Foundations Unit F3

Fractions

See them, add them, multiply them — and know why the rules work.

What a fraction really is, equivalent fractions and simplifying, comparing, why adding needs a common denominator, multiplying as "of", dividing by flipping, and converting between mixed and improper forms.

Why fractions exist

Three friends share two chocolate bars equally. How much does each person get? No whole number can answer that — the answer lives between 00 and 11 bar. Fractions are the numbers invented for exactly this gap: 23\frac{2}{3} of a bar each. Any time something is shared, measured, or split — a bill, a recipe, a tank of gas — the whole numbers run out, and fractions take over.

Read a fraction like a measurement

A fraction is a number for part of a whole, and its two halves have different jobs. The bottom number — the denominator — names the size of piece you’re working with: cut the whole into 44 equal parts and each part is “a fourth.” The top number — the numerator — just counts them. So 34\frac{3}{4} reads like a measurement: three fourths, the same way “3 inches” is three of a unit called an inch.

That reading does real work. It tells you a proper fraction (34\frac{3}{4}) is less than one whole, while an improper one (73\frac{7}{3} — seven thirds, more than two wholes) is not. And it will explain, in a moment, why adding fractions has a rule that multiplication doesn’t need: you can only count together pieces of the same size.

Equivalent fractions — the same amount, sliced differently

Cut every piece of a half-shaded bar in two and you get 24\frac{2}{4}: more pieces, smaller pieces, same shaded amount. Multiply top and bottom by the same number and the value never moves:

12=24=36=48.\frac{1}{2} = \frac{2}{4} = \frac{3}{6} = \frac{4}{8}.

Going the other way is simplifying: divide top and bottom by their greatest common factor — the GCF you built in F2 — to use the fewest, biggest pieces:

1824=18÷624÷6=34.\frac{18}{24} = \frac{18 \div 6}{24 \div 6} = \frac{3}{4}.

Which fraction is bigger?

Here’s the first place whole-number instinct betrays you: 18\frac{1}{8} looks bigger than 15\frac{1}{5}, because 8>58 > 5 and years of arithmetic trained you that bigger digits mean bigger numbers. But the denominator counts cuts, and more cuts make smaller pieces — an eighth of a pizza is the sad sliver. The instinct isn’t wrong, it’s aimed at the wrong number: it works on the tops, once the pieces match.

So to compare fairly, make the pieces match. For 23\frac{2}{3} vs 35\frac{3}{5}, rename both in fifteenths: 1015\frac{10}{15} vs 915\frac{9}{15} — now the tops decide, and 23\frac{2}{3} wins. (Cross-multiplying2×5=102 \times 5 = 10 against 3×3=93 \times 3 = 9 — is that same renaming with the writing skipped.)

Adding: count pieces that match

Add 12+13\frac{1}{2} + \frac{1}{3}. The tempting move — add tops, add bottoms, get 25\frac{2}{5} — feels right for a good reason: that is exactly how multiplying works, and “do the operation to everything you see” usually serves you well. But watch it break on the simplest case: 12+12\frac{1}{2} + \frac{1}{2} would give 24=12\frac{2}{4} = \frac{1}{2} — pour half a glass into half a glass and end up with… half a glass? Impossible. The move fails because halves and thirds are different units: “1 half + 1 third = 2 somethings” has no unit to count in, any more than 1 inch + 1 mile = 2 anythings.

The fix is the renaming trick you just learned — rewrite both in a unit they share:

find the shared unit
Halves and thirds both slice evenly into sixths — that’s the LCM of 22 and 33 from F2.
rename
12=36\frac{1}{2} = \frac{3}{6} and 13=26\frac{1}{3} = \frac{2}{6}.
now just count
33 sixths ++ 22 sixths =56= \frac{5}{6}.

That’s the whole rule: common denominator first, then add the tops — because the denominator is a unit, and only matching units can be counted together.

//
common denominatorThe least common denominator of and is .
rename and
add the tops
simplify
Add / subtract with a common denominator

The widget opens on 34+16\frac{3}{4} + \frac{1}{6} — predict the common denominator before looking (what’s the LCM of 44 and 66?). Then set 12+12\frac{1}{2} + \frac{1}{2} and confirm the tops-and-bottoms answer 24\frac{2}{4} is not what the bars show.

