Subtracting Fractions Worksheets

Use the links below to generate random and differentiated subtracting fraction worksheets on the given topic.

These worksheets ask fraction subtraction questions like 234 – 114 = ___

In case you’ve forgotten:

  • The numerator is the number at the top of the fraction.
  • The denominator is the number at the bottom of the fraction.

Fraction Subtraction (Answer Cannot Be Negative)

For instance: 34 – 14 = _____.

Easy (Same Denominator)

Subtracting halves to tenths (up to 3 fractions)

Subtracting halves to tenths (up to 4 fractions)

Subtracting halves to tenths (up to 5 fractions)

Subtracting tenths to twentieths (up to 3 fractions)

Subtracting tenths to twentieths (up to 4 fractions)

Subtracting tenths to twentieths (up to 5 fractions)

Subtracting fractions to 100ths (up to 3 fractions)

Subtracting fractions to 100ths (up to 4 fractions)

Subtracting fractions to 100ths (up to 5 fractions)

Easy (Same Denominator, Allows Negative Answers)

Subtracting halves to tenths (up to 3 fractions)

Subtracting halves to tenths (up to 4 fractions)

Subtracting halves to tenths (up to 5 fractions)

Subtracting tenths to twentieths (up to 3 fractions)

Subtracting tenths to twentieths (up to 4 fractions)

Subtracting tenths to twentieths (up to 5 fractions)

Subtracting fractions to 100ths (up to 3 fractions)

Subtracting fractions to 100ths (up to 4 fractions)

Subtracting fractions to 100ths (up to 5 fractions)

Difficult (Mixed Denominator, No Negative Answers)

Subtracting halves to tenths (2 fractions)

Subtracting halves to tenths (up to 3 fractions)

Subtracting halves to tenths (3 fractions)

Subtracting tenths to twentieths (2 fractions)

Subtracting tenths to twentieths (up to 3 fractions)

Subtracting tenths to twentieths (3 fractions)

Subtracting fractions to 100ths (2 fractions – very difficult)

Subtracting fractions to 100ths (up to 3 fractions – very difficult)

Subtracting fractions to 100ths (up to 3 fractions – very difficult)

Difficult (Mixed Denominator, Allows Negative Answers)

Subtracting halves to tenths (2 fractions)

Subtracting halves to tenths (up to 3 fractions)

Subtracting halves to tenths (3 fractions)

Subtracting tenths to twentieths (2 fractions)

Subtracting tenths to twentieths (up to 3 fractions)

Subtracting tenths to twentieths (3 fractions)

Subtracting fractions to 100ths (2 fractions – very difficult)

Subtracting fractions to 100ths (up to 3 fractions – very difficult)

Subtracting fractions to 100ths (up to 3 fractions – very difficult)

Mixed Fraction Addition

A whole number is included with the fraction. For instance: 114 + 234 = _____.

Easy (Same Denominator, No Negative Answers)

Subtracting halves to tenths (2 fractions)

Subtracting halves to tenths (up to 3 fractions)

Subtracting halves to tenths (3 fractions)

Subtracting tenths to twentieths (2 fractions)

Subtracting tenths to twentieths (up to 3 fractions)

Subtracting tenths to twentieths (3 fractions)

Subtracting fractions to 100ths (2 fractions)

Subtracting fractions to 100ths (up to 3 fractions)

Subtracting fractions to 100ths (3 fractions)

Easy (Same Denominator, Allows Negative Answers)

Subtracting halves to tenths (2 fractions)

Subtracting halves to tenths (up to 3 fractions)

Subtracting halves to tenths (3 fractions)

Subtracting tenths to twentieths (2 fractions)

Subtracting tenths to twentieths (up to 3 fractions)

Subtracting tenths to twentieths (3 fractions)

Subtracting fractions to 100ths (2 fractions)

Subtracting fractions to 100ths (up to 3 fractions)

Subtracting fractions to 100ths (3 fractions)

Difficult (Mixed Denominator, No Negative Answers)

Subtracting halves to tenths (2 fractions)

Subtracting halves to tenths (up to 3 fractions)

Subtracting halves to tenths (3 fractions)

Subtracting tenths to twentieths (2 fractions – very difficult)

Subtracting tenths to twentieths (up to 3 fractions – very difficult)

Subtracting tenths to twentieths (3 fractions – very difficult)

Difficult (Mixed Denominator, Allows Negative Answers)

Subtracting halves to tenths (2 fractions)

Subtracting halves to tenths (up to 3 fractions)

Subtracting halves to tenths (3 fractions)

Subtracting tenths to twentieths (2 fractions – very difficult)

Subtracting tenths to twentieths (up to 3 fractions – very difficult)

Subtracting tenths to twentieths (3 fractions – very difficult)