CTET · Study & Practice

Multiplication

AreaMathematics & Pedagogy DifficultyEasy to Moderate CTET weightage2-4 questions across the Mathematics content and pedagogy sections (Paper I, and Paper II for the Maths-Science option)

Multiplication is one of the four operations CTET treats as bread and butter, and the questions are rarely about whether you can compute 7 times 8. They are about whether you understand multiplication the way a primary teacher must: as repeated addition, as equal groups, as arrays, and as a set of properties a child can lean on. CTET loves to hand you a child's wrong working and ask what went wrong and what you would do next. So you need the answer and the reasoning behind every step. This chapter walks through the multiplication facts (tables 2 to 20), the properties that make mental maths possible, the standard algorithm from one-digit to multi-digit with carrying, and the word-problem situations children actually meet. Throughout, the focus stays on the why, because that is what the paper rewards.

Topics

1 Multiplication Facts 4 worked · 3 practice · 8-Q MCQ test Start → 2 Properties 4 worked · 4 practice · 8-Q MCQ test Start → 3 Multiplication Algorithms 4 worked · 4 practice · 8-Q MCQ test Start → 4 Word Problems 4 worked · 3 practice · 8-Q MCQ test Start →

⚡ Smart tips & memory hooks

Memory hooks and exam-smart tips to lock this chapter in and answer CTET MCQs quickly and accurately.

To multiply by 10, 100 or 1000, multiply the non-zero digits and tack on that many zeros: 45 x 100 = 4500.
Multiplying by 5 is half of multiplying by 10: 18 x 5 = (18 x 10) / 2 = 90.
Use the distributive property to split a hard fact: 8 x 7 = (8 x 5) + (8 x 2) = 40 + 16 = 56.
Commutative property lets you flip to the easier table: solve 8 x 3 as 3 x 8 if the 3-table is more secure.
In two-digit by two-digit, write the second partial product one place left (or use a 0 placeholder) because you are multiplying by tens, not ones.
For x 11 up to 9: the answer is just the digit doubled, like 11 x 6 = 66; for tables 12 to 20, build on the 10-times fact, e.g. 13 x 4 = (10 x 4) + (3 x 4) = 52.

⚠️ Common mistakes & traps

CTET loves to test these exact confusions. Internalise each trap before exam day.

Forgetting the place-value shift, so 34 x 12 is added as 68 + 34 = 102 instead of 68 + 340 = 408.
Dropping or mis-adding the carried digit, e.g. 27 x 3 written as 61 because the carried 2 was not added to 6.
Treating a zero inside a number as the digit itself, e.g. 105 x 3 = 3015 instead of 315 (0 x 3 = 0, not 3).
Assuming the commutative or associative property also works for subtraction and division (it does not).
Confusing the identity and zero properties: x 1 keeps the number (a x 1 = a) while x 0 makes it 0 (a x 0 = 0).
Teaching word problems by keyword spotting (multiply on the word each) instead of by recognising equal-groups or array situations.

📈 CTET exam insight & PYQ analysis

Multiplication shows up in the CTET Mathematics content questions and, just as often, in the maths pedagogy questions. The dominant pattern is the error-diagnosis item: a child's wrong working is shown (a missed carry, an unshifted partial product, a mishandled zero) and you must name the misconception or pick the best remedial step, with the expected answer usually pointing to expanded form, base-ten blocks or the area model. Property questions are typically application-based, describing a child's mental strategy and asking which property (commutative, associative, identity, zero) it uses. Word-problem items test whether you can classify a situation as equal groups, an array or repeated addition, and they warn against keyword-based teaching. Straightforward computation (one-digit facts, multiplying by multiples of 10) also appears, but the higher-mark questions reward conceptual understanding and pedagogy over speed.

🎴 Flashcards — instant recall

Tap a card to reveal the answer. Drill these until they are automatic.

