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−n음수 Lab

It was 3°C and the temperature dropped 5 degrees. What is it now — what is 3 − 5?

Negative numbers extend the line below zero — and in stretching left, numbers gained a direction.

Experiment

Hands-on experiment

🔮 Predict first — it's 3°C and the temperature drops 5 degrees. What is 3 − 5?

🌡 Move the thermometer

Starting at 3°C. What happens when you pass below zero?

-6-4-20246

3

current temperature

📖 Read more — why it exists · insights · common mistakes · formulasExpand ▾

Why

Why does this exist?

With naturals and fractions alone, 'take 5 from 3' had no answer. Yet the world kept asking — freezing cold, basement floors, debts to repay.

The fix: extend the number line, which used to stop at 0, to the left. Call the number one below zero −1, two below −2 — and 3 − 5 = −2 gives every subtraction an answer.

As a bonus, numbers acquired direction: + to the right (up, gain), − to the left (down, loss). Temperature, altitude, balance — worlds spreading both ways from a zero point fit into one number system.

Insight

Insights from the video

The heart of a negative is direction, not size.

−3 means '3, the other way'. Once direction rides on numbers, subtraction becomes 'moving the opposite way' — and the seed of vectors is planted.

Zero is not the end — it's the middle.

Accepting negatives changes zero's status: no longer the left end of the line but its center. Seeing symmetric sides of a reference point is where coordinates and graphs begin.

Misconception

Common misconceptions

−5 is greater than −2 — because 5 beats 2.

On the number line −5 sits left of −2 — smaller. Minus five degrees is colder than minus two; a $5 debt is poorer than a $2 debt. Among negatives, the bigger the absolute value, the smaller the number.

Negative times negative is positive 'just because' — a rule to memorize.

Multiplying by (−1) is a flip of direction. Flip once: reversed (−). Flip twice: back where you started (+) — like a mirror image of a mirror image. Not a rule but the logic of flipping.

Formula

Writing it as math

What the thermometer showed, in mathematical language.

Defining negatives

The number n below zero is −n. Extend the line leftward and every subtraction gains an answer.

Comparing

Further left is smaller. Among negatives, larger absolute value means a smaller number — minus five is colder than minus two.

Multiplying signs

×(−1) is a direction flip. Two flips return you home — (−)×(−)=+ is the logic of flipping, not memorization.

In Real Life

Where you meet it in real life

Weather

−12°C on the winter forecast. Changes too: 'seven degrees colder than yesterday' is written −7.

Bank balances and debt

A balance of −$50 means $50 owed. Accounting's 'in the red' comes from writing negatives in red ink.

Elevators and sea level

Basement 3 = floor −3; 200m under the sea = elevation −200m. Negatives are the language for below-the-reference.

Sports scores

Golf's −7 (under par) means seven strokes fewer than par — in golf, negative is good. A goal difference of −2 uses the same grammar.

Try Yourself

Test yourself

Q1Which is greater: −3 or −7?Show answer ▾

−3 — it sits right of −7, closer to zero. Just as minus three degrees is warmer than minus seven.

Q2What is (−2) + 5? Think on the thermometer.Show answer ▾

From 2 below zero, rise 5 degrees: 3 above — (−2) + 5 = 3. Adding with negatives never confuses when seen as movement on the line.

Q3Why is (−3) × (−4) equal to +12?Show answer ▾

It's 3 × 4 = 12 with two flips — two factors of (−1) flip the direction twice, landing back at +. Odd flips give −, even flips give +.

💡 Try answering yourself before revealing it — getting it wrong is where learning starts.

Watch

Related video

The invention that answered 3 − 5 — negativesThe video link is coming soonBrowse the YouTube channel →

Connection

Concepts connect

Leads to next

a/b

Fractions

Below zero is filled; now the gap between 0 and 1 — fractions fill in the rest of the line.

Go to the Fractions lab →

Related

Labs worth exploring together

Related lab

a/b

Fractions

Below one (fractions) and below zero (negatives) — numbers expanded in two directions.

Go to the Fractions lab →

Related lab

v⃗

Vectors

'Size plus direction' — grow the negative's idea into two dimensions and you get vectors.

Go to the Vectors lab →