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Mastering Factors, Multiples, HCF, and LCM

CSEC Mathematics: Number Theory Foundation

Essential Understanding: Factors, multiples, HCF (Highest Common Factor), and LCM (Lowest Common Multiple) form the bedrock of number theory. These concepts are crucial for simplifying fractions, solving word problems, and understanding numerical relationships. Master these to excel in computation, algebra, and real-world problem solving.

🔑 Key Skill: Prime Factorization

📈 Exam Focus: HCF & LCM Word Problems

🎯 Problem Solving: Simultaneous Use of HCF & LCM

Core Concepts

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Factors

Definition: A factor of a number divides that number exactly (no remainder).

Example: Factors of 12 are \(1, 2, 3, 4, 6, 12\).

Every number has at least two factors: 1 and itself.
Prime numbers have exactly two factors.

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Multiples

Definition: A multiple of a number is the product of that number and any integer.

Example: Multiples of 5 are \(5, 10, 15, 20, 25, …\)

Multiples are infinite.
Every number is a multiple of itself and 1.

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HCF (Highest Common Factor)

Definition: The largest number that divides two or more numbers exactly.

Example: HCF of 12 and 18 is 6.

Also called: Greatest Common Divisor (GCD).

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LCM (Lowest Common Multiple)

Definition: The smallest number that is a multiple of two or more numbers.

Example: LCM of 4 and 6 is 12.

Key use: Finding common denominators in fractions.

The Fundamental Connection

For any two numbers \(a\) and \(b\), the product of their HCF and LCM equals the product of the numbers themselves.

\[ \text{HCF}(a,b) \times \text{LCM}(a,b) = a \times b \]

This relationship is extremely useful for checking answers and solving problems.

Finding HCF and LCM: Prime Factorization Method

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Prime Factor Tree Generator

Objective: Enter a number to see its prime factorization tree. This helps visualize the breakdown of a number into its prime factors.

Prime Factorization Result

Enter a number and click “Generate Tree”.

Find HCF using Prime Factors:

Write each number as a product of prime factors.
Take the lowest power of each common prime factor.
Multiply these together.

Find LCM using Prime Factors:

Write each number as a product of prime factors.
Take the highest power of each prime factor present.
Multiply these together.

Example: Find HCF and LCM of 24 and 36

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Step-by-Step Solution

Step 1: Prime Factorization

\[ 24 = 2 \times 2 \times 2 \times 3 = 2^3 \times 3^1 \]

\[ 36 = 2 \times 2 \times 3 \times 3 = 2^2 \times 3^2 \]

Step 2: Find HCF

Common primes: 2 and 3. Lowest powers: \(2^2\) and \(3^1\).

\[ \text{HCF} = 2^2 \times 3^1 = 4 \times 3 = 12 \]

Step 3: Find LCM

All primes: 2 and 3. Highest powers: \(2^3\) and \(3^2\).

\[ \text{LCM} = 2^3 \times 3^2 = 8 \times 9 = 72 \]

Step 4: Verification

\[ \text{HCF} \times \text{LCM} = 12 \times 72 = 864 \]

\[ 24 \times 36 = 864 \]

✓ The relationship holds true.

Real-World Applications & Past Paper Questions

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CSEC Past Paper Question (2018 Jan, Paper 2)

Question: Two buses run along the same route. Bus A leaves the terminal every 15 minutes. Bus B leaves the terminal every 18 minutes. If both buses leave together at 8:00 a.m., at what time will they next leave together?

Interpretation: This is an LCM problem. We need the LCM of 15 and 18 to find how often they coincide.

Prime Factorization: \[ 15 = 3 \times 5 \] \[ 18 = 2 \times 3^2 \]

Find LCM: LCM = \(2 \times 3^2 \times 5 = 2 \times 9 \times 5 = 90\) minutes.

Convert: 90 minutes = 1 hour 30 minutes.

Answer: They next leave together at \(8:00 + 1:30 = 9:30\) a.m.

Key Examination Insights

Common Mistakes

Confusing HCF with LCM: HCF is for dividing things smaller, LCM for events repeating.
In prime factorization, missing prime factors or using incorrect powers.
Forgetting that 1 is a factor of every number, but not prime.

Success Strategies

Always use the prime factorization method for accuracy.
Check your HCF and LCM using the relationship \(HCF \times LCM = a \times b\).
For word problems, carefully decide whether you need HCF or LCM.

CSEC Practice Arena

Test Your Understanding

What is the Highest Common Factor (HCF) of 28 and 42?

Explanation: Factors of 28: 1, 2, 4, 7, 14, 28. Factors of 42: 1, 2, 3, 6, 7, 14, 21, 42. Common factors: 1, 2, 7, 14. Highest is 14.

A gardener wants to plant trees in rows such that each row has the same number of trees. If he has 36 mango trees and 48 orange trees, what is the greatest number of trees that can be in each row so that each row has only one type of tree?

Solution: This is an HCF problem. HCF of 36 and 48. 36 = \(2^2 \times 3^2\), 48 = \(2^4 \times 3\). HCF = \(2^2 \times 3 = 12\). So each row can have at most 12 trees.

Two traffic lights change at intervals of 45 seconds and 60 seconds respectively. If they change together at 12:00 noon, when will they next change together?

12:03 p.m.

12:04 p.m.

12:05 p.m.

12:06 p.m.

Solution: LCM of 45 and 60. 45 = \(3^2 \times 5\), 60 = \(2^2 \times 3 \times 5\). LCM = \(2^2 \times 3^2 \times 5 = 180\) seconds = 3 minutes. Next change together at 12:03 p.m.

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CSEC Examination Mastery Tip

Word Problem Clues: To decide whether to use HCF or LCM in a word problem, look for keywords:

HCF: “Greatest,” “largest,” “maximum,” “divide evenly,” “same size,” “equal groups.”
LCM: “Smallest,” “least,” “minimum,” “repeated event,” “next time together,” “simultaneously.”

Always re-read the problem to confirm your choice.