# Multiplying the common ordinary fractions: 71/102 × - 67/91 = ? The multiplication process explained. The result written: As a negative proper fraction (the numerator < the denominator). As a decimal number. As a percentage

## The latest common ordinary fractions that have been multiplied

 Multiply the common ordinary fractions: 71/102 × - 67/91 = ? Feb 29 11:21 UTC (GMT) Multiply the common ordinary fractions: - 44/27 × 29/536 = ? Feb 29 11:20 UTC (GMT) Multiply the common ordinary fractions: - 22/11 × - 5,293/16 = ? Feb 29 11:20 UTC (GMT) Multiply the common ordinary fractions: 86/16 × 492/25 = ? Feb 29 11:20 UTC (GMT) Multiply the common ordinary fractions: 45/19 × 100/45 = ? Feb 29 11:20 UTC (GMT) Multiply the common ordinary fractions: - 30/18 × - 36/8 = ? Feb 29 11:19 UTC (GMT) Multiply the common ordinary fractions: 105/135 × 76/195 = ? Feb 29 11:19 UTC (GMT) Multiply the common ordinary fractions: - 69/17 × - 42/30 = ? Feb 29 11:19 UTC (GMT) Multiply the common ordinary fractions: 78/115 × 229/69 = ? Feb 29 11:19 UTC (GMT) Multiply the common ordinary fractions: 96/37 × 114/32 = ? Feb 29 11:19 UTC (GMT) All the common ordinary fractions multiplied by the users

## Multiplying fractions. How to multiply ordinary math fractions? Steps. Example.

### How to multiply two fractions?

#### When we multiply ordinary fractions, the end fraction will have:

• as a numerator, the result of multiplying all the numerators of the fractions,
• as a denominator, the result of multiplying all the denominators of the fractions.
• a/b × c/d = (a × c) / (b × d)
• a, b, c, d are integer numbers;
• if the pairs (a × c) and (b × d) are not coprime (they have common prime factors) the end fraction should be reduced (simplified) to lower terms.