6 percentages, conversion between fractions, decimals and percentages
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Percentages
Back to Algebra–Ready Review Content.
PercentagesA percentage specified “how many out of per 100” and it’s written as #% or . #
100
PercentagesA percentage specified “how many out of per 100” and it’s written as #% or .
1% = 1 out of 1001 percent = 1/100
#100
PercentagesA percentage specified “how many out of per 100” and it’s written as #% or .
1% = 1 out of 1001 percent = 1/100
#100
It’s useful think of % as the ratio of pennies to 1$, e.g. 1¢ is 1% of $1 (100 ¢).
PercentagesA percentage specified “how many out of per 100” and it’s written as #% or .
1% = 1 out of 1001 percent = 1/100
#100
5% = 5 out of 1005 percent = 5/100 = 1/20
PercentagesA percentage specified “how many out of per 100” and it’s written as #% or .
1% = 1 out of 1001 percent = 1/100
#100
5% = 5 out of 1005 percent = 5/100 = 1/20
10% = 10 out of 10010 percent = 10/100 = 1/10
PercentagesA percentage specified “how many out of per 100” and it’s written as #% or .
1% = 1 out of 1001 percent = 1/100
#100
5% = 5 out of 1005 percent = 5/100 = 1/20
10% = 10 out of 10010 percent = 10/100 = 1/10
25% = 25 out of 10025 percent = 25/100 = 1/4
PercentagesA percentage specified “how many out of per 100” and it’s written as #% or .
1% = 1 out of 1001 percent = 1/100
#100
5% = 5 out of 1005 percent = 5/100 = 1/20
50% = 50 out of 100 = 50 percent = 50/100 = 1/2
10% = 10 out of 10010 percent = 10/100 = 1/10
25% = 25 out of 10025 percent = 25/100 = 1/4
PercentagesA percentage specified “how many out of per 100” and it’s written as #% or .
1% = 1 out of 1001 percent = 1/100
#100
5% = 5 out of 1005 percent = 5/100 = 1/20
50% = 50 out of 100 = 50 percent = 50/100 = 1/2
10% = 10 out of 10010 percent = 10/100 = 1/10
25% = 25 out of 10025 percent = 25/100 = 1/4
100% = 100 out of 100100 percent = 100/100 = 1.
Example A. What is ¾ of $100?
The expression “a fractional of the total..” means to divide the total into equal parts indicated by the denominator, then retrieve the number of parts indicated by the numerator.
Percentages
Example A. What is ¾ of $100?
The expression “a fractional of the total..” means to divide the total into equal parts indicated by the denominator, then retrieve the number of parts indicated by the numerator.
34 Divide $100 into
4 equal parts.
Percentages
Example A. What is ¾ of $100?
The expression “a fractional of the total..” means to divide the total into equal parts indicated by the denominator, then retrieve the number of parts indicated by the numerator.
34 Divide $100 into
4 equal parts.
100 ÷ 4 = 25 so each part is 25,
Percentages
Example A. What is ¾ of $100?
The expression “a fractional of the total..” means to divide the total into equal parts indicated by the denominator, then retrieve the number of parts indicated by the numerator.
34 Divide $100 into
4 equal parts.
Take 3 parts. 100 ÷ 4 = 25 so each part is 25,
hence 3 parts is 3 x $25 = $75.
Percentages
Example A. What is ¾ of $100?
The expression “a fractional of the total..” means to divide the total into equal parts indicated by the denominator, then retrieve the number of parts indicated by the numerator.
34 Divide $100 into
4 equal parts.
Take 3 parts. 100 ÷ 4 = 25 so each part is 25,
So ¾ of $100 is $75.
hence 3 parts is 3 x $25 = $75.
Percentages
Example A. What is ¾ of $100?
The expression “a fractional of the total..” means to divide the total into equal parts indicated by the denominator, then retrieve the number of parts indicated by the numerator. We record this process with a division then a multiplication.
34 Divide $100 into
4 equal parts.
Take 3 parts. 100 ÷ 4 = 25 so each part is 25,
So ¾ of $100 is $75.
hence 3 parts is 3 x $25 = $75.
Percentages
Example A. What is ¾ of $100?
The expression “a fractional of the total..” means to divide the total into equal parts indicated by the denominator, then retrieve the number of parts indicated by the numerator. We record this process with a division then a multiplication.
34 Divide $100 into
4 equal parts.
Take 3 parts. 100 ÷ 4 = 25 so each part is 25,
So ¾ of $100 is $75. In symbols, 34 * 100
hence 3 parts is 3 x $25 = $75.
Percentages
Example A. What is ¾ of $100?
The expression “a fractional of the total..” means to divide the total into equal parts indicated by the denominator, then retrieve the number of parts indicated by the numerator. We record this process with a division then a multiplication.
34 Divide $100 into
4 equal parts.
Take 3 parts. 100 ÷ 4 = 25 so each part is 25,
So ¾ of $100 is $75. In symbols, 34 * 100
25hence 3 parts is 3 x $25 = $75.
Percentages
Example A. What is ¾ of $100?
The expression “a fractional of the total..” means to divide the total into equal parts indicated by the denominator, then retrieve the number of parts indicated by the numerator. We record this process with a division then a multiplication.
34 Divide $100 into
4 equal parts.
Take 3 parts. 100 ÷ 4 = 25 so each part is 25,
So ¾ of $100 is $75. In symbols, 34 * 100 = 75.
25hence 3 parts is 3 x $25 = $75.
Percentages
Example A. What is ¾ of $100?
The expression “a fractional of the total..” means to divide the total into equal parts indicated by the denominator, then retrieve the number of parts indicated by the numerator. We record this process with a division then a multiplication.
34 Divide $100 into
4 equal parts.
Take 3 parts. 100 ÷ 4 = 25 so each part is 25,
So ¾ of $100 is $75. In symbols,
The same steps of calculation apply for calculating “the #% of a total” andin such a problem, simplify the percent to a reduced fraction first.
34 * 100 = 75.
25hence 3 parts is 3 x $25 = $75.
Percentages
Example A. What is ¾ of $100?
The expression “a fractional of the total..” means to divide the total into equal parts indicated by the denominator, then retrieve the number of parts indicated by the numerator. We record this process with a division then a multiplication.
34 Divide $100 into
4 equal parts.
Take 3 parts. 100 ÷ 4 = 25 so each part is 25,
So ¾ of $100 is $75. In symbols,
The same steps of calculation apply for calculating “the #% of a total” andin such a problem, simplify the percent to a reduced fraction first.
34 * 100 = 75.
25hence 3 parts is 3 x $25 = $75.
Percentages
Example B. 45% of 60 pieces of candy are chocolates, how many is that?
Example A. What is ¾ of $100?
