Foundations Unit F5
Percentages
Percent of a number, percent change, and working backwards.
What a percent really is, how to take a percent of a number, measure percent change, and reverse it.
Builds on: F3 · Fractions F4 · Decimals & Place Value
Why percents exist
You scored out of on one quiz and out of on another. Which went better? It’s genuinely hard to say — the wholes are different sizes, so the tops can’t be compared directly. But rescale both to marks out of and the fog lifts: versus . That rescaling is the whole idea of a percent: a common ruler for parts of different-sized wholes, so anything can be compared with anything at a glance. It’s why test scores, interest rates, discounts, tips, and battery indicators all speak percent.
A percent is a fraction you already know
Percent means “per hundred.” So is simply out of — and you already own two ways of writing that. From F3, it’s the fraction , which simplifies to . From F4, it’s the decimal , because dividing by moves the point two places left. Every percent is those same three things wearing different clothes, and changing outfits is just two hops of the decimal point: percent → decimal hops left (), decimal → percent hops right ().
Before you scroll on, make three predictions and check each in the grid: type — is that or as a decimal? Type — half a percent, which is much less than a half. And type — the grid runs out of cells, but the number doesn’t: a percent above just means more than one whole.
Taking a percent of a number
Dinner cost $ and the service was great, so you want to tip . No formula yet — build it from pieces you can hold in your head:
Now the shortcut. In F3 you saw that multiplying is taking a fraction of something. ” of ” is exactly that sentence: . Same answer, one multiplication — and that’s the general rule:
One habit worth naming: a percent is never an amount by itself — it’s always a percent of something. of a coffee and of a house are wildly different sums of money. Until you know the base , "" has no size.
Try of — but predict it first with the anchors ( is , half of that is …), then let the widget confirm and show the breakdown.
Measuring change
Your favorite sneakers went from $ to $. The raw change is $ — but is that a big jump? On an $ base it’s a quarter of what you started with, so it’s a increase. That’s the rule: compare the change to the original value.
Here’s why the classic mistake — dividing by the new value — feels so natural: the new number is the one in front of you, and comes out cleaner than . But watch it break: run the same price in reverse, $ down to $, and the drop is . Same $ gap, different percent — because what changed is the starting point you measure from. A percent change always answers “how big was the move compared to where I began?”
Type , then swap to , and watch the up-and-down percents refuse to match.
The multiplier shortcut
Here’s the idea that turns percent problems into one-step problems. After a increase you have all of what you started with plus of it — that’s of it, or in a single multiplication. A decrease means you keep : . Every percent change is secretly one multiplier.
Stacking changes
A store raises prices , then announces a ” off” sale. Back to the original price? It certainly feels like it — and cancel, don’t they? Predict what the chain below will land on, then look:
. The intuition "" fails because the two percents stand on different bases: the cut acts on , a bigger number, so it takes away more than the raise added. Percent changes never add — their multipliers multiply: , a loss. Try then (worse: ), and then (more than : ).
Working backwards
A jacket costs $ after a markup. What did it cost before? The tempting move is to take off and answer $ — but you can now say exactly why that fails: the was measured on the original price, not on . Think forward first: . Undoing a multiplication is division, so the original is dollars. Check it: ✓ — while ✗.
Toggle between the right and wrong approaches in the widget and watch how far apart they land as the percent grows.
The one thing to remember
Percent means per hundred — a fraction and a decimal in different clothes. From there, every percent question is a multiplier question: of is , a change is one multiplication by , and undoing a change is dividing by that multiplier. And a percent change is always measured against where you started.
Conversions
| Percent | Decimal | Fraction |
|---|---|---|
Formulas
- Percent of a number:
- Percent change:
- Apply a change: increase by ; decrease
- Undo a change: divide the final value by that multiplier