Integers
Integers
What you'll learn
- Understand negative numbers and where they appear in real life
- Place integers on the number line and compare them
- Add, subtract, multiply, and divide integers correctly
- Apply commutative, associative, and distributive properties
Key concepts
Negative Numbers and the Number Line
Integers = { …, −4, −3, −2, −1, 0, 1, 2, 3, 4, … }
Negative numbers arise whenever a quantity goes below zero.
| Real-life situation | Positive | Negative |
|---|---|---|
| Temperature | Above 0°C | Below 0°C (−5°C) |
| Bank account | Credit (money in) | Debit/overdraft (−₹200) |
| Altitude | Above sea level | Below sea level (−50 m) |
| Floors in a building | Above ground | Basement (−1, −2) |
Number line:
← −6 −5 −4 −3 −2 −1 0 1 2 3 4 5 6 →
- Moving right → increasing value
- Moving left → decreasing value
- Every positive integer has a corresponding negative integer (called its opposite): opposite of 5 is −5
Absolute value |n| = distance from 0 (always positive or zero)
- |7| = 7, |−7| = 7, |0| = 0
Ordering integers:
- On the number line: the further right, the greater the value
- −1 > −5 (because −1 is to the right of −5)
- 0 > −3
Worked Example: Arrange in ascending order: 3, −8, 0, −2, 6, −1 Answer: −8, −2, −1, 0, 3, 6
Addition of Integers
Rule 1 — Same sign: Add absolute values, keep the common sign.
- (+4) + (+3) = +7
- (−4) + (−3) = −7
Rule 2 — Different signs: Subtract the smaller absolute value from the larger, take the sign of the larger.
- (+7) + (−3) = +(7−3) = +4
- (−7) + (+3) = −(7−3) = −4
Number line method: Start at the first number, move right for positive addend, left for negative.
Worked Example: (−5) + 8 Start at −5, move 8 right → land on 3
Additive inverse (opposite): a + (−a) = 0
- 6 + (−6) = 0
Subtraction of Integers
Key rule: Subtracting an integer = adding its opposite.
a − b = a + (−b)
| Expression | Rewrite | Result |
|---|---|---|
| 5 − 3 | 5 + (−3) | 2 |
| 5 − (−3) | 5 + 3 | 8 |
| −5 − 3 | −5 + (−3) | −8 |
| −5 − (−3) | −5 + 3 | −2 |
Worked Example: A submarine at −150 m dives a further 80 m. New depth? −150 − 80 = −150 + (−80) = −230 m
Multiplication of Integers
Sign rules for multiplication:
| Signs | Result | Example |
|---|---|---|
| Positive × Positive | Positive | (+3) × (+4) = +12 |
| Positive × Negative | Negative | (+3) × (−4) = −12 |
| Negative × Positive | Negative | (−3) × (+4) = −12 |
| Negative × Negative | Positive | (−3) × (−4) = +12 |
Memory tip: Same signs → Positive; Different signs → Negative
Product of multiple integers:
- Count the negative factors.
- Even number of negatives → Positive product
- Odd number of negatives → Negative product
Worked Example: (−2) × (−3) × (−4) × (+1) Three negatives (odd) → result is negative 2 × 3 × 4 × 1 = 24 → answer is −24
Division of Integers
Sign rules for division — same as multiplication:
| Signs | Result | Example |
|---|---|---|
| (+) ÷ (+) | Positive | 20 ÷ 5 = 4 |
| (+) ÷ (−) | Negative | 20 ÷ (−5) = −4 |
| (−) ÷ (+) | Negative | (−20) ÷ 5 = −4 |
| (−) ÷ (−) | Positive | (−20) ÷ (−5) = 4 |
Worked Example: The temperature drops 18°C equally over 6 hours. Change per hour? −18 ÷ 6 = −3°C per hour
Properties of Integer Operations
Commutative Property
| Operation | Commutative? | Example |
|---|---|---|
| Addition | Yes | (−3) + 5 = 5 + (−3) = 2 |
| Subtraction | No | 5 − 3 ≠ 3 − 5 |
| Multiplication | Yes | (−4) × 3 = 3 × (−4) = −12 |
| Division | No | 8 ÷ (−2) ≠ (−2) ÷ 8 |
Associative Property
| Operation | Associative? | Example |
|---|---|---|
| Addition | Yes | [(−2)+3]+4 = (−2)+[3+4] = 5 |
| Subtraction | No | (5−3)−1 ≠ 5−(3−1) |
| Multiplication | Yes | [(−2)×3]×(−4) = (−2)×[3×(−4)] = 24 |
| Division | No | (12÷6)÷2 ≠ 12÷(6÷2) |
Distributive Property
a × (b + c) = a×b + a×c
Works for integers with signs:
- (−3) × (4 + 5) = (−3)×4 + (−3)×5 = −12 + (−15) = −27
- Check: (−3) × 9 = −27 ✓
Worked Example (mental maths): Calculate (−7) × 99 = (−7) × (100 − 1) = (−7)×100 − (−7)×1 = −700 + 7 = −693
Identity and Zero Properties
| Property | Statement | Example |
|---|---|---|
| Additive identity | a + 0 = a | −5 + 0 = −5 |
| Multiplicative identity | a × 1 = a | −5 × 1 = −5 |
| Multiply by zero | a × 0 = 0 | −5 × 0 = 0 |
| Additive inverse | a + (−a) = 0 | 7 + (−7) = 0 |
Quick check
- What is the value of |−15| + |−8|?
- Compute: (−12) + 7 − (−5) + (−3)
- Evaluate: (−6) × (−4) × (−2)
- The temperature at midnight was −4°C. It rose by 9°C by noon and fell by 12°C by evening. What was the evening temperature?
- Verify the distributive property: (−5) × (3 − 7)
Open the Practice tab for graded questions on Integers.
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