What Are the Main Properties and Differences Between HCF and LCM?
The concept of Properties of HCF and LCM plays a key role in mathematics and is widely applicable to both real-life situations and exam scenarios. Understanding these properties helps students solve problems related to factors, multiples, and divisibility—common topics in school exams and competitive tests.
What Is Properties of HCF and LCM?
The Highest Common Factor (HCF) is the largest number that exactly divides two or more numbers, while the Lowest Common Multiple (LCM) is the smallest number exactly divisible by two or more numbers. The properties of HCF and LCM describe unique rules and tricks for calculating, applying, and comparing them. You’ll find this concept applied in areas such as factors and multiples, time and work, and exam problem-solving.
Key Formulas for Properties of HCF and LCM
Here’s the standard formula connecting HCF and LCM for any two positive integers A and B:
HCF × LCM = Product of the numbers
\( \text{HCF}(A, B) \times \text{LCM}(A, B) = A \times B \)
Other useful formulas:
- HCF = Product of Numbers / LCM
- LCM = Product of Numbers / HCF
Key Properties of HCF
- HCF divides each number exactly: The HCF of a set of numbers exactly divides each of those numbers.
- HCF is always ≤ each individual number: The HCF cannot be larger than the smallest number in the set.
- HCF of co-prime numbers is 1: If two numbers have no common factor except 1, their HCF is 1.
- HCF is the product of common prime factors: Calculating HCF by prime factorisation involves only the common factors.
Key Properties of LCM
- LCM is always ≥ each of the numbers: The LCM can never be less than any given number.
- LCM of co-prime numbers is their product: If numbers are co-prime, LCM equals their multiplication.
- LCM is the product of the highest powers of all prime factors: When finding LCM via prime factorisation, take all primes present at maximum powers.
- Every number divides the LCM exactly: All original numbers are exact divisors of their LCM.
Product Relationship & Principle
Property: The product of the HCF and LCM of any two natural numbers is equal to the product of those two numbers.
- For A = 8 and B = 12:
HCF(8, 12) = 4, LCM(8, 12) = 24
4 × 24 = 8 × 12 = 96
This key relationship is extremely helpful for solving exams and MCQs based on properties of HCF and LCM.
When to Use HCF vs. LCM
| Use HCF | Use LCM |
|---|---|
| To split things into largest equal groups (e.g., rods, ribbons, teams) | To synchronise events (e.g., bells, traffic lights, schedule repeats) |
| To find the largest possible measurement unit | To find the earliest time or minimum quantity common to all |
Step-by-Step Illustration
Example: Find the HCF and LCM of 18 and 24 using prime factorisation and verify the relationship property.
1. Express 18 and 24 as products of prime numbers18 = 2 × 3 × 3
24 = 2 × 2 × 2 × 3
2. HCF is the product of minimum powers of all common primes:
Common primes: 2 (power 1), 3 (power 1) ⇒ HCF = 2 × 3 = 6
3. LCM is the product of maximum powers of all primes found:
LCM = 2 × 2 × 2 × 3 × 3 = 72
4. Verify property:
HCF × LCM = 6 × 72 = 432
Product of numbers = 18 × 24 = 432
5. Hence, the property holds.
Speed Trick or Vedic Shortcut
Here’s a rapid trick for co-prime numbers: The LCM of any two co-prime numbers is simply their product, and their HCF is always 1.
Example: LCM of 7 and 9 = 63 (since HCF = 1)
Such tricks reduce calculation steps in exam scenarios. Explore more Vedic Maths shortcuts in Vedantu classes!
Summarising Properties: HCF vs. LCM
| HCF | LCM |
|---|---|
| Largest common factor of numbers | Smallest common multiple of numbers |
| Always ≤ numbers given | Always ≥ numbers given |
| HCF of coprimes is 1 | LCM of coprimes is their product |
| Divides every number in the set | Divisible by every number in the set |
Try These Yourself
- Find HCF and LCM of 20 and 28, and verify their product rule.
- If the HCF of two numbers is 5 and LCM is 60, what is the product of the numbers?
- Are 14 and 25 co-prime? If yes, state their HCF and LCM.
- Split 36 mangoes and 48 oranges into largest equal groups. How many in each group?
Common Errors and Misunderstandings
- Confusing HCF with LCM in word problems.
