Decimals · Percentages · Rational Numbers · Operations · Properties
Have you ever noticed that ¾, 0.75, and 75% all represent the same quantity? Fractions are everywhere around us — they just wear different costumes! Sometimes they appear as decimals, sometimes as percentages, and sometimes as rational numbers written as p/q. This chapter reveals the hidden connections between all these forms.
In the NCERT Ganita textbook for Class 8 (2025-26), "Fractions in Disguise" explores how fractions transform into different avatars while keeping their value the same. Understanding this is crucial because it helps you solve problems in everyday life — from calculating discounts while shopping to understanding statistics in news reports.
| Topic | Key Concepts |
|---|---|
| Fractions Revisited | Proper, Improper, Mixed fractions; equivalent fractions |
| Decimals as Fractions | Converting between decimals and fractions; terminating & recurring decimals |
| Percentages as Fractions | Percent to fraction, fraction to percent, real-life applications |
| Rational Numbers | Definition (p/q form), positive & negative rationals, representation |
| Operations | Addition, subtraction, multiplication, division of rational numbers |
| Properties | Closure, commutativity, associativity, identity, inverse, distributivity |
| Number Line | Placing rational numbers on a number line, between any two rationals |
Before exploring the disguises, let us recall the three main types of fractions:
Two fractions are equivalent if they represent the same value. You can create equivalent fractions by multiplying or dividing both numerator and denominator by the same non-zero number.
Examples: ½ = 2/4 = 3/6 = 4/8 = 5/10 = 50/100. These are all the same fraction wearing different disguises!
A decimal is simply a fraction whose denominator is a power of 10 (10, 100, 1000, etc.). The decimal point separates the whole part from the fractional part.
| Decimal | As Fraction (unsimplified) | Simplified Fraction | Rule |
|---|---|---|---|
| 0.5 | 5/10 | ½ | 1 decimal place → denominator 10 |
| 0.75 | 75/100 | ¾ | 2 decimal places → denominator 100 |
| 0.125 | 125/1000 | ⅛ | 3 decimal places → denominator 1000 |
| 2.4 | 24/10 | 12/5 | Move decimal, simplify |
| 3.25 | 325/100 | 13/4 | Move decimal, simplify |
To convert a fraction to a decimal, simply divide the numerator by the denominator.
The word percent comes from the Latin "per centum" meaning "per hundred." So a percentage is simply a fraction with denominator 100.
| Fraction | Decimal | Percentage | How to Convert |
|---|---|---|---|
| ½ | 0.5 | 50% | ½ × 100 = 50 |
| ¼ | 0.25 | 25% | ¼ × 100 = 25 |
| ¾ | 0.75 | 75% | ¾ × 100 = 75 |
| ⅕ | 0.2 | 20% | ⅕ × 100 = 20 |
| ⅔ | 0.666... | 66.67% | ⅔ × 100 = 66.67 |
| 1½ | 1.5 | 150% | 3/2 × 100 = 150 |
A rational number is any number that can be expressed in the form p/q, where p and q are integers and q ≠ 0. The word "rational" comes from "ratio."
A rational number is positive if both p and q have the same sign (both positive or both negative). It is negative if p and q have opposite signs.
| Rational Number | Standard Form | Positive or Negative? |
|---|---|---|
| 3/5 | 3/5 | Positive (both positive) |
| −3/5 | −3/5 | Negative (opposite signs) |
| 3/(−5) | −3/5 | Negative (opposite signs) |
| (−3)/(−5) | 3/5 | Positive (both negative = positive) |
| 0/7 | 0 | Neither positive nor negative |
To subtract, add the additive inverse (negative) of the second number.
To divide by a rational number, multiply by its reciprocal (multiplicative inverse).
Rational numbers follow several important mathematical properties. Understanding these helps you simplify calculations and verify answers.
| Property | Addition | Multiplication |
|---|---|---|
| Closure | a/b + c/d is rational ✅ | (a/b) × (c/d) is rational ✅ |
| Commutative | a + b = b + a ✅ | a × b = b × a ✅ |
| Associative | (a+b)+c = a+(b+c) ✅ | (a×b)×c = a×(b×c) ✅ |
| Identity | a + 0 = a (additive identity = 0) | a × 1 = a (multiplicative identity = 1) |
| Inverse | a + (−a) = 0 (additive inverse) | a × (1/a) = 1 (multiplicative inverse, a ≠ 0) |
Every rational number has a unique position on the number line. To place a rational number on the number line:
Placing ¾ on the Number Line
The segment from 0 to 1 is divided into 4 equal parts. The 3rd mark represents ¾.
Placing −⅔ on the Number Line
The segment from −1 to 0 is divided into 3 equal parts. The 1st mark from −1 represents −⅔.
Here is a beautiful fact: between any two rational numbers, there are infinitely many other rational numbers! This is called the dense property of rational numbers.
| Operation | Rule | Example |
|---|---|---|
| Addition | Same denominator: add numerators. Different: find LCM first. | ⅓ + ⅙ = 2/6 + 1/6 = 3/6 = ½ |
| Subtraction | Add the additive inverse. | ¾ − ½ = ¾ − 2/4 = ¼ |
| Multiplication | Multiply numerators, multiply denominators. | ⅔ × ⅗ = 6/15 = ⅖ |
| Division | Multiply by the reciprocal. | ⅔ ÷ ⅘ = ⅔ × &frac54; = 10/12 = 5/6 |
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