Subtracting mixed numbers might seem tricky at first, but with a few steps, it becomes straightforward. Let’s break it down.
Step-by-Step Guide
- Convert Mixed Numbers to Improper Fractions
Mixed numbers consist of a whole number and a fraction. To subtract them, first convert each mixed number to an improper fraction. An improper fraction has a numerator larger than its denominator. For example, to convert
$2frac{3}{4}$:- Multiply the whole number by the denominator: $2 times 4 = 8$
- Add the numerator to the result: $8 + 3 = 11$
- Place the result over the original denominator: $frac{11}{4}$
- Find a Common Denominator
To subtract fractions, they must have the same denominator. If the fractions already share a denominator, you can skip this step. Otherwise, find the least common denominator (LCD). For instance, if subtracting $frac{11}{4}$ and $frac{5}{6}$, the LCD of 4 and 6 is 12.
- Convert Fractions to Equivalent Fractions
Convert each fraction to an equivalent fraction with the LCD as the new denominator:- For $frac{11}{4}$: $frac{11 times 3}{4 times 3} = frac{33}{12}$
- For $frac{5}{6}$: $frac{5 times 2}{6 times 2} = frac{10}{12}$
- Subtract the Numerators
Now that the fractions have the same denominator, subtract the numerators:
$frac{33}{12} – frac{10}{12} = frac{23}{12}$
- Simplify the Result
If the resulting fraction is improper, convert it back to a mixed number:- Divide the numerator by the denominator: $23 div 12 = 1$ remainder $11$
- The quotient is the whole number, and the remainder is the new numerator: $1frac{11}{12}$
Example Problem
Let’s subtract $3frac{2}{5}$ from $5frac{3}{10}$:
- Convert to improper fractions:
- $5frac{3}{10} = frac{53}{10}$
- $3frac{2}{5} = frac{17}{5} = frac{34}{10}$
- Find the common denominator (which is 10 here).
- Convert to equivalent fractions:
- $frac{53}{10}$ (already has the common denominator)
- $frac{34}{10}$ (already has the common denominator)
- Subtract the numerators:
- $frac{53}{10} – frac{34}{10} = frac{19}{10}$
- Simplify the result:
- $frac{19}{10} = 1frac{9}{10}$
Conclusion
Subtracting mixed numbers involves converting them to improper fractions, finding a common denominator, subtracting, and simplifying the result. With practice, these steps become second nature, making the process much easier.