- Forgetting to use all prime factors at correct powers in LCM.
- Assuming HCF can be greater than given numbers—never possible.
- Not checking for co-primality in shortcut tricks.
Relation to Other Concepts
The idea of properties of HCF and LCM closely relates to factors and multiples, prime factorisation, and difference between LCM and HCF. Mastering these properties helps solve a wide range of number system questions with confidence.
Classroom Tip
A quick way to remember: “HCF = Highest Common Factor, goes into numbers; LCM = Lowest Common Multiple, numbers go into it.” Vedantu’s teachers use these memory pegs and regular practice to help you score better in maths exams.
We explored Properties of HCF and LCM—including definitions, formulas, properties, sample problems, and classroom shortcuts. Practice regularly with guidance from Vedantu to master HCF and LCM for school and competitive exams!
Related Learning Resources
FAQs on Properties of HCF and LCM Explained with Examples
1. What are the four main properties of HCF and LCM?
The four main properties of HCF (Highest Common Factor) and LCM (Lowest Common Multiple) are:
- The HCF of two numbers divides each number exactly.
- The LCM of two numbers is divisible by both numbers.
- The product of the HCF and LCM of two numbers is equal to the product of the two numbers: HCF × LCM = Product of the numbers.
- The HCF of two co-prime numbers is always 1.
2. How do you find the HCF and LCM of two numbers?
There are several methods to find the HCF and LCM of two numbers, including:
- Prime Factorization Method: Find the prime factors of each number. The HCF is the product of the common prime factors raised to their lowest powers. The LCM is the product of all prime factors raised to their highest powers.
- Division Method (Euclidean Algorithm): Repeatedly divide the larger number by the smaller number until the remainder is 0. The last non-zero remainder is the HCF. The LCM can then be calculated using the formula: HCF × LCM = Product of the numbers.
3. What is the formula connecting HCF and LCM?
For two numbers, 'a' and 'b', the relationship between their HCF (Highest Common Factor) and LCM (Lowest Common Multiple) is given by the formula: HCF(a, b) × LCM(a, b) = a × b
4. What is the difference between HCF and LCM with an example?
The HCF (Highest Common Factor) is the largest number that divides both numbers without leaving a remainder. The LCM (Lowest Common Multiple) is the smallest number that is a multiple of both numbers. For example, consider the numbers 12 and 18:
- Factors of 12: 1, 2, 3, 4, 6, 12
- Factors of 18: 1, 2, 3, 6, 9, 18
- HCF(12, 18) = 6 (the largest common factor)
- Multiples of 12: 12, 24, 36, 48…
- Multiples of 18: 18, 36, 54…
- LCM(12, 18) = 36 (the smallest common multiple)
5. Where are HCF and LCM used in daily life or exams?
HCF and LCM are used in various real-life situations and mathematical problems, such as:
- Finding the greatest common divisor of lengths to cut objects into equal pieces.
- Determining the least common multiple of time intervals to synchronize events.
- Solving problems involving fractions and ratios.
- Word problems in exams testing understanding of divisibility and common factors/multiples.
6. Why is the HCF of two co-prime numbers always 1?
Co-prime numbers share only 1 as a common factor; therefore, their HCF is 1.
7. Can the LCM of two numbers be less than any of the numbers?
No, the LCM of two numbers is always greater than or equal to the larger of the two numbers.
8. Why does the product of HCF and LCM equal the product of numbers only for two numbers?
The formula HCF × LCM = Product of numbers holds true only for two numbers. For more than two numbers, the relationship becomes more complex.
9. Can the HCF ever be greater than the LCM?
No, the HCF can never be greater than the LCM. The HCF is always less than or equal to the LCM.
10. How do HCF and LCM properties change for more than two numbers?
The formula HCF × LCM = Product of numbers does not directly apply to more than two numbers. Finding the HCF and LCM for more than two numbers requires extending the prime factorization or division methods.
11. How to find the LCM using the Division Method?
The division method, also known as the ladder method, involves repeatedly dividing the numbers by their common factors until only 1 remains. The LCM is the product of all the divisors used.
12. Explain how to find the HCF using the prime factorization method.
The prime factorization method involves expressing each number as a product of its prime factors. The HCF is found by identifying the common prime factors and multiplying them together, raising each to the lowest power present in any of the factorizations.
