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Common Core: 5th Grade Math : Solve Word Problems Involving Division of Whole Numbers Leading to Answers in the Form of Fractions or Mixed Numbers: CCSS.Math.Content.5.NF.B.3

Study concepts, example questions & explanations for Common Core: 5th Grade Math

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All Common Core: 5th Grade Math Resources

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Example Questions

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Example Question #191 : Solve Word Problems Involving Division Of Whole Numbers Leading To Answers In The Form Of Fractions Or Mixed Numbers: Ccss.Math.Content.5.Nf.B.3

Sara has days to sell 102 boxes of cookies. How many boxes does she need to sell each day, assuming she sells the same number of boxes per day? Select the answer that contains the pair of numbers that the answer falls between.

Possible Answers:

and

Correct answer:

and

Explanation:

We can think of this problem as an improper fraction and solve for the mixed number by placing the amount of boxes of cookies over the number of days Sara has to sell the cookies. We get the following:

$\small \frac{102\textup{ boxes of cookies}}{5\textup{ days}}$

can go into 102 only times. In other words, we are looking for the number that when multiplied by the denominator gets us as close to the numerator as possible, without going over the value of the numerator.

Simple multiplication reveals the following:

$5\times 20=100$

In order to find out what is left over, we must subtract this number from the numerator.

102-100=2

The difference will always be less than the denominator from the original improper fraction. If it is not, then check your work in the previous step because this means that the denominator could have been divided into the numerator at least one more time.

Then, we put the difference over the denominator:

$\frac{2}{5}$

Let's solve for the entire improper fraction by putting these values together and forming a mixed number:

$\small \frac{102}{5}=20\frac{2}{5}$

Last, we know that $20\frac{2}{5}$ is between the numbers and ; therefore, the correct answer is:

and

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Example Question #192 : Solve Word Problems Involving Division Of Whole Numbers Leading To Answers In The Form Of Fractions Or Mixed Numbers: Ccss.Math.Content.5.Nf.B.3

Sara has days to sell 109 boxes of cookies. How many boxes does she need to sell each day, assuming she sells the same number of boxes per day? Select the answer that contains the pair of numbers that the answer falls between.

Possible Answers:

and

Correct answer:

and

Explanation:

$\small \frac{109\textup{ boxes of cookies}}{5\textup{ days}}$

can go into 109 only times. In other words, we are looking for the number that when multiplied by the denominator gets us as close to the numerator as possible, without going over the value of the numerator.

Simple multiplication reveals the following:

$5\times 21=105$

In order to find out what is left over, we must subtract this number from the numerator.

109-105=4

Then, we put the difference over the denominator:

$\frac{4}{5}$

Let's solve for the entire improper fraction by putting these values together and forming a mixed number:

$\small \frac{109}{5}=21\frac{4}{5}$

Last, we know that $21\frac{4}{5}$ is between the numbers and ; therefore, the correct answer is:

and

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Example Question #1071 : Common Core Math: Grade 5

Sara has days to sell 119 boxes of cookies. How many boxes does she need to sell each day, assuming she sells the same number of boxes per day? Select the answer that contains the pair of numbers that the answer falls between.

Possible Answers:

and

Correct answer:

and

Explanation:

$\small \frac{119\textup{ boxes of cookies}}{5\textup{ days}}$

can go into 119 only times. In other words, we are looking for the number that when multiplied by the denominator gets us as close to the numerator as possible, without going over the value of the numerator.

Simple multiplication reveals the following:

$5\times 23=115$

In order to find out what is left over, we must subtract this number from the numerator.

119-115=4

Then, we put the difference over the denominator:

$\frac{4}{5}$

Let's solve for the entire improper fraction by putting these values together and forming a mixed number:

$\small \frac{119}{5}=23\frac{4}{5}$

Last, we know that $23\frac{4}{5}$ is between the numbers and ; therefore, the correct answer is:

and

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Example Question #1072 : Common Core Math: Grade 5

Sara has days to sell 127 boxes of cookies. How many boxes does she need to sell each day, assuming she sells the same number of boxes per day? Select the answer that contains the pair of numbers that the answer falls between.