The expression “a fractional of the total..” means to divide the total into equal parts indicated by the denominator, then retrieve the number of parts indicated by the numerator. We record this process with a division then a multiplication.
34 Divide $100 into
4 equal parts.
Take 3 parts. 100 ÷ 4 = 25 so each part is 25,
So ¾ of $100 is $75. In symbols,
The same steps of calculation apply for calculating “the #% of a total” andin such a problem, simplify the percent to a reduced fraction first.
34 * 100 = 75.
25
4510045% is
hence 3 parts is 3 x $25 = $75.
Percentages
Example B. 45% of 60 pieces of candy are chocolates, how many is that?
Example A. What is ¾ of $100?
The expression “a fractional of the total..” means to divide the total into equal parts indicated by the denominator, then retrieve the number of parts indicated by the numerator. We record this process with a division then a multiplication.
34 Divide $100 into
4 equal parts.
Take 3 parts. 100 ÷ 4 = 25 so each part is 25,
So ¾ of $100 is $75. In symbols,
The same steps of calculation apply for calculating “the #% of a total” andin such a problem, simplify the percent to a reduced fraction first.
34 * 100 = 75.
25
4510045% is = 9
20
hence 3 parts is 3 x $25 = $75.
Percentages
÷5
÷5
Example B. 45% of 60 pieces of candy are chocolates, how many is that?
Example A. What is ¾ of $100?
The expression “a fractional of the total..” means to divide the total into equal parts indicated by the denominator, then retrieve the number of parts indicated by the numerator. We record this process with a division then a multiplication.
34 Divide $100 into
4 equal parts.
Take 3 parts. 100 ÷ 4 = 25 so each part is 25,
So ¾ of $100 is $75. In symbols,
The same steps of calculation apply for calculating “the #% of a total” andin such a problem, simplify the percent to a reduced fraction first.
34 * 100 = 75.
25
Example B. 45% of 60 pieces of candy are chocolates, how many is that?
4510045% is = 9
20 so “45% of 60” is 920
* 60
hence 3 parts is 3 x $25 = $75.
Percentages
÷5
÷5
Example A. What is ¾ of $100?
The expression “a fractional of the total..” means to divide the total into equal parts indicated by the denominator, then retrieve the number of parts indicated by the numerator. We record this process with a division then a multiplication.
34 Divide $100 into
4 equal parts.
Take 3 parts. 100 ÷ 4 = 25 so each part is 25,
So ¾ of $100 is $75. In symbols,
The same steps of calculation apply for calculating “the #% of a total” andin such a problem, simplify the percent to a reduced fraction first.
34 * 100 = 75.
25
45100
345% is = 9
20 so “45% of 60” is 920
* 60
hence 3 parts is 3 x $25 = $75.
Percentages
÷5
÷5
Example B. 45% of 60 pieces of candy are chocolates, how many is that?
divide 60 pieces into 20 groups so each group consists of 3 pieces
Example A. What is ¾ of $100?
The expression “a fractional of the total..” means to divide the total into equal parts indicated by the denominator, then retrieve the number of parts indicated by the numerator. We record this process with a division then a multiplication.
34 Divide $100 into
4 equal parts.
Take 3 parts. 100 ÷ 4 = 25 so each part is 25,
So ¾ of $100 is $75. In symbols,
The same steps of calculation apply for calculating “the #% of a total” andin such a problem, simplify the percent to a reduced fraction first.
34 * 100 = 75.
25
divide 60 pieces into 20 groups so each group consists of 3 pieces and 9 groups make 27 pieces
45100
345% is = 9
20 so “45% of 60” is 920
* 60 = 27
hence 3 parts is 3 x $25 = $75.
Percentages
÷5
÷5
Example B. 45% of 60 pieces of candy are chocolates, how many is that?
Example A. What is ¾ of $100?
The expression “a fractional of the total..” means to divide the total into equal parts indicated by the denominator, then retrieve the number of parts indicated by the numerator. We record this process with a division then a multiplication.
34 Divide $100 into
4 equal parts.
Take 3 parts. 100 ÷ 4 = 25 so each part is 25,
So ¾ of $100 is $75. In symbols,
The same steps of calculation apply for calculating “the #% of a total” andin such a problem, simplify the percent to a reduced fraction first.
34 * 100 = 75.
25
So 27 pieces are chocolates.
45100
345% is = 9
20 so “45% of 60” is 920
* 60 = 27
hence 3 parts is 3 x $25 = $75.
Percentages
÷5
÷5
Example B. 45% of 60 pieces of candy are chocolates, how many is that?
divide 60 pieces into 20 groups so each group consists of 3 pieces and 9 groups make 27 pieces
Following is a list of important simplified percentage, they are familiar because they are related to our coins: nickels, dimes, quarters, and the 50–cent pieces.
Percentages
Following is a list of important simplified percentage, they are familiar because they are related to our coins: nickels, dimes, quarters, and the 50–cent pieces.
Percentages
Following is a list of important simplified percentage, they are familiar because they are related to our coins: nickels, dimes, quarters, and the 50–cent pieces.
51005% =
Percentages
= 120
Following is a list of important simplified percentage, they are familiar because they are related to our coins: nickels, dimes, quarters, and the 50–cent pieces.
51005% =
Percentages
= 120
: one nickel is 1/20 of a dollar and 20 nickels is $1.
Following is a list of important simplified percentage, they are familiar because they are related to our coins: nickels, dimes, quarters, and the 50–cent pieces.
51005% =
Percentages
= 120
: one nickel is 1/20 of a dollar and 20 nickels is $1.
1010010% = = 1
10: one dime is 1/10 of a dollar and 10 dimes is $1.
Following is a list of important simplified percentage, they are familiar because they are related to our coins: nickels, dimes, quarters, and the 50–cent pieces.
51005% =
Percentages
= 120
: one nickel is 1/20 of a dollar and 20 nickels is $1.
1010010% = = 1
10: one dime is 1/10 of a dollar and 10 dimes is $1.
2510025% = = 1
4: one quarter is 1/4 of a dollar and 4 quarters is $1.
Following is a list of important simplified percentage, they are familiar because they are related to our coins: nickels, dimes, quarters, and the 50–cent pieces.
51005% =
Percentages
= 120
: one nickel is 1/20 of a dollar and 20 nickels is $1.
1010010% = = 1
10: one dime is 1/10 of a dollar and 10 dimes is $1.
2510025% = = 1
4: one quarter is 1/4 of a dollar and 4 quarters is $1.
5010050% = = 1
2: one 50–cent piece is 1/2 of a dollar and 2 of them is $1,
Following is a list of important simplified percentage, they are familiar because they are related to our coins: nickels, dimes, quarters, and the 50–cent pieces.
51005% =
Percentages
= 120
: one nickel is 1/20 of a dollar and 20 nickels is $1.
