Lesson 3.6 (Continued) Graphing Exponential Functions 1 3.4.2: Graphing Exponential Functions.
3.1 Exponential Functions - Mr. Upright at Jordan High School...3 Graphing the natural base...
Transcript of 3.1 Exponential Functions - Mr. Upright at Jordan High School...3 Graphing the natural base...
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Sketch the graph of f(x) and find the requested information
π π₯ = 3π₯
Domain:
Range:
y-intercept:
Asymptote:
End behavior:
Increasing:
Decreasing:
Sketch the graph of f(x) and find the requested information
π π₯ = 2βπ₯
Domain:
Range:
y-intercept:
Asymptote:
End behavior:
Increasing:
Decreasing:
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Domain: Range:
y-intercept: x-intercept:
Extrema: Asymptote:
End behavior:
Continuity:
What is an exponential function?
Domain: Range:
y-intercept: x-intercept:
Extrema: Asymptote:
End behavior:
Continuity:
Transformations of exponential functions Using the rules we have already learned, describe the
following transformations given that π π₯ = 2π₯ is the parent function.
a) π π₯ = 2π₯+1
b) β π₯ = 2βπ₯
c) π π₯ = β3(2π₯)
d) π π₯ = 2π₯ β 2
Natural Base exponential functionMost real world applications donβt use base 2 or base 10, but instead use an irrational number called e.
e is
π = limπ₯ββ
1 +1
π₯
π₯
π π₯ = ππ₯ is called the natural base exponential function.
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Graphing the natural base exponential
Using a graphing calculator, graph:
a) π π₯ = ππ₯
b) a π₯ = π4π₯
c) b π₯ = πβπ₯ + 3
d) π π₯ =1
2ππ₯
Real world applications: compound interest Suppose an initial principle P is invested into an account with an
annual interest rate r, and the interest rate is compounded or reinvested annually. At the end of each year, the interest earned is added to the account balance. The sum is the new principle for the next year.
To allow for quarterly, monthly, or even daily compoundings, let n be the
The rate per compounding is:
The number of compoundings after t years is:
So the equation becomes:
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Krysti invests $300 in an account with a 6% interest rate, making no other deposits or withdrawals. What will Krystiβs account balance be after 20 years if the interest is compounded:
a) Semi-annually:
b) Monthly:
c) Daily:
Financial literacy: your turn1. If $10,000 is invested in an online savings account earning
8% per year, how much will be in the account at the end of10 years if there are no other deposits or withdrawals and interest is compounded:
a) Semiannually?
b) Quarterly?
c) Daily?
How does n affect account balance?Compounding n
π¨ = πππ π +π. ππ
ππππ
Annually 1
Semiannually 2
Quarterly 4
Monthly 12
Daily 365
Hourly 8760
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Continuous compound interest Suppose to compound continuously so that there is no
waiting period between interest payments.
π΄ = ππππ‘
Suppose Krysti finds an account that will allow her to invest her $300 at a 6% rate compounded continuously. If there are no other deposits or withdrawals, what will Krystiβs account balance be after 20 years?
If $10,000 is invested in an online savings account earning 8% per year compounded continuously, how much will be in the account at the end of 10 years if there are no other deposits or withdrawals?
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Exponential growth or decay Exponential growth and decay models apply to any situation where
growth is proportional to the initial size of the quantity being considered.
Rate r or k must be expressed as a decimal.
Mexico has a population of approximately 110 million. If Mexicoβs population continues to grow at the described rate, predict the population of Mexico in 10 and 20 years.
a) 1.42% annually
b) 1.42% continuously
π = π0(1 + π)π‘
π = π0πππ‘
The population of a town is declining at a rate of 6%. If the current population is 12,426 people, predict the population in 5 and 1o years using each model.
a) Annually
b) Continuously
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Exponential Modeling The table shows the number of reported cases of chicken pox in the US in 1980 and 2005.
a) If the number of reported cases of chicken pox is decreasing at an exponential rate, identify the rate of decline and write an exponential equation to model this situation
b) Use your model to predict when the number of cases will drop below 20,000.
Use the data in the table and assume that the population of Miami-Dade County is growing exponentially.
A. Identify the growth and write an exponential equation to model this growth.
B. Use your model to predict in which year the population of Miami-Dade County will surpass 2.7 million.
Through Word Problem p70 #44, 45, 56-58
Through Graphing p166 #2-10 Even
Through Transforming p166 #12-20 Even
Through Interest p166 #22-26 Even
Through Growth/Decay p166 #28-40 Even