800 18% compounded monthly one year The customer would owe $956.49.

  10. Notes Over 5.1 Modeling Exponential Growth 15 10. 15 monkeys were released into a reserve. If they increase at a rate of 20% compounded continuously, how many monkeys will be in the reserve in 5 years, 10 years, and 15 years? 20% compounded continuously 5 years

  11. Notes Over 5.1

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