1010010% = = 1
10: one dime is 1/10 of a dollar and 10 dimes is $1.
2510025% = = 1
4: one quarter is 1/4 of a dollar and 4 quarters is $1.
5010050% = = 1
2: one 50–cent piece is 1/2 of a dollar and 2 of them is $1,
100100and 100% = = 1, 200
100200% = = 2, etc..
Following is a list of important simplified percentage, they are familiar because they are related to our coins: nickels, dimes, quarters, and the 50–cent pieces.
It’s useful to think of percentages of multiples of 5 as counting nickels where one nickel is $1/20.
51005% =
Percentages
= 120
: one nickel is 1/20 of a dollar and 20 nickels is $1.
1010010% = = 1
10: one dime is 1/10 of a dollar and 10 dimes is $1.
2510025% = = 1
4: one quarter is 1/4 of a dollar and 4 quarters is $1.
5010050% = = 1
2: one 50–cent piece is 1/2 of a dollar and 2 of them is $1,
100100and 100% = = 1, 200
100200% = = 2, etc..
Following is a list of important simplified percentage, they are familiar because they are related to our coins: nickels, dimes, quarters, and the 50–cent pieces.
It’s useful to think of percentages of multiples of 5 as counting nickels where one nickel is $1/20. For example, 35% = 7/20 because there are 7 nickels in 35 cents, or that 85% = 17/20 because there are 17 nickels in 85 cents.
51005% =
Percentages
= 120
: one nickel is 1/20 of a dollar and 20 nickels is $1.
1010010% = = 1
10: one dime is 1/10 of a dollar and 10 dimes is $1.
2510025% = = 1
4: one quarter is 1/4 of a dollar and 4 quarters is $1.
5010050% = = 1
2: one 50–cent piece is 1/2 of a dollar and 2 of them is $1,
100100and 100% = = 1, 200
100200% = = 2, etc..
Following is a list of important simplified percentage, they are familiar because they are related to our coins: nickels, dimes, quarters, and the 50–cent pieces.
It’s useful to think of percentages of multiples of 5 as counting nickels where one nickel is $1/20. For example, 35% = 7/20 because there are 7 nickels in 35 cents, or that 85% = 17/20 because there are 17 nickels in 85 cents.
51005% =
Percentages
= 120
: one nickel is 1/20 of a dollar and 20 nickels is $1.
1010010% = = 1
10: one dime is 1/10 of a dollar and 10 dimes is $1.
2510025% = = 1
4: one quarter is 1/4 of a dollar and 4 quarters is $1.
5010050% = = 1
2: one 50–cent piece is 1/2 of a dollar and 2 of them is $1,
100100and 100% = = 1, 200
100200% = = 2, etc..
Other useful approximate percentages in fractions are33% ≈ 1/3 and that 66% ≈ 2/3.
PercentagesWe may use percentages to indicate the “concentration” of specific groups in a larger population.
PercentagesWe may use percentages to indicate the “concentration” of specific groups in a larger population.
Example C. 120 people who watched the movie “As the Paint Dries” are surveyed to see if they enjoyed it. a. 60% of 120 people enjoyed the movie, how many people is that?
PercentagesWe may use percentages to indicate the “concentration” of specific groups in a larger population.
Example C. 120 people who watched the movie “As the Paint Dries” are surveyed to see if they enjoyed it. a. 60% of 120 people enjoyed the movie, how many people is that?
60% = 60100 = 3
5
PercentagesWe may use percentages to indicate the “concentration” of specific groups in a larger population.
Example C. 120 people who watched the movie “As the Paint Dries” are surveyed to see if they enjoyed it. a. 60% of 120 people enjoyed the movie, how many people is that?
60% = x 120 =35
60100 = 3
5 , so 60% of 120 people is
PercentagesWe may use percentages to indicate the “concentration” of specific groups in a larger population.
Example C. 120 people who watched the movie “As the Paint Dries” are surveyed to see if they enjoyed it. a. 60% of 120 people enjoyed the movie, how many people is that?
60% = x 120 = 72.35, so 60% of 120 people is60
100 = 35
24
PercentagesWe may use percentages to indicate the “concentration” of specific groups in a larger population.
Example C. 120 people who watched the movie “As the Paint Dries” are surveyed to see if they enjoyed it. a. 60% of 120 people enjoyed the movie, how many people is that?
60% = x 120 = 72.35, so 60% of 120 people is60
100 = 35
24
Hence 72 people like the movie.
PercentagesWe may use percentages to indicate the “concentration” of specific groups in a larger population.
Example C. 120 people who watched the movie “As the Paint Dries” are surveyed to see if they enjoyed it.
b. Of the people enjoyed it, 75% are men, how many men enjoyed the movie?
a. 60% of 120 people enjoyed the movie, how many people is that?
60% = x 120 = 72.35, so 60% of 120 people is60
100 = 35
24
Hence 72 people like the movie.
PercentagesWe may use percentages to indicate the “concentration” of specific groups in a larger population.
Example C. 120 people who watched the movie “As the Paint Dries” are surveyed to see if they enjoyed it.
b. Of the people enjoyed it, 75% are men, how many men enjoyed the movie?
a. 60% of 120 people enjoyed the movie, how many people is that?
60% = x 120 = 72.35, so 60% of 120 people is60
100 = 35
24
Hence 72 people like the movie.
There are 72 people that like the movie.
PercentagesWe may use percentages to indicate the “concentration” of specific groups in a larger population.
Example C. 120 people who watched the movie “As the Paint Dries” are surveyed to see if they enjoyed it.
b. Of the people enjoyed it, 75% are men, how many men enjoyed the movie?
a. 60% of 120 people enjoyed the movie, how many people is that?
60% = x 120 = 72.35, so 60% of 120 people is60
100 = 35
24
75% = x 7234, so 75% of 72 people is 75
100 = 34
Hence 72 people like the movie.
There are 72 people that like the movie.
PercentagesWe may use percentages to indicate the “concentration” of specific groups in a larger population.
Example C. 120 people who watched the movie “As the Paint Dries” are surveyed to see if they enjoyed it.
b. Of the people enjoyed it, 75% are men, how many men enjoyed the movie?
a. 60% of 120 people enjoyed the movie, how many people is that?
60% = x 120 = 72.35, so 60% of 120 people is60
100 = 35
24
75% = x 7234, so 75% of 72 people is 75
100 = 34
18= 54.
Hence 72 people like the movie.
There are 72 people that like the movie.
PercentagesWe may use percentages to indicate the “concentration” of specific groups in a larger population.
Example C. 120 people who watched the movie “As the Paint Dries” are surveyed to see if they enjoyed it.
b. Of the people enjoyed it, 75% are men, how many men enjoyed the movie?
a. 60% of 120 people enjoyed the movie, how many people is that?