What does multiplication mean as repeated addition?Tap to reveal

4 x 3 = 3 + 3 + 3 + 3 = 12 (add 3 four times)

State the commutative property with an example.Tap to reveal

a x b = b x a; e.g. 3 x 5 = 5 x 3 = 15

State the associative property with an example.Tap to reveal

(a x b) x c = a x (b x c); e.g. (2 x 3) x 4 = 2 x (3 x 4) = 24

What is the identity property of multiplication?Tap to reveal

a x 1 = a; 1 is the multiplicative identity (e.g. 25 x 1 = 25)

What is the zero property of multiplication?Tap to reveal

a x 0 = 0 for any number a (e.g. 47 x 0 = 0)

How do you multiply by 100?Tap to reveal

Multiply the non-zero digits and append two zeros; e.g. 45 x 100 = 4500

Find 48 x 6.Tap to reveal

288 (6 x 8 = 48, write 8 carry 4; 6 x 4 = 24, +4 = 28)

What is 36 x 24 by partial products?Tap to reveal

(36 x 20) + (36 x 4) = 720 + 144 = 864

Name the three word-problem situations for multiplication.Tap to reveal

Equal groups, arrays, and repeated-addition situations

A child writes 105 x 3 = 3015. Correct answer and error?Tap to reveal

315; the child wrongly took 0 x 3 as 3 instead of 0

Why write a zero placeholder in two-digit by two-digit?Tap to reveal

The second line multiplies by tens, so it shifts one place left (e.g. 36 x 20 = 720)

Does the commutative property apply to subtraction?Tap to reveal

No; 6 - 2 (= 4) is not 2 - 6 (= -4). It holds for multiplication and addition only.

📌 Quick revision

Multiplication is repeated addition made quick, modelled through equal groups, arrays and number-line jumps. Its core properties, commutative (a x b = b x a), associative ((a x b) x c = a x (b x c)), identity (a x 1 = a) and zero (a x 0 = 0), let children rearrange problems and reason flexibly, but they do not carry over to subtraction or division. The standard algorithm rests on place value and the distributive property, moving from one-digit facts to multiplying by powers of ten, then to multi-digit work with carrying and shifted partial products. Word problems test whether a child can classify a situation as equal groups, an array or repeated addition rather than guess from keywords. For CTET, the marks lie in conceptual understanding and error diagnosis: spotting a missed carry, an unshifted partial product or a mishandled zero, and prescribing expanded form, base-ten blocks or the area model as the remedy.

Chapter test

📝 Multiplication — Chapter Test

25 fresh questions · timed · full solutions

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🏆 Vidaara CTET success checklist

You have truly mastered Multiplication when you can tick every box below.

Recall every formula in this chapter without looking them up
Solve each topic’s practice set with at least 80% accuracy
Use the chapter shortcuts to cut your solving time in half
Spot and avoid every common trap listed above
Score 80%+ on the timed chapter test

📋 Chapter mastery scorecard

Track where you stand. Aim for the target before moving to the next chapter.

Skill checkpoint	Target
Concept theory & formulas understood	100%
Topic practice sets attempted (4 topics)	4/4
Best topic-test score	— → 80%+
Chapter test score	— → 80%+
Flashcards drilled to instant recall	12 cards

Key Concepts — Quick Reference

This chapter

Properties of multiplication

Commutative	a x b = b x a (3 x 5 = 5 x 3 = 15)
Associative	(a x b) x c = a x (b x c) ((2 x 3) x 4 = 2 x (3 x 4) = 24)
Identity (x 1)	a x 1 = 1 x a = a (25 x 1 = 25); 1 is the multiplicative identity
Zero property (x 0)	a x 0 = 0 x a = 0 (47 x 0 = 0)

What multiplication means

Repeated addition	4 x 3 = 3 + 3 + 3 + 3 = 12 (add 3 four times)
Equal groups	5 bags of 2 apples = 5 x 2 = 10 apples
Arrays	3 rows of 4 = 3 x 4 = 12 (rows x columns)
Multiply by 10^n	a x (b x 10^n) = (a x b) followed by n zeros (45 x 100 = 4500)