Possible Answers:

and

Correct answer:

and

Explanation:

$\small \frac{127\textup{ boxes of cookies}}{5\textup{ days}}$

can go into 127 only times. In other words, we are looking for the number that when multiplied by the denominator gets us as close to the numerator as possible, without going over the value of the numerator.

Simple multiplication reveals the following:

$5\times 25=125$

In order to find out what is left over, we must subtract this number from the numerator.

127-125=2

Then, we put the difference over the denominator:

$\frac{2}{5}$

Let's solve for the entire improper fraction by putting these values together and forming a mixed number:

$\small \frac{127}{5}=25\frac{2}{5}$

Last, we know that $25\frac{2}{5}$ is between the numbers and ; therefore, the correct answer is:

and

Report an Error

Example Question #1073 : Common Core Math: Grade 5

Aubtin ordered a $59\textup{ inch}$ sub. If he splits the sub into equal pieces, how long will each piece be? Select the answer that contains the pair of numbers that the answer falls between.

Possible Answers:

and

Correct answer:

and

Explanation:

We can think of this problem as an improper fraction and solve for the mixed number by placing the size of the sub over the number of pieces to be cut. We get the following:

$\small \frac{59\textup{ inches}}{8\textup{ pieces}}$

can go into only times. In other words, we are looking for the number that when multiplied by the denominator gets us as close to the numerator as possible, without going over the value of the numerator.

Simple multiplication reveals the following:

$8\times 7=56$

In order to find out what is left over, we must subtract this number from the numerator.

59-56=3

Then, we put the difference over the denominator:

$\frac{3}{8}$

Let's solve for the entire improper fraction by putting these values together and forming a mixed number:

$\small \frac{59}{8}=7\frac{3}{8}$

Last, we know that $7\frac{3}{8}$ is between the numbers and ; therefore, the correct answer is:

and

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Example Question #191 : Solve Word Problems Involving Division Of Whole Numbers Leading To Answers In The Form Of Fractions Or Mixed Numbers: Ccss.Math.Content.5.Nf.B.3

Aubtin ordered a $68\textup{ inch}$ sub. If he splits the sub into equal pieces, how long will each piece be? Select the answer that contains the pair of numbers that the answer falls between.

Possible Answers:

and

Correct answer:

and

Explanation:

We can think of this problem as an improper fraction and solve for the mixed number by placing the size of the sub over the number of pieces to be cut. We get the following:

$\small \frac{68\textup{ inches}}{8\textup{ pieces}}$

Simple multiplication reveals the following:

$8\times 8=64$

In order to find out what is left over, we must subtract this number from the numerator.

68-64=4

Then, we put the difference over the denominator:

$\frac{4}{8}$

Let's solve for the entire improper fraction by putting these values together and forming a mixed number:

$\small \frac{68}{8}=8\frac{4}{8}$

Last, we know that $8\frac{4}{8}$ is between the numbers and ; therefore, the correct answer is:

and

Report an Error

Example Question #1075 : Common Core Math: Grade 5

Aubtin ordered a $84\textup{ inch}$ sub. If he splits the sub into equal pieces, how long will each piece be? Select the answer that contains the pair of numbers that the answer falls between.

Possible Answers:

and

Correct answer:

and

Explanation:

We can think of this problem as an improper fraction and solve for the mixed number by placing the size of the sub over the number of pieces to be cut. We get the following:

$\small \frac{84\textup{ inches}}{8\textup{ pieces}}$

Simple multiplication reveals the following:

$8\times 10=80$

In order to find out what is left over, we must subtract this number from the numerator.

84-80=4

Then, we put the difference over the denominator:

$\frac{4}{8}$

Let's solve for the entire improper fraction by putting these values together and forming a mixed number:

$\small \frac{84}{8}=10\frac{4}{8}$

Last, we know that $10\frac{4}{8}$ is between the numbers and ; therefore, the correct answer is:

and

Report an Error

Example Question #1076 : Common Core Math: Grade 5

Aubtin ordered a $90\textup{ inch}$ sub. If he splits the sub into equal pieces, how long will each piece be? Select the answer that contains the pair of numbers that the answer falls between.