60% = x 120 = 72.35, so 60% of 120 people is60
100 = 35
24
75% = x 7234, so 75% of 72 people is 75
100 = 34
18= 54.
Hence 72 people like the movie.
There are 72 people that like the movie.
Therefore there are 54 men who enjoyed the movie “As the Paint Dries”.
PercentagesWe may use percentages to indicate the “concentration” of specific groups in a larger population.
Example C. 120 people who watched the movie “As the Paint Dries” are surveyed to see if they enjoyed it.
b. Of the people enjoyed it, 75% are men, how many men enjoyed the movie?
a. 60% of 120 people enjoyed the movie, how many people is that?
“The amount of adjustments” are often given as percentages such as the discount rates or tax rates etc..
60% = x 120 = 72.35, so 60% of 120 people is60
100 = 35
24
75% = x 7234, so 75% of 72 people is 75
100 = 34
18= 54.
Hence 72 people like the movie.
There are 72 people that like the movie.
Therefore there are 54 men who enjoyed the movie “As the Paint Dries”.
PercentagesExample D. A $45 nose–ring is on sale at a 15% discount rate. How much is the discounted price?
PercentagesExample D. A $45 nose–ring is on sale at a 15% discount rate. How much is the discounted price?
15% = 15100 = 3
20
PercentagesExample D. A $45 nose–ring is on sale at a 15% discount rate. How much is the discounted price?
15% =
x 45320
, so the amount of discount “15% of $45” is15100 = 3
20
PercentagesExample D. A $45 nose–ring is on sale at a 15% discount rate. How much is the discounted price?
15% =
x 45 =320
, so the amount of discount “15% of $45” is15100 = 3
20
4
9274
PercentagesExample D. A $45 nose–ring is on sale at a 15% discount rate. How much is the discounted price?
15% =
x 45 =320
, so the amount of discount “15% of $45” is15100 = 3
20
4
9274
= 6 34 = $6.75
PercentagesExample D. A $45 nose–ring is on sale at a 15% discount rate. How much is the discounted price?
15% =
x 45 =320
, so the amount of discount “15% of $45” is15100 = 3
20
4
Hence the marked–down price of the nose–ring is 45 – 6.75 = $38.25.
9274
= 6 34 = $6.75
Conversion Between Decimals, Fractions and PercentagesFractions, decimals and percentages are three different ways to express answers to the question “How much?”.
Conversion Between Decimals, Fractions and PercentagesFractions, decimals and percentages are three different ways to express answers to the question “How much?”.A fraction gives the instruction for obtaining a quantity,
Conversion Between Decimals, Fractions and PercentagesFractions, decimals and percentages are three different ways to express answers to the question “How much?”.A fraction gives the instruction for obtaining a quantity, for example
34
Conversion Between Decimals, Fractions and PercentagesFractions, decimals and percentages are three different ways to express answers to the question “How much?”.A fraction gives the instruction for obtaining a quantity, for example
34
Divide the unit (1), i.e. the whole, into 4 equal parts
Conversion Between Decimals, Fractions and PercentagesFractions, decimals and percentages are three different ways to express answers to the question “How much?”.A fraction gives the instruction for obtaining a quantity, for example
34
Divide the unit (1), i.e. the whole, into 4 equal parts
then take 3 parts.
Conversion Between Decimals, Fractions and PercentagesFractions, decimals and percentages are three different ways to express answers to the question “How much?”.A fraction gives the instruction for obtaining a quantity, for example
34
Divide the unit (1), i.e. the whole, into 4 equal parts
then take 3 parts.
Fractions are easy to understand conceptually so it’s important for mathematics which emphasis the study of relations among numbers.
Conversion Between Decimals, Fractions and PercentagesFractions, decimals and percentages are three different ways to express answers to the question “How much?”.A fraction gives the instruction for obtaining a quantity, for example
34
Divide the unit (1), i.e. the whole, into 4 equal parts
then take 3 parts.
Fractions are easy to understand conceptually so it’s important for mathematics which emphasis the study of relations among numbers. However, it’s cumbersome to add or subtract fractions because searching for the least common denominator is difficult for a lengthy list of fractions.
Conversion Between Decimals, Fractions and PercentagesFractions, decimals and percentages are three different ways to express answers to the question “How much?”.A fraction gives the instruction for obtaining a quantity, for example
34
Divide the unit (1), i.e. the whole, into 4 equal parts
then take 3 parts.
Fractions are easy to understand conceptually so it’s important for mathematics which emphasis the study of relations among numbers. However, it’s cumbersome to add or subtract fractions because searching for the least common denominator is difficult for a lengthy list of fractions.One way to over come the difficulty of adding or subtracting fractions is to standardize the denominators to powers of 10, which leads to the decimal system.
Conversion Between Decimals, Fractions and PercentagesFractions, decimals and percentages are three different ways to express answers to the question “How much?”.A fraction gives the instruction for obtaining a quantity, for example
34
Divide the unit (1), i.e. the whole, into 4 equal parts
then take 3 parts.
Fractions are easy to understand conceptually so it’s important for mathematics which emphasis the study of relations among numbers. However, it’s cumbersome to add or subtract fractions because searching for the least common denominator is difficult for a lengthy list of fractions.One way to over come the difficulty of adding or subtracting fractions is to standardize the denominators to powers of 10, which leads to the decimal system. For example, the decimal number 0.75
means
Conversion Between Decimals, Fractions and PercentagesFractions, decimals and percentages are three different ways to express answers to the question “How much?”.A fraction gives the instruction for obtaining a quantity, for example
34
Divide the unit (1), i.e. the whole, into 4 equal parts
then take 3 parts.
Fractions are easy to understand conceptually so it’s important for mathematics which emphasis the study of relations among numbers. However, it’s cumbersome to add or subtract fractions because searching for the least common denominator is difficult for a lengthy list of fractions.One way to over come the difficulty of adding or subtracting fractions is to standardize the denominators to powers of 10, which leads to the decimal system. For example, the decimal number 0.75
means 710
5100+ denominators are powers of 10.
To convert fractions to decimals, we attach 0’s after the decimal point and perform long division.
Conversion Between Decimals, Fractions and Percentages
Example E. Convert the fractions into a decimal.81
Conversion Between Decimals, Fractions and Percentages
To convert fractions to decimals, we attach 0’s after the decimal point and perform long division.
Example E. Convert the fractions into a decimal.81
)8 1.Perform long division,
Conversion Between Decimals, Fractions and Percentages
To convert fractions to decimals, we attach 0’s after the decimal point and perform long division.
attach 0’s
0 0 0
Example E. Convert the fractions into a decimal.
4 0
81
)8 1.Perform long division,
.0 0 0 1
8 2 0
2 5
1 6
Conversion Between Decimals, Fractions and Percentages
4 00
0
To convert fractions to decimals, we attach 0’s after the decimal point and perform long division.
attach 0’s
Example E. Convert the fractions into a decimal.
