Example 1 | Example 2

 

The amount of simple interest is determined by the formula I = Prt

where:

I is the amount of interest earned (in dollars)

P is the principal sum of money earning interest (in dollars)

r is the annual interest rate (a decimal)

t is the time period (in years)

Examples:

1. Ross just sold his old computer for $750 and had decided to put the money in a bank that is paying 9.25% interest. If he leaves his money for 4 years how much interest will he have made?

a) Convert r to a decimal

9.25% ------> 0.0925

b) Use the interest formula to solve for I

I = Prt

I = ($750)(0.0925)(4)

I = $277.50

Ross will have earned $277.50 in interest in the four years.

2. 250 days ago, Olga invested some money that she has been saving for a trip to Columbia. If she earned $256.25 in interest at a rate of 10.25 %, how much money did she originally invest?

a) Manipulate the simple interest formula to solve for P

I=Prt	------->	P	=	_I_
				rt

b) Convert r to a decimal

10.25% ------> 0.1025

c) Convert t into years

250 Days	------->	250
		365

d) Use your formula to solve for P

P	=	_I_
		rt

P	=	_($ 256.25)_
		(0.0125) (250)
		(365 )

P =$ 3650.00

Olga originally invested $3650.00

 

Mini Lessons

 

Compound Interest

 

Example 1 | Example 2

 

The amount of compound interest is determined by the formula

A = P(1 + i) n

Where:

A is the accumulated value (in dollars)

P is the principal (in dollars)

i is the periodic interest rate (a decimal)

n is the number of compounding periods

Examples:

1. Rebecca is a seamstress who just opened her first shop. She has decided to invest her first $2000 in an account for her retirement where interest is compounded annually at 10.5%. If Rebecca plans to work for 35 years, how much money will she have in that account when she retires?

a) Convert r to a decimal

10.5% ------> 0.105

b) Use the formula to solve for A

A = P(1 + i) n

A = $2000(1 + 0.105) 35

A = $2000(1.105) 35

A = $2000(32.9367)

A = $65 873.35

When Rebecca retires in 35 years, she will have $65 873.35 in her account.

2. Keith wants to buy a grand piano when he finishes his masters degree in 3 years. He has found a bank that will give him an interest rate of 12% compounded annually. If he will need $15 000 for the piano, how much does he need to invest now?

a) Convert r to a decimal

12% ------> 0.12

b) Change the formula to solve for P

A = P(1 + i) n

P

=

____A___ (1 + i ) n

c) Solve the equation for P

P

=

_$15 000 (1+0.12) 3

P

=

_$15 000 (1.12 ) 3

P

=

$15 000 1.4049

P

=

$ 10 0676.70

Keith will need to invest $ 10 0676.70 now if he wants to have $15 000 in 3 years.

Top of Page

Mini Lessons