Multiplying: ”×” means “of”

A recipe calls for 34\frac{3}{4} cup of flour and you’re making half a batch. You need half of three-quarters — and that of is what multiplication means, a thread that started with whole numbers (3×43 \times 4 is three groups of four). Picture the measuring cup: take the 34\frac{3}{4}, slice it in half, keep one layer: 38\frac{3}{8}. Tops multiplied, bottoms multiplied — and no common denominator needed, because you’re not counting two amounts in a shared unit; you’re re-slicing one amount.

//
of the width (terracotta) of the height (sage). The overlap is of cells.
multiply across
simplify
Multiply as an area, divide by flipping

The grid shows 23×910\frac{2}{3} \times \frac{9}{10} as an overlap of shadings. Before you look: will the answer be bigger or smaller than 910\frac{9}{10}? Smaller — taking two-thirds of something leaves less than you started with. “Multiplying makes things bigger” is another piece of whole-number instinct that fractions retire.

Dividing: how many fit?

3÷123 \div \frac{1}{2} asks: how many half-cups fit in 3 cups? Six — dividing by a small number gives a big answer. Fit-counting is also why the famous keep · change · flip works: halves fit into things exactly twice as often as wholes do, so dividing by 12\frac{1}{2} is multiplying by 22 — and in general, dividing by 25\frac{2}{5} is multiplying by 52\frac{5}{2}. The flip isn’t magic; it’s the fit-count turned into one multiplication. Switch the widget above to ÷\div and test it: 34÷25=34×52=158\frac{3}{4} \div \frac{2}{5} = \frac{3}{4} \times \frac{5}{2} = \frac{15}{8} — bigger than 34\frac{3}{4}, exactly because the divisor is smaller than 11.

Mixed and improper are the same number

73\frac{7}{3} and 2132\frac{1}{3} are one value in two outfits: improper form is easiest to calculate with, mixed form easiest to read (“a bit over two”). Convert freely.

Improper → mixed

/

remainder — the quotient is the whole part, the remainder stays over 3.

Mixed → improper

/

— whole × denominator, plus the numerator, all over 3.

Convert between forms

Predict before you type: how does 73\frac{7}{3} become a mixed number? (How many whole 33s fit in 77, and what’s left over?) Then go the other way with 2342\frac{3}{4}.

The one thing to remember

The denominator is a unit and the numerator counts it. Everything else follows: renaming a fraction changes the unit without changing the amount; adding needs matching units; multiplying means “of” and just re-slices; dividing counts how many times one amount fits into another.

The four rules

OperationRuleExample
Add / SubtractMake a common denominator, then add or subtract the tops.34+16=912+212=1112\frac{3}{4} + \frac{1}{6} = \frac{9}{12} + \frac{2}{12} = \frac{11}{12}
MultiplyStraight across: tops ×\times tops, bottoms ×\times bottoms. Cancel first if you can.23×910=1830=35\frac{2}{3} \times \frac{9}{10} = \frac{18}{30} = \frac{3}{5}
DivideKeep · Change · Flip — multiply by the reciprocal.34÷25=34×52=158\frac{3}{4} \div \frac{2}{5} = \frac{3}{4} \times \frac{5}{2} = \frac{15}{8}
SimplifyDivide top and bottom by their GCF.1824=34\frac{18}{24} = \frac{3}{4}

A worked sum, step by step

common denominator
The least common denominator of 44 and 66 is 1212.
rename
34=912\frac{3}{4} = \frac{9}{12} and 16=212\frac{1}{6} = \frac{2}{12}
add the tops
912+212=1112\frac{9}{12} + \frac{2}{12} = \frac{11}{12}
simplify
1112\frac{11}{12} is already in lowest terms — its GCF is 11.
//
common denominatorThe least common denominator of and is .
rename and
add the tops
simplify
//
of the width (terracotta) of the height (sage). The overlap is of cells.
multiply across
simplify

Improper → mixed

/

remainder — the quotient is the whole part, the remainder stays over 3.

Mixed → improper

/

— whole × denominator, plus the numerator, all over 3.

Write as an improper fraction.

Multiply the whole number by the denominator, add the numerator, and keep the denominator.

Correct: 0Attempts: 0Streak: 0Best: 0