4 0
81
)8 1.Perform long division, we obtain that
. 1
8 2 0
2 5
1 6
Conversion Between Decimals, Fractions and Percentages
4 00
0
81 = 0.125.
To convert fractions to decimals, we attach 0’s after the decimal point and perform long division.
0 0 0attach 0’s
Example E. Convert the fractions into a decimal.
4 0
81
)8 1.Perform long division, we obtain that
. 1
8 2 0
2 5
1 6
Conversion Between Decimals, Fractions and Percentages
4 00
0
81 = 0.125.
=21
Here is a list of common fractions and their decimal expansions:
0.50 =41 0.25 =5
1 0.20 =101 0.10
=201 0.05 =25
1 0.04 =501 0.02 =100
1 0.01
81 = 0.125 8
2 = 0.250 83 = 0.375 8
4 = 0.500= 41 = 2
1
85 = 0.625 8
6 = 0.750 = 43
87 = 0.875
To convert fractions to decimals, we attach 0’s after the decimal point and perform long division.
0 0 0attach 0’s
Example E. Convert the fractions into a decimal.
4 0
81
)8 1.Perform long division, we obtain that
. 1
8 2 0
2 5
1 6
Conversion Between Decimals, Fractions and Percentages
4 00
0
81 = 0.125.
=21
Here is a list of common fractions and their decimal expansions:
0.50 =41 0.25 =5
1 0.20 =101 0.10
=201 0.05 =25
1 0.04 =501 0.02 =100
1 0.01
81 = 0.125 8
2 = 0.250 83 = 0.375 8
4 = 0.500= 41 = 2
1
85 = 0.625 8
6 = 0.750 = 43
87 = 0.875
It’s easy to add or subtract decimals numbers–we don’t need to look for common denominators as the case with fractions.
To convert fractions to decimals, we attach 0’s after the decimal point and perform long division.
0 0 0attach 0’s
Example F. Calculate the 0.375 x 1600 using fractions.
Conversion Between Decimals, Fractions and PercentagesSome problems are easier to do using fractions.
Example F. Calculate the 0.375 x 1600 using fractions.
Conversion Between Decimals, Fractions and Percentages
83
0.375 =
Some problems are easier to do using fractions.
Example F. Calculate the 0.375 x 1600 using fractions.
83so 0.375 x 1600 =
Conversion Between Decimals, Fractions and Percentages
83
0.375 = x 1600 =
Some problems are easier to do using fractions.
Example F. Calculate the 0.375 x 1600 using fractions.
83so 0.375 x 1600 =
Conversion Between Decimals, Fractions and Percentages
83
0.375 = x 1600 = 600
Some problems are easier to do using fractions.
200
Example F. Calculate the 0.375 x 1600 using fractions.
Conversion Between Decimals, Fractions and PercentagesSome problems are easier to do using fractions.
Fact About Shifting the Decimal Points in a Fraction Given a fraction, if the decimal points of the numerator and the denominator are shifted in the same direction with the same number of spaces, the resulting fraction is an equivalent fraction, i.e. it’s the same.
83so 0.375 x 1600 = 8
30.375 = x 1600 = 600
200
Example F. Calculate the 0.375 x 1600 using fractions.
Conversion Between Decimals, Fractions and PercentagesSome problems are easier to do using fractions.
Fact About Shifting the Decimal Points in a Fraction Given a fraction, if the decimal points of the numerator and the denominator are shifted in the same direction with the same number of spaces, the resulting fraction is an equivalent fraction, i.e. it’s the same.
To change a decimal number of the form 0 . # # # # to a fraction:
1. Put “1.” in the denominator and line up the decimal points.
83so 0.375 x 1600 = 8
30.375 = x 1600 = 600
200
Example F. Calculate the 0.375 x 1600 using fractions.
Conversion Between Decimals, Fractions and PercentagesSome problems are easier to do using fractions.
Fact About Shifting the Decimal Points in a Fraction Given a fraction, if the decimal points of the numerator and the denominator are shifted in the same direction with the same number of spaces, the resulting fraction is an equivalent fraction, i.e. it’s the same.
To change a decimal number of the form 0 . # # # # to a fraction:
1. Put “1.” in the denominator and line up the decimal points.
0 . # # # #1 .
83so 0.375 x 1600 = 8
30.375 = x 1600 = 600
200
Example F. Calculate the 0.375 x 1600 using fractions.
Conversion Between Decimals, Fractions and PercentagesSome problems are easier to do using fractions.
Fact About Shifting the Decimal Points in a Fraction Given a fraction, if the decimal points of the numerator and the denominator are shifted in the same direction with the same number of spaces, the resulting fraction is an equivalent fraction, i.e. it’s the same.
To change a decimal number of the form 0 . # # # # to a fraction:
1. Put “1.” in the denominator and line up the decimal points.
0 . # # # #1 .
83so 0.375 x 1600 = 8
30.375 = x 1600 = 600
200
2. Slide the decimal point of the numerator to end of the number.
Example F. Calculate the 0.375 x 1600 using fractions.
Conversion Between Decimals, Fractions and PercentagesSome problems are easier to do using fractions.
Fact About Shifting the Decimal Points in a Fraction Given a fraction, if the decimal points of the numerator and the denominator are shifted in the same direction with the same number of spaces, the resulting fraction is an equivalent fraction, i.e. it’s the same.
To change a decimal number of the form 0 . # # # # to a fraction:
1. Put “1.” in the denominator and line up the decimal points.
0 . # # # #1 .
0 . # # # #1 .
. =
Drag the decimal point to the end of the number 2. Slide the decimal point of the
numerator to end of the number.
83so 0.375 x 1600 = 8
30.375 = x 1600 = 600
200
Example F. Calculate the 0.375 x 1600 using fractions.
Conversion Between Decimals, Fractions and PercentagesSome problems are easier to do using fractions.
Fact About Shifting the Decimal Points in a Fraction Given a fraction, if the decimal points of the numerator and the denominator are shifted in the same direction with the same number of spaces, the resulting fraction is an equivalent fraction, i.e. it’s the same.
To change a decimal number of the form 0 . # # # # to a fraction:
1. Put “1.” in the denominator and line up the decimal points.
0 . # # # #1 .
0 . # # # #1 .
. =
Drag the decimal point to the end of the number 2. Slide the decimal point of the
numerator to end of the number.
3. Pack a “0” for each move to the right.
83so 0.375 x 1600 = 8
30.375 = x 1600 = 600
200
Example F. Calculate the 0.375 x 1600 using fractions.
Conversion Between Decimals, Fractions and PercentagesSome problems are easier to do using fractions.
