Rational and Irrational Numbers
Introduction
Numbers form the foundation of mathematics. In this chapter, we explore two fundamental categories: rational numbers and irrational numbers. Understanding their properties and differences is essential for ICSE Class 9.
Rational Numbers
A rational number is any number that can be expressed in the form p/q, where p and q are integers and q ≠ 0.
Examples: 3/4, -5/7, 2 (which is 2/1), 0.25 (which is 1/4), 0.333... (which is 1/3)
Key Properties:
- Rational numbers can be positive, negative, or zero
- Every integer is a rational number
- Every fraction is a rational number
- Terminating decimals are rational numbers
- Non-terminating repeating decimals are rational numbers
Operations: Rational numbers are closed under addition, subtraction, multiplication, and division (except by zero).
Irrational Numbers
An irrational number is a number that cannot be expressed in the form p/q, where p and q are integers with q ≠ 0.
Examples: √2, √3, √5, π (pi), e (Euler's number)
Key Properties:
- Irrational numbers have non-terminating, non-repeating decimal expansions
- The set of irrational numbers is not closed under any operation
- Sum of a rational and an irrational number is always irrational
- Product of a non-zero rational and an irrational number is always irrational
Representation on the Number Line
Every real number corresponds to a unique point on the number line.
Method: To represent an irrational number like √2 on the number line:
- Mark point O at 0 and point A at 1 on the number line
- Construct a perpendicular AB of length 1 unit at A
- Join OB. By Pythagoras theorem, OB = √(1²+1²) = √2
- With O as centre and OB as radius, draw an arc intersecting the number line at P
- Point P represents √2
Surds
A surd is an irrational number containing a root symbol (√) that cannot be simplified to a rational number.
Examples: √2, √3, ³√5, √7 Not a surd: √4 = 2 (rational), √9 = 3 (rational)
Types of Surds
| Type | Description | Example |
|---|---|---|
| Pure surd | Entirely under the root | √7 |
| Mixed surd | Has a rational coefficient | 3√5 |
| Quadratic surd | Square root | √11 |
| Cubic surd | Cube root | ³√10 |
Simplification of Surds
Rule: √ab = √a × √b and √(a/b) = √a / √b
Example: Simplify √72 = √(36 × 2) = √36 × √2 = 6√2
Rationalisation of Denominators
Rationalisation is the process of eliminating a surd from the denominator of a fraction.
Method: Multiply both numerator and denominator by the conjugate of the denominator.
The conjugate of (a + √b) is (a — √b).
<ICSEExample title="Rationalise 1/(3 + √2)"> <Solution> 1/(3 + √2) = 1/(3 + √2) × (3 - √2)/(3 - √2) = (3 - √2)/(9 - 2) = (3 - √2)/7 </Solution> </ICSEExample> <ICSEExample title="Rationalise 1/(√5 + √3)"> <Solution> 1/(√5 + √3) = 1/(√5 + √3) × (√5 - √3)/(√5 - √3) = (√5 - √3)/(5 - 3) = (√5 - √3)/2 </Solution> </ICSEExample>Proofs That √2, √3, √5 Are Irrational
Proof That √2 Is Irrational
Step 1: Assume √2 is rational. Then √2 = p/q, where p and q are integers with no common factors (coprime) and q ≠ 0.
Step 2: Squaring both sides: 2 = p²/q²
Step 3: Therefore, p² = 2q²
Step 4: This means p² is divisible by 2, so p is divisible by 2. Let p = 2k.
Step 5: Substituting: (2k)² = 2q², so 4k² = 2q², or q² = 2k²
Step 6: This means q² is divisible by 2, so q is also divisible by 2.
Step 7: But if both p and q are divisible by 2, they have a common factor of 2, contradicting our assumption that p and q are coprime.
Conclusion: Our assumption is false. Therefore, √2 is irrational.
The same method can be used to prove √3 and √5 are irrational by replacing 2 with 3 or 5 in the proof.
Common Mistakes With Fixes
| Mistake | Correction |
|---|---|
| Confusing surds with rational numbers | A surd always gives an irrational value (e.g., √4 = 2 is not a surd) |
| Forgetting to rationalise | Always remove surds from denominator |
| Simplifying √(a+b) incorrectly | √(a+b) ≠ √a × √b (only products work under a single root) |
| Adding surds directly | Only like surds can be added (e.g., 2√3 + 5√3 = 7√3) |
ICSE Exam Focus
| Topic | Marks (approx.) | Frequency |
|---|---|---|
| Rational vs Irrational classification | 2-3 marks | Very common |
| Simplification of surds | 3-4 marks | Common |
| Rationalisation | 3-4 marks | Very common |
| Proof that √2 is irrational | 2-3 marks | Frequently asked |
Self-Test
Q1: Classify as rational or irrational: (i) √25 (ii) 2π (iii) 3.1416 (iv) 0.121221222...
Q2: Simplify: √50 + √18 — √8
Q3: Rationalise: 1/(√7 — √6)
Q4: Prove that √5 is irrational.
Q5: If x = 3 + 2√2, find the value of x + 1/x.
Q6: Express 0.666... in the form p/q.
