Find the Extremes & Write any Two Proportions Worksheet

Write Any Two Proportions by Using Means

Name Grade School

Date Questions10 Score

Using 8 and 13 as means, write any two proportions.

Using 8 and 21 as means, write any two proportions.

Using 10 and 17 as means, write any two proportions.

Using 7 and 28 as means, write any two proportions.

Using 6 and 9 as means, write any two proportions.

Using 5 and 22 as means, write any two proportions.

Using 5 and 38 as means, write any two proportions.

Using 3 and 66 as means, write any two proportions.

Using 6 and 6 as means, write any two proportions.

Using 2 and 87 as means, write any two proportions.

Answers Key

Show All Workout

Using 8 and 13 as means, write any two proportions.

2:8 :: 13:52 and 4:8 :: 13:26

step 1

Find the product of Means
8 x 13 = 104

step 2

If 2 ratios are in proportion, the product of Extremes and product of Means should be equal
Product of Extremes = Product of Means
Product of Extremes = 8 x 13
Product of Extremes = 104

step 3

To find the Extremes, find the factors of 104
Factors of 104 = 2, 4, 52, 26

step 4

Write the possible pair of multiplication factors (Extremes) that makes 104
2 x 52 = 104
4 x 26 = 104
Either 2 & 52 or 4 & 26 are the the Extremes of this proportion

step 5

Apply the Extreme values in the proportion statement
Product of Extremes = Product of Means
2 x 52 = 8 x 13
or
4 x 26 = 8 x 13
or

step 6

Write the above expression in the fraction form
So,

2 x 52 = 8 x 13 can be written as

1352

similarly,

4 x 26 = 8 x 13 can be written as

1326

step 7

Write the above fractions in the ratio form
2:8 = 13:52
or
4:8 = 13:26

step 8

Therefore, the two proportions are
2:8 :: 13:52 & 4:8 :: 13:26

Using 8 and 21 as means, write any two proportions.

4:8 :: 21:42 and 2:8 :: 21:84

step 1

Find the product of Means
8 x 21 = 168

step 2

If 2 ratios are in proportion, the product of Extremes and product of Means should be equal
Product of Extremes = Product of Means
Product of Extremes = 8 x 21
Product of Extremes = 168

step 3

To find the Extremes, find the factors of 168
Factors of 168 = 4, 2, 42, 84

step 4

Write the possible pair of multiplication factors (Extremes) that makes 168
4 x 42 = 168
2 x 84 = 168
Either 4 & 42 or 2 & 84 are the the Extremes of this proportion

step 5

Apply the Extreme values in the proportion statement
Product of Extremes = Product of Means
4 x 42 = 8 x 21
or
2 x 84 = 8 x 21
or

step 6

Write the above expression in the fraction form
So,

4 x 42 = 8 x 21 can be written as

2142

similarly,

2 x 84 = 8 x 21 can be written as

2184

step 7

Write the above fractions in the ratio form
4:8 = 21:42
or
2:8 = 21:84

step 8

Therefore, the two proportions are
4:8 :: 21:42 & 2:8 :: 21:84

Using 10 and 17 as means, write any two proportions.

2:10 :: 17:85 and 5:10 :: 17:34

step 1

Find the product of Means
10 x 17 = 170

step 2

If 2 ratios are in proportion, the product of Extremes and product of Means should be equal
Product of Extremes = Product of Means
Product of Extremes = 10 x 17
Product of Extremes = 170

step 3

To find the Extremes, find the factors of 170
Factors of 170 = 2, 5, 85, 34

step 4

Write the possible pair of multiplication factors (Extremes) that makes 170
2 x 85 = 170
5 x 34 = 170
Either 2 & 85 or 5 & 34 are the the Extremes of this proportion

step 5

Apply the Extreme values in the proportion statement
Product of Extremes = Product of Means
2 x 85 = 10 x 17
or
5 x 34 = 10 x 17
or

step 6

Write the above expression in the fraction form
So,

2 x 85 = 10 x 17 can be written as

210

1785

similarly,

5 x 34 = 10 x 17 can be written as

510

1734

step 7

Write the above fractions in the ratio form
2:10 = 17:85
or
5:10 = 17:34

step 8

Therefore, the two proportions are
2:10 :: 17:85 & 5:10 :: 17:34

Using 7 and 28 as means, write any two proportions.