Fact About Shifting the Decimal Points in a Fraction Given a fraction, if the decimal points of the numerator and the denominator are shifted in the same direction with the same number of spaces, the resulting fraction is an equivalent fraction, i.e. it’s the same.
To change a decimal number of the form 0 . # # # # to a fraction:
1. Put “1.” in the denominator and line up the decimal points.
0 . # # # #1 .
0 . # # # #1 .
.
. 0 0 0 0=
Drag the decimal point to the end of the number
then fill in a “0” for each move.
2. Slide the decimal point of the numerator to end of the number.
3. Pack a “0” for each move to the right.
83so 0.375 x 1600 = 8
30.375 = x 1600 = 600
200
Example G. Convert the following decimals to fractions.
a. 0.023
Conversion Between Decimals, Fractions and Percentages
Example G. Convert the following decimals to fractions.
a. 0.0231. Insert “1.” in the denominator and line up the decimal points.
Conversion Between Decimals, Fractions and Percentages
Example G. Convert the following decimals to fractions.
a. 0.023
0 . 0 2 31 .
1. Insert “1.” in the denominator and line up the decimal points.
Conversion Between Decimals, Fractions and Percentages
Example G. Convert the following decimals to fractions.
a. 0.023
0 . 0 2 31 .
1. Insert “1.” in the denominator and line up the decimal points.2. Slide the pair of points in to the back of the last non-zero digit in the numerator, and pack 0’s in the skipped slots in the denominator.
Conversion Between Decimals, Fractions and Percentages
1. Insert “1.” in the denominator and line up the decimal points.2. Slide the pair of points in to the back of the last non-zero digit in the numerator, and pack 0’s in the skipped slots in the denominator.
Example G. Convert the following decimals to fractions.
a. 0.023
0 . 0 2 31 .0 0 0
0 . 0 2 31 .
= . .
Conversion Between Decimals, Fractions and Percentages
1. Insert “1.” in the denominator and line up the decimal points.2. Slide the pair of points in to the back of the last non-zero digit in the numerator, and pack 0’s in the skipped slots in the denominator.
Example G. Convert the following decimals to fractions.
a. 0.023
0 . 0 2 31 .0 0 0 1000
23=
0 . 0 2 31 .
= . .
Conversion Between Decimals, Fractions and Percentages
1. Insert “1.” in the denominator and line up the decimal points.2. Slide the pair of points in to the back of the last non-zero digit in the numerator, and pack 0’s in the skipped slots in the denominator.
Example G. Convert the following decimals to fractions.
a. 0.023
0 . 0 2 31 .0 0 0 1000
23=
0 . 0 2 31 .
= . .
b. 37. 25
Conversion Between Decimals, Fractions and Percentages
1. Insert “1.” in the denominator and line up the decimal points.2. Slide the pair of points in to the back of the last non-zero digit in the numerator, and pack 0’s in the skipped slots in the denominator.
Example G. Convert the following decimals to fractions.
a. 0.023
0 . 0 2 31 .0 0 0 1000
23=
0 . 0 2 31 .
= . .
b. 37. 25
we only need to convert the decimal 0.25 to a fraction.
Since 37.25 = 37 + 0.25
Conversion Between Decimals, Fractions and Percentages
1. Insert “1.” in the denominator and line up the decimal points.2. Slide the pair of points in to the back of the last non-zero digit in the numerator, and pack 0’s in the skipped slots in the denominator.
Example G. Convert the following decimals to fractions.
a. 0.023
0 . 0 2 31 .0 0 0 1000
23=
0 . 0 2 31 .
= . .
b. 37. 25
0 . 2 51 .
we only need to convert the decimal 0.25 to a fraction.
Since 37.25 = 37 + 0.25
0. 2 5 =
Conversion Between Decimals, Fractions and Percentages
1. Insert “1.” in the denominator and line up the decimal points.2. Slide the pair of points in to the back of the last non-zero digit in the numerator, and pack 0’s in the skipped slots in the denominator.
Example G. Convert the following decimals to fractions.
a. 0.023
0 . 0 2 31 .0 0 0 1000
23=
0 . 0 2 31 .
= . .
b. 37. 25
0 . 2 51 .
we only need to convert the decimal 0.25 to a fraction.
Since 37.25 = 37 + 0.25
0. 2 5 =0 . 2 51 . 0 0
=..
Conversion Between Decimals, Fractions and Percentages
1. Insert “1.” in the denominator and line up the decimal points.2. Slide the pair of points in to the back of the last non-zero digit in the numerator, and pack 0’s in the skipped slots in the denominator.
Example G. Convert the following decimals to fractions.
a. 0.023
0 . 0 2 31 .0 0 0 1000
23=
0 . 0 2 31 .
= . .
b. 37. 25
0 . 2 51 .
we only need to convert the decimal 0.25 to a fraction.
Since 37.25 = 37 + 0.25
0. 2 5 =0 . 2 51 . 0 0
=.. 100
25=
Conversion Between Decimals, Fractions and Percentages
1. Insert “1.” in the denominator and line up the decimal points.2. Slide the pair of points in to the back of the last non-zero digit in the numerator, and pack 0’s in the skipped slots in the denominator.
Example G. Convert the following decimals to fractions.
a. 0.023
0 . 0 2 31 .0 0 0 1000
23=
0 . 0 2 31 .
= . .
b. 37. 25
0 . 2 51 .
we only need to convert the decimal 0.25 to a fraction.
Since 37.25 = 37 + 0.25
0. 2 5 =0 . 2 51 . 0 0
=.. 100
25= =
Conversion Between Decimals, Fractions and Percentages
41
1. Insert “1.” in the denominator and line up the decimal points.2. Slide the pair of points in to the back of the last non-zero digit in the numerator, and pack 0’s in the skipped slots in the denominator.
Example G. Convert the following decimals to fractions.
a. 0.023
0 . 0 2 31 .0 0 0 1000
23=
0 . 0 2 31 .
= . .
b. 37. 25
0 . 2 51 .
we only need to convert the decimal 0.25 to a fraction.
Since 37.25 = 37 + 0.25
0. 2 5 =0 . 2 51 . 0 0
=.. 100
25= = . Therefore 37.25 = 37
Conversion Between Decimals, Fractions and Percentages
41
41
1. Insert “1.” in the denominator and line up the decimal points.2. Slide the pair of points in to the back of the last non-zero digit in the numerator, and pack 0’s in the skipped slots in the denominator.
Example G. Convert the following decimals to fractions.
a. 0.023
0 . 0 2 31 .0 0 0 1000
23=
0 . 0 2 31 .
= . .
b. 37. 25
0 . 2 51 .
we only need to convert the decimal 0.25 to a fraction.
