Decimals

1. Understanding Tenths, Hundredths, Thousandths

A decimal is another way to write a fraction where the denominator is 10, 100, or 1000.

Tenths

1/10 = 0.1 (one-tenth) 3/10 = 0.3 (three-tenths) 9/10 = 0.9 (nine-tenths)

'One whole = 10 tenths. The FIRST place after the decimal point is TENTHS.'

Hundredths

1/100 = 0.01 (one-hundredth) 35/100 = 0.35 (thirty-five hundredths)

FractionDecimalWords
1/100.1One-tenth
1/1000.01One-hundredth
25/1000.25Twenty-five hundredths
99/1000.99Ninety-nine hundredths

Thousandths

1/1000 = 0.001 (one-thousandth) 375/1000 = 0.375 (three hundred seventy-five thousandths)

Place Value Chart

HTO.Tenths (1/10)Hundredths (1/100)Thousandths (1/1000)
234.567

This number is 234.567 = Two hundred thirty-four point five six seven.

'Every decimal digit has a PLACE VALUE one-tenth of the place to its left. The decimal point separates the WHOLE part from the FRACTIONAL part.'

Expanded Form

234.567 = 200 + 30 + 4 + 0.5 + 0.06 + 0.007

2. Converting Between Fractions and Decimals

Fraction to Decimal

Divide the numerator by the denominator.

FractionWorkingDecimal
3/53 ÷ 5 = 0.60.6
7/207 ÷ 20 = 0.350.35
9/89 ÷ 8 = 1.1251.125
2 3/42 + (3 ÷ 4) = 2 + 0.752.75

'To convert a fraction to a decimal, think of the fraction as a DIVISION problem. The numerator goes INSIDE the division box.'

Decimal to Fraction

Write the decimal as a fraction with denominator 10, 100, or 1000. Simplify.

DecimalFraction (unsimplified)Simplified
0.77/107/10
0.4545/1009/20
0.125125/10001/8
2.626/1013/5 = 2 3/5

'Count the number of decimal places. That tells you the denominator — 1 decimal place = 10, 2 places = 100, 3 places = 1000.'

3. Comparing and Ordering Decimals

Comparing Decimals

StepExample: Compare 0.45 and 0.4
1. Make the decimal places equal0.45 and 0.40
2. Remove the decimal point45 and 40
3. Compare as whole numbers45 > 40, so 0.45 > 0.4

'ALWAYS add trailing zeros to make the number of decimal places equal BEFORE comparing.'

Ordering

Arrange in ascending order: 0.8, 0.75, 0.825, 0.7

Step 1: Make equal decimal places (3 places): 0.800, 0.750, 0.825, 0.700. Step 2: Compare: 0.700 < 0.750 < 0.800 < 0.825. Step 3: Ascending order: 0.7, 0.75, 0.8, 0.825.

4. Addition and Subtraction of Decimals

Addition

Align the decimal points. Add like whole numbers. Place the decimal point.

  2 3 4.5 6
+ 1 2 3.4 5
-----------
  3 5 8.0 1

'Line up the DECIMAL POINTS. If a number has fewer decimal places, add zeros to make them equal.'

Subtraction

  5 6 7.8 0
− 3 4 5.6 7
-----------
  2 2 2.1 3

Real-World Example: Money

₹250.50 + ₹175.75 = ₹426.25

'When working with money, decimals are NATURAL. Rupees are the whole part, paise are the decimal part (100 paise = ₹1).'

5. Multiplication of Decimals

Decimal × Whole Number

3.25 × 4

Step 1: Multiply without decimal: 325 × 4 = 1,300. Step 2: Count decimal places in original (2 decimal places in 3.25). Step 3: Place decimal: 13.00 = 13.

'Multiply as if there is NO decimal. Then count the total decimal places from the RIGHT and place the decimal point.'

Decimal × Decimal

2.5 × 1.3

Step 1: 25 × 13 = 325. Step 2: Total decimal places = 1 + 1 = 2. Step 3: 2.5 × 1.3 = 3.25.

Multiplying by 10, 100, 1000

Multiply ByMove Decimal PointExample
101 place RIGHT0.45 × 10 = 4.5
1002 places RIGHT0.45 × 100 = 45
10003 places RIGHT0.45 × 1000 = 450

'When multiplying a decimal by 10, 100, or 1000 — move the decimal point to the RIGHT by as many places as there are zeros.'

6. Applications — Money and Measurement

Money

RupeesConversion
₹1100 paise
50 paise₹0.50
75 paise 50 paisa₹0.755
₹5.75575 paise

Length

UnitConversionDecimal Form
1 m100 cm1.00 m
75 cm0.75 m0.75 m
2 m 50 cm2.50 m2.50 m
1 km1000 m1.000 km

Mass

UnitConversionDecimal Form
1 kg1000 g1.000 kg
500 g0.500 kg0.500 kg
2 kg 250 g2.250 kg2.250 kg

Key Facts to Remember

  • The decimal point separates the whole number part from the fractional part.
  • Adding a zero AFTER the decimal does NOT change the value (0.5 = 0.50 = 0.500).
  • 'Zeros to the LEFT of the first non-zero decimal digit DO change the value: 0.05 ≠ 0.5.'
  • A decimal greater than 1 has a whole number part to the left of the decimal point.
  • Every decimal can be written as a fraction.

Common Mistakes

MistakeWhy It Is WrongCorrect Approach
Misaligning decimal points3.45 + 12.3 = 4.68 (aligned 45+3)Line up the decimal points: 3.45 + 12.30 = 15.75
Thinking 0.5 = 0.050.5 is five-tenths, 0.05 is five-hundredths0.5 > 0.05 — 0.5 = 0.50
Forgetting to count digits after decimal0.25 × 0.3 = 0.75 (wrong)25 × 3 = 75. 3 decimal places: 0.075
Writing ₹5.75 as 5.75 paise₹1 = 100 paise, so ₹5.75 = 575 paise₹5.75 is 5 rupees 75 paise

Exam Focus (ICSE Class 5)

TopicMarks (Typical)Question Type
Place value in decimals2-3 marksIdentify the digit in a given place
Fraction ↔ Decimal conversion3-4 marksConvert and simplify
Addition and subtraction4-5 marksComputation and word problems
Multiplication by 10, 100, 10002 marksDirect computation
Money and measurement applications4 marksWord problems with ₹, m, kg

Self-Test: 5 Questions

Q1. Write 7/8 as a decimal and 0.625 as a fraction in simplest form.

Q2. Arrange in descending order: 0.35, 0.3, 0.305, 0.35.

Q3. Simplify: 45.78 + 123.456 − 67.9.

Q4. Multiply: 0.75 × 0.8.

Q5. A shopkeeper bought 5.5 kg of apples at ₹85.50 per kg. How much did he pay?

Answers

A1. 7/8 = 0.875. 0.625 = 625/1000 = 5/8.

A2. 0.35 (0.350) = 0.35 (second 0.35), then 0.305, then 0.3 (0.300). So: 0.35 = 0.35 > 0.305 > 0.3.

A3. 45.78 + 123.456 = 169.236. 169.236 − 67.9 = 101.336.

A4. 75 × 8 = 600. Total decimal places = 2 + 1 = 3. 0.75 × 0.8 = 0.600 = 0.6.

A5. 5.5 × 85.50 = 55/10 × 855/10 = 47025/100 = ₹470.25.

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