Number System (Classes VI-VIII) • Topic 4 of 6

Fractions & Decimals

Fractions and decimals are, by a distance, the topics where upper-primary children carry the most stubborn misconceptions, and CTET knows it. The headline error is whole-number thinking applied to fractions: a child decides 1/4 is bigger than 1/2 because 4 is bigger than 2, not seeing that a bigger denominator cuts the whole into smaller pieces. In decimals the mirror error is longer-is-larger, where 0.65 is judged greater than 0.7 because it has more digits. A third is adding denominators (1/2 + 1/3 = 2/5), which ignores that you must first make the parts equal-sized via a common denominator. A teacher counters all three with the area or fraction-strip model so children SEE the size of a part, and stresses that 0.7 = 0.70 to defeat the place-value confusion in decimals. The exam usually gives a child's wrong comparison or sum and asks for the misconception or the correct value, so keep the maths exact and the diagnosis ready.

✅ Solved examples

1. Add 1/2 + 1/3.

LCM of 2 and 3 is 6, so 1/2 = 3/6 and 1/3 = 2/6. Adding the numerators: 3/6 + 2/6 = 5/6.

2. A child says 0.65 is greater than 0.7. What is the misconception?

The longer-is-larger error: the child treats more digits as more value. But 0.7 = 0.70, and 70 hundredths is greater than 65 hundredths, so 0.7 > 0.65. Lining up the decimal places (or using 0.70) makes it clear.

3. Which is greater, 1/2 or 1/4, and why might a child get it wrong?

1/2 is greater, because dividing a whole into 2 parts gives bigger pieces than dividing into 4. A child may pick 1/4 by whole-number thinking, reasoning 4 > 2.

4. Convert 3/4 to a decimal.

3/4 = 3 divided by 4 = 0.75. Equivalently 3/4 = 75/100 = 0.75.

✏️ Practice — try these, take hints as needed

1. Add 2/5 + 1/10.

LCM of 5 and 10 is 10.

Convert 2/5 to tenths first.

1/2 (2/5 = 4/10, so 4/10 + 1/10 = 5/10 = 1/2)

2. A child writes 1/2 + 1/3 = 2/5. What error is this?

Look at how the denominators were handled.

Parts must be equal-sized first.

The child added numerators and denominators directly; you must use a common denominator. The correct answer is 5/6.

3. Arrange in ascending order: 0.5, 0.45, 0.405.

Write each to three decimal places.

Compare 500, 450, 405 thousandths.

0.405, 0.45, 0.5

4. Convert 0.25 to a fraction in lowest terms.

0.25 = 25/100.

Divide top and bottom by 25.

1/4

📝 Topic test — 8 questions

Auto-graded with full solutions; saved to your dashboard. Use the calculator and formula sheet (top-right) any time.

Loading questions…

← Integers & Their Operations Rational Numbers →

Key Concepts — Quick Reference

This chapter

HCF, LCM and divisibility (the workhorses)

HCF	Highest common factor = product of the LOWEST powers of common primes
LCM	Lowest common multiple = product of the HIGHEST powers of all primes present
Key identity	HCF(a,b) x LCM(a,b) = a x b (for any two numbers)
Divisibility by 3 / 9	Divisible if the digit sum is divisible by 3 / by 9

Integers, fractions and exponents

Integer signs	Two like signs -> +, two unlike signs -> - (for x and division)
Adding fractions	Take the LCM of denominators, then add the numerators only
Laws of exponents	a^m x a^n = a^(m+n); a^m / a^n = a^(m-n); a^0 = 1
Squares and cubes	Square = n x n (area model); cube = n x n x n (volume model)