Since 37.25 = 37 + 0.25
0. 2 5 =0 . 2 51 . 0 0
=.. 100
25= = . Therefore 37.25 = 3741
Conversion Between Decimals, Fractions and Percentages
Percentages are fractions with 100 as the denominator. It’s useful to think of 1% as 1¢ = $0.01 and that 30% as 30 ¢ = $0.30, etc..
41
The conversion between decimal numbers and percentages is done by shifting decimal points.
Conversion Between Decimals, Fractions and Percentages
The conversion between decimal numbers and percentages is done by shifting decimal points.
Conversion Between Decimals, Fractions and Percentages
To change a decimal number into a #% # . # # #
The conversion between decimal numbers and percentages is done by shifting decimal points.
Conversion Between Decimals, Fractions and Percentages
1. insert “1.” as the denominator,
To change a decimal number into a #% # . # # # 1 .
The conversion between decimal numbers and percentages is done by shifting decimal points.
Conversion Between Decimals, Fractions and Percentages
1. insert “1.” as the denominator,
2. move the decimal points two places to the right to make the denominator “100.”, write the result using the % notation.
To change a decimal number into a #% # . # # # 1 .
The conversion between decimal numbers and percentages is done by shifting decimal points.
Conversion Between Decimals, Fractions and Percentages
1. insert “1.” as the denominator,
2. move the decimal points two places to the right to make the denominator “100.”, write the result using the % notation.
To change a decimal number into a #% # . # # # 1 .
# . # # # 1 .
. . 0 0=
move right, expand denom. to “100”
The conversion between decimal numbers and percentages is done by shifting decimal points.
Conversion Between Decimals, Fractions and Percentages
1. insert “1.” as the denominator,
2. move the decimal points two places to the right to make the denominator “100.”, write the result using the % notation.
Example H. a. Convert 4.5 to %. b. Convert 0.045 to %.
To change a decimal number into a #% # . # # # 1 .
# . # # # 1 .
. . 0 0=
move right, expand denom. to “100”
4.5 =
The conversion between decimal numbers and percentages is done by shifting decimal points.
Conversion Between Decimals, Fractions and Percentages
1. insert “1.” as the denominator,
2. move the decimal points two places to the right to make the denominator “100.”, write the result using the % notation.
Example H. a. Convert 4.5 to %. b. Convert 0.045 to %.4.51.
To change a decimal number into a #% # . # # # 1 .
# . # # # 1 .
. . 0 0=
move right, expand denom. to “100”
4.5 =
The conversion between decimal numbers and percentages is done by shifting decimal points.
Conversion Between Decimals, Fractions and Percentages
1. insert “1.” as the denominator,
2. move the decimal points two places to the right to make the denominator “100.”, write the result using the % notation.
Example H. a. Convert 4.5 to %. b. Convert 0.045 to %.4.51.
=4.50.1.00.
To change a decimal number into a #% # . # # # 1 .
# . # # # 1 .
. . 0 0=
move right, expand denom. to “100”
move right, expand to “100”
4.5 =
The conversion between decimal numbers and percentages is done by shifting decimal points.
Conversion Between Decimals, Fractions and Percentages
1. insert “1.” as the denominator,
2. move the decimal points two places to the right to make the denominator “100.”, write the result using the % notation.
Example H. a. Convert 4.5 to %. b. Convert 0.045 to %.4.51.
=4.50.1.00. = 450%
Hence 4.50 = 450.%.
To change a decimal number into a #% # . # # # 1 .
# . # # # 1 .
. . 0 0=
move right, expand denom. to “100”
move right, expand to “100”
4.5 =
The conversion between decimal numbers and percentages is done by shifting decimal points.
Conversion Between Decimals, Fractions and Percentages
1. insert “1.” as the denominator,
2. move the decimal points two places to the right to make the denominator “100.”, write the result using the % notation.
Example H. a. Convert 4.5 to %. b. Convert 0.045 to %.4.51.
=4.50.1.00. = 450% 0.045 = 1.
0.045
Hence 4.50 = 450.%.
To change a decimal number into a #% # . # # # 1 .
# . # # # 1 .
. . 0 0=
move right, expand denom. to “100”
move right, expand to “100”
4.5 =
The conversion between decimal numbers and percentages is done by shifting decimal points.
Conversion Between Decimals, Fractions and Percentages
1. insert “1.” as the denominator,
2. move the decimal points two places to the right to make the denominator “100.”, write the result using the % notation.
Example H. a. Convert 4.5 to %. b. Convert 0.045 to %.4.51.
=4.50.1.00. = 450% 0.045 = 1. =
0.04.501.00. = 4.50%
0.045
Hence 4.50 = 450.%. Hence 0.045 = 4.5%.
To change a decimal number into a #% # . # # # 1 .
# . # # # 1 .
. . 0 0=
move right, expand denom. to “100”
move right, expand to “100”
4.5 =
The conversion between decimal numbers and percentages is done by shifting decimal points.
Conversion Between Decimals, Fractions and Percentages
1. insert “1.” as the denominator,
2. move the decimal points two places to the right to make the denominator “100.”, write the result using the % notation.
Example H. a. Convert 4.5 to %. b. Convert 0.045 to %.4.51.
=4.50.1.00. = 450% 0.045 = 1. =
0.04.501.00. = 4.50%
0.045
Hence 4.50 = 450.%. Hence 0.045 = 4.5%.
To change a decimal number into a #%
To change a #% into a decimal number
# . # # # 1 .
# . # # # 1 .
. . 0 0=
move right, expand denom. to “100”
move right, expand to “100”
4.5 =
The conversion between decimal numbers and percentages is done by shifting decimal points.
Conversion Between Decimals, Fractions and Percentages
1. insert “1.” as the denominator,
2. move the decimal points two places to the right to make the denominator “100.”, write the result using the % notation.
Example H. a. Convert 4.5 to %. b. Convert 0.045 to %.4.51.
=4.50.1.00. = 450% 0.045 = 1. =
0.04.501.00. = 4.50%
0.045
Hence 4.50 = 450.%. Hence 0.045 = 4.5%.
To change a decimal number into a #%
1. write the #% asTo change a #% into a decimal number
#100
# . # # # 1 .
# . # # # 1 .
. . 0 0=
move right, expand denom. to “100”
# # #. #1 0 0.
move right, expand to “100”
4.5 =
The conversion between decimal numbers and percentages is done by shifting decimal points.
Conversion Between Decimals, Fractions and Percentages
1. insert “1.” as the denominator,
2. move the decimal points two places to the right to make the denominator “100.”, write the result using the % notation.
Example H. a. Convert 4.5 to %. b. Convert 0.045 to %.4.51.
=4.50.1.00. = 450% 0.045 = 1. =
0.04.501.00. = 4.50%
0.045
Hence 4.50 = 450.%. Hence 0.045 = 4.5%.
To change a decimal number into a #%
1. write the #% as
2. move the two decimal points two places to the left so the denominator is 1 and the numerator is the answer.