Possible Answers:

and

Correct answer:

and

Explanation:

We can think of this problem as an improper fraction and solve for the mixed number by placing the size of the sub over the number of pieces to be cut. We get the following:

$\small \frac{90\textup{ inches}}{8\textup{ pieces}}$

Simple multiplication reveals the following:

$8\times 11=88$

In order to find out what is left over, we must subtract this number from the numerator.

90-88=2

Then, we put the difference over the denominator:

$\frac{2}{8}$

Let's solve for the entire improper fraction by putting these values together and forming a mixed number:

$\small \frac{90}{8}=11\frac{2}{8}$

Last, we know that $11\frac{2}{8}$ is between the numbers and ; therefore, the correct answer is:

and

Report an Error

Example Question #1077 : Common Core Math: Grade 5

Aubtin ordered a $66\textup{ inch}$ sub. If he splits the sub into equal pieces, how long will each piece be? Select the answer that contains the pair of numbers that the answer falls between.

Possible Answers:

and

Correct answer:

and

Explanation:

We can think of this problem as an improper fraction and solve for the mixed number by placing the size of the sub over the number of pieces to be cut. We get the following:

$\small \frac{66\textup{ inches}}{10\textup{ pieces}}$

Simple multiplication reveals the following:

$10\times 6=60$

In order to find out what is left over, we must subtract this number from the numerator.

66-60=6

Then, we put the difference over the denominator:

$\frac{6}{10}$

Let's solve for the entire improper fraction by putting these values together and forming a mixed number:

$\small \frac{66}{10}=6\frac{6}{10}$

Last, we know that $6\frac{6}{10}$ is between the numbers and ; therefore, the correct answer is:

and

Report an Error

Example Question #1078 : Common Core Math: Grade 5

Aubtin ordered a $79\textup{ inch}$ sub. If he splits the sub into equal pieces, how long will each piece be? Select the answer that contains the pair of numbers that the answer falls between.

Possible Answers:

and

Correct answer:

and

Explanation:

We can think of this problem as an improper fraction and solve for the mixed number by placing the size of the sub over the number of pieces to be cut. We get the following:

$\small \frac{79\textup{ inches}}{10\textup{ pieces}}$

Simple multiplication reveals the following:

$10\times 7=70$

In order to find out what is left over, we must subtract this number from the numerator.

79-70=9

Then, we put the difference over the denominator:

$\frac{9}{10}$

Let's solve for the entire improper fraction by putting these values together and forming a mixed number:

$\small \frac{79}{10}=7\frac{9}{10}$

Last, we know that $7\frac{9}{10}$ is between the numbers and ; therefore, the correct answer is:

and

Report an Error

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Common Core: 5th Grade Math : Solve Word Problems Involving Division of Whole Numbers Leading to Answers in the Form of Fractions or Mixed Numbers: CCSS.Math.Content.5.NF.B.3

Study concepts, example questions & explanations for Common Core: 5th Grade Math

All Common Core: 5th Grade Math Resources

Example Questions

Example Question #191 : Solve Word Problems Involving Division Of Whole Numbers Leading To Answers In The Form Of Fractions Or Mixed Numbers: Ccss.Math.Content.5.Nf.B.3

Example Question #192 : Solve Word Problems Involving Division Of Whole Numbers Leading To Answers In The Form Of Fractions Or Mixed Numbers: Ccss.Math.Content.5.Nf.B.3

Example Question #1071 : Common Core Math: Grade 5

Example Question #1072 : Common Core Math: Grade 5

Example Question #1073 : Common Core Math: Grade 5

Example Question #191 : Solve Word Problems Involving Division Of Whole Numbers Leading To Answers In The Form Of Fractions Or Mixed Numbers: Ccss.Math.Content.5.Nf.B.3

Example Question #1075 : Common Core Math: Grade 5

Example Question #1076 : Common Core Math: Grade 5

Example Question #1077 : Common Core Math: Grade 5

Example Question #1078 : Common Core Math: Grade 5

All Common Core: 5th Grade Math Resources

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