Perform all four operations on mixed numbers — add, subtract, multiply, divide. Converts to improper fractions, shows step-by-step solution, visual parts, and simplification.
The **Mixed Number Calculator** performs all four arithmetic operations — addition, subtraction, multiplication, and division — on mixed numbers. Enter two mixed numbers (or simple fractions), pick an operation, and see the step-by-step solution from conversion through simplification.
Mixed numbers combine a whole number with a proper fraction, like 3 2/5. While they're intuitive for everyday use (recipes, measurements, construction), performing arithmetic with them requires converting to improper fractions first, then applying the appropriate operation, and finally converting back. This calculator automates the entire process while showing every intermediate step so you can learn the method.
For addition and subtraction, the calculator finds the least common denominator (LCD) and handles borrowing when necessary. For multiplication and division, it applies cross-cancellation where possible to keep the numbers small. The final answer is always fully simplified and shown as both an improper fraction and a mixed number.
Visual fraction bars display both inputs and the result, giving you an intuitive sense of the operation. The step-by-step table documents each transformation — mixed-to-improper conversion, LCD finding, scaling, arithmetic, simplification, and mixed-number conversion — so you can replicate the work on paper. Presets let you explore common problems instantly, and a reference table at the bottom covers popular mixed number calculations.
Mixed numbers are common in everyday measurements, but they are awkward to compute with directly. This calculator makes the transition explicit by converting each mixed number to an improper fraction, applying the chosen operation, and then converting the simplified result back into mixed-number form.
That makes it useful for both learning and checking work. You can see the exact arithmetic structure behind the answer instead of only the final mixed number, which helps with recipes, construction measurements, and classroom fraction problems.
Convert mixed to improper: a b/c = (a×c+b)/c. Then apply the operation (+, −, ×, ÷) and simplify.
Result: 2 1/3 + 1 1/4 = 3 7/12.
Convert 2 1/3 to 7/3 and 1 1/4 to 5/4. Using an LCD of 12 gives 28/12 + 15/12 = 43/12, which is 3 7/12.
Mixed numbers are often the most natural way to say a quantity out loud, but arithmetic is cleaner once each value is rewritten as a single fraction. That is why the first real step in most mixed-number problems is conversion, not direct computation.
Addition and subtraction mainly go wrong when the common denominator step is skipped. Multiplication and division mainly go wrong when a mixed number is left unconverted or when the reciprocal is applied to the wrong factor. Showing the full step sequence makes those mistakes easier to catch.
Once the arithmetic is complete, simplify the improper fraction first. Then divide the numerator by the denominator to recover the mixed-number form in lowest terms.
Convert both to improper fractions, find the LCD, add the numerators, then simplify and convert back to a mixed number. That keeps the arithmetic consistent because both quantities are rewritten in the same fraction form first.
Convert to improper fractions, find the LCD, subtract numerators. If borrowing is needed, it happens automatically during the improper fraction conversion.
Convert to improper fractions and multiply: (a/b) × (c/d) = (ac)/(bd). Simplify and convert back.
Convert to improper fractions, flip the second (reciprocal), and multiply. Simplify and convert back so the final answer is easy to read in mixed-number form when appropriate.
A fraction where the numerator is ≥ the denominator, like 7/3. It represents a value of 1 or more.
No. Common denominators are only needed for addition and subtraction. Multiplication works by multiplying across.
Divide the numerator and denominator by their greatest common divisor (GCD). The calculator does this automatically.