Download 10.3 Compound Interest

10.3 Compound Interest
What SIMPLE INTEREST looks like:
I have $500. I put it in an account earning 8% annual interest. After 10 years it is worth:
F =500(1 + .08(10))
𝑭 = 𝑷(𝟏 + 𝒓𝒕)
F = 900
$900.00
What COMPOUND INTEREST looks like:
I have $500. I put it in an account earning 8% interest compounded annually.
Compounding annually means that I earn interest at the end of each year.
After 1 year:
F =500(1.08) = $540
After 2 years:
F =500(1.08)(1.08) = 540(1.08)=$583.20
After 3 years:
F =500(1.08)(1.08)(1.08) = $583.20(1.08) =$629.86
After N years:
F =500(1.08)N
After 10 years:
F =500(1.08)10 = $1079.46
Because you are earning interest on both your principle and
interest on your interest, compounding causes you to earn
more money (or owe more money) in the long run than simple
interest.
Periodic Interest Rate: p
Periodic interest is how much interest you are charged/you earn per
compounding period.
r = APR (annual percentage rate)
m = number of compounding periods per year
𝒓
𝒑=
𝒎
Common Compounding Periods:
Term
annually
semiannually
quarterly
monthly
daily
continuously
Number of Times Interest
Paid/Charged Per Year
1
2
4
12
365 or 360
?
Example:
If your account has an 8% APR, you would earn: Compounded annually _______ , _______ times per year
Compounded quarterly _______, _______ times per year
Compounded monthly _______, _______ times per year
Total Number of Compounding Periods: T
m = number of compounding periods per year
t = number of years
Example: Compounded annually for 5 years T = _____
Compounded monthly for 3 years T = _____
T = mt
Compounded daily for 2 years T = _____
1
Compound Interest Formula
P = principal
F = future value
r = annual interest rate
t = time of investment, in years
m = number times compounded per year
p = periodic interest rate =
𝑟
𝑚
T = total compounding periods = 𝑚𝑡
𝑭 = 𝑷(𝟏 + 𝒑)𝑻
“Continuously
Compounded” Interest
P = principal
F = future value
r = annual interest rate
t = time of investment, in years
𝑭 = 𝑷𝒆𝒓𝒕
1)
You invest $758 in an account earning 5.9% APR compounded annually. How much is the investment
worth after 10 years?
2)
You invest $4000 in an account earning 6.4% APR compounded quarterly. How much is the investment
worth after 8 years?
3)
You invest $350.82 in an account earning 9.5% APR compounded continuously. How much is the
investment worth after 5 years?
APY: Annual Percentage Yield (Effective Rate)
Your friend offers to loan you money at 6% annual interest. The bank offers a loan at 5.8% APR
compounded monthly. Which is a better deal?
What would a dollar ($1.00) be worth at the end of year?
Borrow from friend:
Borrow from bank:
2
Annual Percentage Yield (APY)/Effective Rate
m = number times compounded per year
r = annual interest rate
𝑟
p = periodic interest rate =
𝑚
𝑨𝑷𝒀 = (𝟏 + 𝒑)𝒎 − 𝟏 or 𝑨𝑷𝒀 = 𝒆𝒓 − 𝟏
4)
Find the APY
a) 5.9% APR compounded annually
b) 6.4% APR compounded quarterly
c) 9.5% APR compounded continuously
5)
Which is the best investment?
Option 1:
Option 2:
Option 3:
7% compounded annually
6.8% compounded monthly
6.5% compounded continuously?
3
Geometric Sequence:
10.4 Geometric Sequences
A Geometric Sequence starts with an initial term, P, and then
multiplies every term that follows by a common ratio, c.
Example:
5, 10, 20, 40, 80, ….
Generically:
𝑃, 𝑃𝑐, 𝑃𝑐 2 , 𝑃𝑐 3 , 𝑃𝑐 4 , …
Example 1:
𝑃 = 500
𝐺0 = 𝑃
𝑐
the initial (starting) term
the common ratio
Recursive Formula:
𝐺𝑁 = 𝐺𝑁−1 ∙ 𝑐
Explicit Formula:
𝐺𝑁 = 𝑃 ∙ 𝑐 𝑁
𝑐 = 1.08
𝐺0 = 500
𝐺1 = 500(1.08) = 540
𝐺2 = 500(1.08)2 = 583.20
𝐺3 = 500(1.08)3 = 629.86
What is 𝐺10 =?
Example 2:
Your rent is currently $700 per month. You read in a local newspaper that due to changes in
the housing market, rents in the area are expected to increase by approximately 5% per year. If you stay in
your apartment for 5 years, what should you expect to pay for rent?
Example 3:
You buy a new car for $21,000. On the way home you hear Dave Ramsey on the radio saying
new cars are a bad purchase because they depreciate in value on average by 18% per year. If this is true, what
will your car be worth in 6 years?
Example 4:
A new infectious disease X26 has been discovered and there is no current vaccine or
treatment. The Center for Disease Control estimates that until a vaccine becomes available, that the virus will
spread at a 25% annual rate of growth. The CDC currently is tracking 1000 known cases of X26. How many
new cases will occur each year over the next 3 years? What if it takes 10 years to develop a vaccine
4
Example 4 (CONTINUED):
A new infectious disease X26 has been discovered
and there is no current vaccine or treatment. The Center for Disease Control estimates that
until a vaccine becomes available, that the virus will spread at a 25% annual rate of growth.
The CDC currently is tracking 1000 known cases of X26. How many new cases will occur
each year over the next 3 years? What if it takes 10 years to develop a vaccine?
Sum of the Terms in Geometric
Sequence:
𝐺0 = 𝑃
𝑐
the initial (starting) term
the common ratio
 cN 1 
Sum = P 

 c 1 
Example 3:
Find the sum of the following geometric sequences
a) $400 1.042  $400 1.042  $400 1.042   ...  400 1.042 
2
3
b) $250  0.85  $250  0.85  $250  0.85  ...  250  0.85
2
3
36
24
5