Add & Subtract Mixed Numbers

Grade 5 Math – Complete Notes & Formulae

Estimate Sums & Differences

Round each mixed number to nearest whole (ignore fraction part for quick estimate).
Example: \(3\frac{3}{4} + 2\frac{1}{5} \approx 4 + 2 = 6\)
Benchmarks: Use 0, \(\frac{1}{2}\), or 1 for fraction part to get closer estimates.

Add whole numbers together.
Find the least common denominator (LCD) for the fractions. Rewrite both fractions using LCD.
Add the fractions. If the result is improper (\(>\) 1), regroup by adding 1 to the whole number part.
Simplify if needed.
Example: \(2\frac{1}{3} + 3\frac{1}{4}:\)
Whole: \(2 + 3 = 5\), LCD = 12.
\(\frac{1}{3} = \frac{4}{12}\), \(\frac{1}{4} = \frac{3}{12}\)
\(\frac{4}{12} + \frac{3}{12} = \frac{7}{12}\)
Final: \(5\frac{7}{12}\)

Formula: \( a\frac{b}{m} + c\frac{d}{n} = (a+c) + \Big[\frac{b}{m} + \frac{d}{n}\Big] \)

Formula: \( a\frac{b}{m} - c\frac{d}{n} = (a-c) + \Big[\frac{b}{m} - \frac{d}{n}\Big] \)

Without regrouping: Fraction sum/difference ≤ 1, no need to adjust whole number.
With regrouping: Fraction sum > 1, or need to borrow for subtraction. Adjust whole parts accordingly.
Example: \(1\frac{3}{5} + 2\frac{4}{5} = 3\frac{7}{5} = 4\frac{2}{5}\) (since \(\frac{7}{5} = 1\frac{2}{5}\))

Identify action (add/subtract). Convert all mixed numbers to improper, find LCD, solve, then simplify as mixed number if needed.
For multi-step: solve each operation in order, simplify after each.
Example: A recipe calls for \(2\frac{3}{4}\) cups + \(1\frac{2}{3}\) cups.
Improper: \(\frac{11}{4}\) + \(\frac{5}{3}\). LCD 12: \(\frac{33}{12} + \frac{20}{12} = \frac{53}{12} = 4\frac{5}{12}\)

Solve for missing values using inverse operations (subtract/add as needed).
To compare, solve both mixed number calculations first, then compare results (whole part first, fractions next).

Tip: Clearly show steps for full marks—especially regrouping!