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Section 3.4 Continuous Growth and the Number e. Let’s say you just won $1000 that you would like to invest. You have the choice of three different accounts:

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Presentation on theme: "Section 3.4 Continuous Growth and the Number e. Let’s say you just won $1000 that you would like to invest. You have the choice of three different accounts:"— Presentation transcript:

1 Section 3.4 Continuous Growth and the Number e

2 Let’s say you just won $1000 that you would like to invest. You have the choice of three different accounts: –Account 1 pays 12% interest each year –Account 2 pays 6% interest every months (this is called 12% compounded semi-annually) –Account 3 pays out 1% interest every month (this is called 12% compounded monthly) Do all the accounts give you the same return after one year? What about after t years? If not, which one should you choose?

3 If an annual interest r is compounded n times per year, then the balance, B, on an initial deposit P after t years is For the last problem, figure out the growth factors for 12% compounded annually, semi- annually, monthly, daily, and hourly –We’ll put them up on the board –Also note the nominal rate versus the effective rate The nominal rate for each is 12%

4 Now let’s look at continuously compounded We get Find the growth rate for 12% –How does it compare to our previous growth rates? Find the formula for our $1000 compounded continuously for t years

5 Now 2 < e < 3 so what do you think we can say about the graph of Q(t) = e t ? –What about the graph of f(t) = e -t It turns out that the number e is called the natural base –It is an irrational number introduced by Lheonard Euler in 1727 –It makes many formulas in calculus simpler which is why it is so often used

6 Consider the exponential function Q(t) = ae kt –Then the growth rate (or decay rate) is e k So from y = ab t, b = e k –If k is positive then Q(t) is increasing and k is called the continuous growth rate –If k is negative then Q(t) is decreasing and k is called the continuous decay rate Note: for the above cases we are assuming a > 0

7 Example Suppose a lake is evaporating at a continuous rate of 3.5% per month. –Find a formula that gives the amount of water remaining after t months –What is the decay factor? –By what percentage does the amount of water decrease each month?

8 Example Suppose that $500 is invested in an account that pays 8%, find the amount after t years if it is compounded –Annually –Semi-annually –Monthly –Continuously Find the effective rate for 8% compounded annually In your groups try problems 3, 11, and 16

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