4:7 :: 28:49 and 2:7 :: 28:98

step 1

Find the product of Means
7 x 28 = 196

step 2

If 2 ratios are in proportion, the product of Extremes and product of Means should be equal
Product of Extremes = Product of Means
Product of Extremes = 7 x 28
Product of Extremes = 196

step 3

To find the Extremes, find the factors of 196
Factors of 196 = 4, 2, 49, 98

step 4

Write the possible pair of multiplication factors (Extremes) that makes 196
4 x 49 = 196
2 x 98 = 196
Either 4 & 49 or 2 & 98 are the the Extremes of this proportion

step 5

Apply the Extreme values in the proportion statement
Product of Extremes = Product of Means
4 x 49 = 7 x 28
or
2 x 98 = 7 x 28
or

step 6

Write the above expression in the fraction form
So,

4 x 49 = 7 x 28 can be written as

2849

similarly,

2 x 98 = 7 x 28 can be written as

2898

step 7

Write the above fractions in the ratio form
4:7 = 28:49
or
2:7 = 28:98

step 8

Therefore, the two proportions are
4:7 :: 28:49 & 2:7 :: 28:98

Using 6 and 9 as means, write any two proportions.

3:6 :: 9:18 and 2:6 :: 9:27

step 1

Find the product of Means
6 x 9 = 54

step 2

If 2 ratios are in proportion, the product of Extremes and product of Means should be equal
Product of Extremes = Product of Means
Product of Extremes = 6 x 9
Product of Extremes = 54

step 3

To find the Extremes, find the factors of 54
Factors of 54 = 3, 2, 18, 27

step 4

Write the possible pair of multiplication factors (Extremes) that makes 54
3 x 18 = 54
2 x 27 = 54
Either 3 & 18 or 2 & 27 are the the Extremes of this proportion

step 5

Apply the Extreme values in the proportion statement
Product of Extremes = Product of Means
3 x 18 = 6 x 9
or
2 x 27 = 6 x 9
or

step 6

Write the above expression in the fraction form
So,

3 x 18 = 6 x 9 can be written as

918

similarly,

2 x 27 = 6 x 9 can be written as

927

step 7

Write the above fractions in the ratio form
3:6 = 9:18
or
2:6 = 9:27

step 8

Therefore, the two proportions are
3:6 :: 9:18 & 2:6 :: 9:27

Using 5 and 22 as means, write any two proportions.

2:5 :: 22:55 and 10:5 :: 22:11

step 1

Find the product of Means
5 x 22 = 110

step 2

If 2 ratios are in proportion, the product of Extremes and product of Means should be equal
Product of Extremes = Product of Means
Product of Extremes = 5 x 22
Product of Extremes = 110

step 3

To find the Extremes, find the factors of 110
Factors of 110 = 2, 10, 55, 11

step 4

Write the possible pair of multiplication factors (Extremes) that makes 110
2 x 55 = 110
10 x 11 = 110
Either 2 & 55 or 10 & 11 are the the Extremes of this proportion

step 5

Apply the Extreme values in the proportion statement
Product of Extremes = Product of Means
2 x 55 = 5 x 22
or
10 x 11 = 5 x 22
or

step 6

Write the above expression in the fraction form
So,

2 x 55 = 5 x 22 can be written as

2255

similarly,

10 x 11 = 5 x 22 can be written as

105

2211

step 7

Write the above fractions in the ratio form
2:5 = 22:55
or
10:5 = 22:11

step 8

Therefore, the two proportions are
2:5 :: 22:55 & 10:5 :: 22:11

Using 5 and 38 as means, write any two proportions.

