1. Percents

2. Understanding Percents
A percent shows a part of a whole.
Remember
Fractions: the denominator tells how many parts a whole is divided into. (Any whole number except for zero can be a denominator.)
Decimals: a whole is divided into tenths, hundredths, thousandths, & so on.
Percent: the whole is always divided into 100 parts. The word percent means “by the hundred or per one hundred.”
Percent is shown with the sign %.

3. Example Answer each question
The Rodriguez family has paid off 75% of their mortgage. What percent of the mortgage do they still have to pay?
Serena makes four times what she made when she first got out of school. Her income now is what percent of her income when she first left school?

4. Group Work Answer each question.
One evening during a flu epidemic, 30% of Marla’s students were absent from her exercise class. What percent of the students came to class?
The current population of Eastport is three times what it was in The population now is what percent of the 1960 population?

5. Decimals to Percents
To change a decimal to a percent, move the decimal point two places to the right and write the percent sign (%).
If the decimal point moves to the end of the number, it is not necessary to write it.
You may have to add zeros.

6. Example
Write each decimal as a percent
0.32
0.005
0.125

7. Group Work
Write each decimal as a percent
0.09
0.0375
0.2

8. Percents to Decimals
To change a percent to a decimal, drop the percent sign (%) and move the decimal point two places to the left.
You may have to add zeros.

9. Example
Write each percent as a decimal.
62 ½% 7%
200%

10. Group Work
Write each percent as a decimal.
6 2/3%
1.5% 8%

11. Fractions to Percents
There are two ways to change a fraction to a percent:
Method 1: Multiply fraction by 100%
Method 2: Divide the denominator of the fraction into the numerator and move the point two places to the right.

12. Example Write each fraction as a percent. 1 4 25 2 1 6 3
Method 1: Multiply fraction by 100%
Method 2: Divide the denominator of the fraction into the numerator and move the point two places to the right. 3 7

13. Group Work
Write each fraction as a percent. 1 3 10 2 4 5 3 1 8

14. Percents to Fractions
To change a percent to a fraction, write the percent as a fraction with 100 as the denominator and reduce.

15. Example
Write each percent as a common fraction.
8 1/3% 4%
80%

16. Group Work Write each percent as a common fraction. 66 2/3% 12% 90%
3/25
9/10

17. Identifying the Percent, the Whole, and the Part & Finding the Part
In a percent problem the percent is easy to identify. It has the % sign.
The word of suggests multiplication. The word that follows of is usually the whole.
The verb is suggests the = sign. The product of multiplying the percent times the whole is the part.
percent x whole = part
To multiply by a percent, first change the percent to a decimal or a fraction.

18. Example
Identify the percent, part, and whole for each of the following:
1.8% of 753 is
50% of 88 is 44
Solve.
75% of 48 =
1.2% of 800 =

19. Group Work
Identify the percent, part, and whole for each of the following:
12 is 25% of 48
On a test with 20 problems, Maxim got 75% right. He got 15 problems right.
Solve.
12.5% of 56 =
Mr. and Mrs. Caruso make $32,500 a year. They put 12% of their income into a retirement plan. How much do they put in their retirement plan in a year?

20. Using Proportion to Find the Part
There is not single way to solve percent problems. When using this method you do not need to change the percent to a decimal. The proportions method:
Part
Whole %
100 =

21. Example Solve. 6% of 250 = 75% of 84 = 12 is what percent of 48?
What percent of 32 is 16?
60% of what number is 27?

22. Group Work Solve. 60% of 380 = 15% of 7,000 =
14 is what percent of 21?
What percent of 45 is 36?
12 ½% of what number is 8?

23. Multi-Step Problems
In some percent problems, you have to use two operations to find an answer.
First find a percent of a number.
Then add or subtract this new amount with the original amount in the problem.

24. Example
Read each problem carefully to decide if you need to add or subtract.
Selma makes $560 a week. Her employer takes out 15% of her pay for taxes and Social Security. How much does Selma take home each week?
Frank took a math test with 40 problems. He got 85% of the problems right. How many problems did he get wrong?

25. Group Work
Read each problem carefully to decide if you need to add or subtract.
Don bought tapes for $ The sales tax in his state is 5%. How much did the tapes cost including sales tax?
In June Petra’s phone bill was $ In July her bill was 30% more because of long distance calls. How much was her July phone bill?

26. Interest
Interest is money someone pays for using someone else’s money. A bank pays you interest for using your money in a savings account. You pay a bank interest for using the bank’s money on a loan.
To find interest, multiply the principal by the rate by the time.
The principal is the money you borrow or save.
The rate is the percent of the interest
The time is the number of years

27. Example Find the interest for each of the following.
$800 at 6% annual interest for one year.
$360 at 3.5% annual interest for 1 year 4 months

28. Group Work Find the interest for each of the following.
$600 at 3.5% annual interest for one year.
$450 at 4.8% annual interest for one year.
$2,400 at 10% annual interest for 1 year 8 months.
$3,600 at 9% annual interest for 1 year 9 months