To change a #% into a decimal number#
100
# . # # # 1 .
# . # # # 1 .
. . 0 0=
move right, expand denom. to “100”
move right, expand to “100”
# # #. #1 0 0.
4.5 =
The conversion between decimal numbers and percentages is done by shifting decimal points.
Conversion Between Decimals, Fractions and Percentages
1. insert “1.” as the denominator,
2. move the decimal points two places to the right to make the denominator “100.”, write the result using the % notation.
Example H. a. Convert 4.5 to %. b. Convert 0.045 to %.4.51.
=4.50.1.00. = 450% 0.045 = 1. =
0.04.501.00. = 4.50%
0.045
Hence 4.50 = 450.%. Hence 0.045 = 4.5%.
To change a decimal number into a #%
1. write the #% as
2. move the two decimal points two places to the left so the denominator is 1 and the numerator is the answer.
To change a #% into a decimal number#
100
# . # # # 1 .
# . # # # 1 .
. . 0 0=
move right, expand denom. to “100”
# . # # #1 .
# # #. #1 . .
0 0. =
move left, reduce denom. to “1”
move right, expand to “100”
Conversion Between Decimals, Fractions and PercentagesExample I. a. Convert 0.35% to a decimal number. b. Convert 3,000 % to a decimal number.
Conversion Between Decimals, Fractions and PercentagesExample I. a. Convert 0.35% to a decimal number. b. Convert 3,000 % to a decimal number.
= 0.351 0 0.
0.35%move left to reduce to “1”
Conversion Between Decimals, Fractions and PercentagesExample I. a. Convert 0.35% to a decimal number. b. Convert 3,000 % to a decimal number.
= 0.351 0 0.
0.35%move left to reduce to “1”
Conversion Between Decimals, Fractions and PercentagesExample I. a. Convert 0.35% to a decimal number. b. Convert 3,000 % to a decimal number.
= 0.351 0 0.
0.35%
Hence 0.35% = 0.0035.
move left to reduce to “1”
= 0.00.35
Conversion Between Decimals, Fractions and PercentagesExample I. a. Convert 0.35% to a decimal number. b. Convert 3,000 % to a decimal number.
= 0.351 0 0.
0.35%
Hence 0.35% = 0.0035.
move left to reduce to “1”
= 0.00.35
=3 0 0 0.
1 0 0.3,000%
Conversion Between Decimals, Fractions and PercentagesExample I. a. Convert 0.35% to a decimal number. b. Convert 3,000 % to a decimal number.
= 0.351 0 0.
0.35%
Hence 0.35% = 0.0035.
move left to reduce to “1”
= 0.00.35
=3 0 0 0.
1 0 0.3,000%
= 30.00.
Hence 3,000% = 30.00 or 30.
Conversion Between Decimals, Fractions and PercentagesExample I. a. Convert 0.35% to a decimal number. b. Convert 3,000 % to a decimal number.
= 0.351 0 0.
0.35%
Hence 0.35% = 0.0035.
move left to reduce to “1”
= 0.00.35
=3 0 0 0.
1 0 0.3,000%
= 30.00.
Hence 3,000% = 30.00 or 30.
Example F. The cost of a dozen eggs changed from $2.40 to $3.00. What is the increase in the price? What is the % of increase in the price?
Conversion Between Decimals, Fractions and PercentagesExample I. a. Convert 0.35% to a decimal number. b. Convert 3,000 % to a decimal number.
= 0.351 0 0.
0.35%
Hence 0.35% = 0.0035.
move left to reduce to “1”
= 0.00.35
=3 0 0 0.
1 0 0.3,000%
= 30.00.
Hence 3,000% = 30.00 or 30.
Example F. The cost of a dozen eggs changed from $2.40 to $3.00. What is the increase in the price? What is the % of increase in the price?
The increase in the price is 3.00 – 2.40 = $0.60.
Conversion Between Decimals, Fractions and PercentagesExample I. a. Convert 0.35% to a decimal number. b. Convert 3,000 % to a decimal number.
= 0.351 0 0.
0.35%
Hence 0.35% = 0.0035.
move left to reduce to “1”
= 0.00.35
=3 0 0 0.
1 0 0.3,000%
= 30.00.
Hence 3,000% = 30.00 or 30.
Example F. The cost of a dozen eggs changed from $2.40 to $3.00. What is the increase in the price? What is the % of increase in the price?
The increase in the price is 3.00 – 2.40 = $0.60.
The % of increase in the price is:0.60the price hike
original price= 2.40
Conversion Between Decimals, Fractions and PercentagesExample I. a. Convert 0.35% to a decimal number. b. Convert 3,000 % to a decimal number.
= 0.351 0 0.
0.35%
Hence 0.35% = 0.0035.
move left to reduce to “1”
= 0.00.35
=3 0 0 0.
1 0 0.3,000%
= 30.00.
Hence 3,000% = 30.00 or 30.
Example F. The cost of a dozen eggs changed from $2.40 to $3.00. What is the increase in the price? What is the % of increase in the price?
The increase in the price is 3.00 – 2.40 = $0.60.
The % of increase in the price is:0.60the price hike
original price= 2.40
= =14
= 0.25 = 25%6.24.
Conversion Between Decimals, Fractions and PercentagesExample I. a. Convert 0.35% to a decimal number. b. Convert 3,000 % to a decimal number.
= 0.351 0 0.
0.35%
Hence 0.35% = 0.0035.
move left to reduce to “1”
= 0.00.35
=3 0 0 0.
1 0 0.3,000%
= 30.00.
Hence 3,000% = 30.00 or 30.
Example F. The cost of a dozen eggs changed from $2.40 to $3.00. What is the increase in the price? What is the % of increase in the price?
The increase in the price is 3.00 – 2.40 = $0.60.
The % of increase in the price is:0.60the price hike
original price= 2.40
= =14
= 0.25 = 25%
So this is a 25 % increase in the price.
6.24.
Conversion Between Decimals, Fractions and PercentagesExample I. a. Convert 0.35% to a decimal number. b. Convert 3,000 % to a decimal number.
= 0.351 0 0.
0.35%
Hence 0.35% = 0.0035.
move left to reduce to “1”
= 0.00.35
=3 0 0 0.
1 0 0.3,000%
= 30.00.
Hence 3,000% = 30.00 or 30.
Example F. The cost of a dozen eggs changed from $2.40 to $3.00. What is the increase in the price? What is the % of increase in the price?
The increase in the price is 3.00 – 2.40 = $0.60.
The % of increase in the price is:0.60the price hike
original price= 2.40
= =14
= 0.25 = 25%
So this is a 25 % increase in the price.
6.24.
Question: If the price falls from $3.00 to $2.40, what is the % of price drop? (Ans: 20%)
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