6th Grade Fraction Operations Mixed Review P1 2025

Order & Compare Fractions

Fraction Operations

Word Problems

Equivalent Fractions & Missing Values

Vocabulary & Fraction Concepts

100

Write ⅗, ¾, and ⁴/₁₀ in order from least to greatest.

⁴/₁₀ < ⅗ < ¾

100

Add: 1⁄2 + 3⁄4 + 1⁄8 =

1 3⁄8

100

Mia drank 1 1⁄2 cups of juice and then 2⁄3 cup more. How much total?

2 1⁄6 cups

100

Find the missing numerator: ?⁄24 = ¾

100

Define numerator.

The top number of a fraction that shows how many equal parts of the whole that we have.

200

Using >, <, or ="

Compare: ²/₅ ___ ⁷⁄₁₅

²/₅ < ⁷⁄₁₅

200

Subtract: 1 – ⅗ – 1/10 =

3⁄10

200

A farmer harvested 5½ bushels of apples and sold 3¾ bushels. How many left?

1¾ bushels

200

Find the missing numerator: 2⁄5 = ?⁄55.

200

Define denominator.

The bottom number of a fraction that shows how many equal parts make a whole.

300

Write 3⁄8, 5⁄6, and 2⁄3 in order from least to greatest.

3⁄8, 2⁄3, 5⁄6

300

Add: 2⅔+ 5⅙ + ½ =

8 ⅓

300

A recipe calls for 2⁄3 cup milk and 1⁄4 cup oil. How much total liquid?

11⁄12 cups total liquid

300

Find the LCM of the following fraction's denominators: 1/2, 3/4, 5/6, 2/9.

Then, convert each fraction to an equivalent fraction whose denominator is that LCM.

Finally, find their combined value.

LCM Common Denominator: 36ths.

Converted fractions: 18/36, 27/36, 30/36, & 8/36.

Combined value: 83/36 or 2 11/36

300

What is a mixed number? Give an example.

A number made of a whole number and a fraction.

E.g. 3⅗

400

Using >, <, or =:

Compare: ⁵⁄₁₂ ___ ¹⁄₂

Compare: ⁹⁄₁₆ ___ ¹⁄₂

Compare: ³²/₆₄ ___ ¹⁄₂

Compare: ⁵⁄₁₂ ___ ⁴/₇

⁵⁄₁₂ < ¹⁄₂

⁹⁄₁₆ > ¹⁄₂

³²/₆₄ = ¹⁄₂

⁵⁄₁₂ < ⁴/₇

400

Simplify: (4⁄5 + 1⁄5) – 3⁄10 =

7/10

400

Liam ran 2 ⅓ miles Monday and 1 ¾ miles Tuesday. Total distance?

4 1⁄12 miles

400

Simplify the following fractions.

2/12, 18/24, 48/60, & 175/200

1/6, 3/4, 4/5, & 7/8

400

Why must fractions have a common denominator to add or subtract?

Because fractions must refer to the same-sized parts to combine accurately.

500

Write 4⁄5, 3/4, 3/2, 75/100, 0/1, 1/2, 2/5 and 7⁄10 in order from least to greatest.

0/1, 2/5, 1/2, 67/100, 7/10, 75/100, 4/5, 3/2

500

Subtract: (7⁄8 + 1⁄4) – 5⁄8 =

1/2 (4/8 should be simplified)

500

A ribbon is 8 ⅛ ft long. How many 2 ⅝ ft sections can be cut from it and how much leftover ribbon remains?

3 sections measuring 2⅝ ft can be cut from the given ribbon and ¼ ft ribbon remains.

500

Convert 63/90 to an equivalent fraction whose denominator is 100.

70/100

500

Explain how equivalent fractions help with fraction operations and give an example.

They let us rewrite fractions with a new denominator while keeping the same overall value. This allows us to convert fractions so they can be more readily added, subtracted, multiplied, or divided.

E.g. By quintupling the numerator and denominator of 17/20, we can see what it's value is as a percentage out of 100.