10:5 :: 38:19 and 2:5 :: 38:95

step 1

Find the product of Means
5 x 38 = 190

step 2

If 2 ratios are in proportion, the product of Extremes and product of Means should be equal
Product of Extremes = Product of Means
Product of Extremes = 5 x 38
Product of Extremes = 190

step 3

To find the Extremes, find the factors of 190
Factors of 190 = 10, 2, 19, 95

step 4

Write the possible pair of multiplication factors (Extremes) that makes 190
10 x 19 = 190
2 x 95 = 190
Either 10 & 19 or 2 & 95 are the the Extremes of this proportion

step 5

Apply the Extreme values in the proportion statement
Product of Extremes = Product of Means
10 x 19 = 5 x 38
or
2 x 95 = 5 x 38
or

step 6

Write the above expression in the fraction form
So,

10 x 19 = 5 x 38 can be written as

105

3819

similarly,

2 x 95 = 5 x 38 can be written as

3895

step 7

Write the above fractions in the ratio form
10:5 = 38:19
or
2:5 = 38:95

step 8

Therefore, the two proportions are
10:5 :: 38:19 & 2:5 :: 38:95

Using 3 and 66 as means, write any two proportions.

9:3 :: 66:22 and 11:3 :: 66:18

step 1

Find the product of Means
3 x 66 = 198

step 2

If 2 ratios are in proportion, the product of Extremes and product of Means should be equal
Product of Extremes = Product of Means
Product of Extremes = 3 x 66
Product of Extremes = 198

step 3

To find the Extremes, find the factors of 198
Factors of 198 = 9, 11, 22, 18

step 4

Write the possible pair of multiplication factors (Extremes) that makes 198
9 x 22 = 198
11 x 18 = 198
Either 9 & 22 or 11 & 18 are the the Extremes of this proportion

step 5

Apply the Extreme values in the proportion statement
Product of Extremes = Product of Means
9 x 22 = 3 x 66
or
11 x 18 = 3 x 66
or

step 6

Write the above expression in the fraction form
So,

9 x 22 = 3 x 66 can be written as

6622

similarly,

11 x 18 = 3 x 66 can be written as

113

6618

step 7

Write the above fractions in the ratio form
9:3 = 66:22
or
11:3 = 66:18

step 8

Therefore, the two proportions are
9:3 :: 66:22 & 11:3 :: 66:18

Using 6 and 6 as means, write any two proportions.

3:6 :: 6:12 and 4:6 :: 6:9

step 1

Find the product of Means
6 x 6 = 36

step 2

If 2 ratios are in proportion, the product of Extremes and product of Means should be equal
Product of Extremes = Product of Means
Product of Extremes = 6 x 6
Product of Extremes = 36

step 3

To find the Extremes, find the factors of 36
Factors of 36 = 3, 4, 12, 9

step 4

Write the possible pair of multiplication factors (Extremes) that makes 36
3 x 12 = 36
4 x 9 = 36
Either 3 & 12 or 4 & 9 are the the Extremes of this proportion

step 5

Apply the Extreme values in the proportion statement
Product of Extremes = Product of Means
3 x 12 = 6 x 6
or
4 x 9 = 6 x 6
or

step 6

Write the above expression in the fraction form
So,

3 x 12 = 6 x 6 can be written as

612

similarly,

4 x 9 = 6 x 6 can be written as

step 7

Write the above fractions in the ratio form
3:6 = 6:12
or
4:6 = 6:9

step 8

Therefore, the two proportions are
3:6 :: 6:12 & 4:6 :: 6:9

Using 2 and 87 as means, write any two proportions.

3:2 :: 87:58 and 6:2 :: 87:29

step 1

Find the product of Means
2 x 87 = 174

step 2

If 2 ratios are in proportion, the product of Extremes and product of Means should be equal
Product of Extremes = Product of Means
Product of Extremes = 2 x 87
Product of Extremes = 174

step 3

To find the Extremes, find the factors of 174
Factors of 174 = 3, 6, 58, 29

step 4

Write the possible pair of multiplication factors (Extremes) that makes 174
3 x 58 = 174
6 x 29 = 174
Either 3 & 58 or 6 & 29 are the the Extremes of this proportion

step 5

Apply the Extreme values in the proportion statement
Product of Extremes = Product of Means
3 x 58 = 2 x 87
or
6 x 29 = 2 x 87
or

step 6

Write the above expression in the fraction form
So,

3 x 58 = 2 x 87 can be written as

8758

similarly,

6 x 29 = 2 x 87 can be written as

8729

step 7

Write the above fractions in the ratio form
3:2 = 87:58
or
6:2 = 87:29

step 8

Therefore, the two proportions are
3:2 :: 87:58 & 6:2 :: 87:29

Write Any Two Proportions by Using Means

Finding Extremes from Means of Proportion Worksheet

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