Finding two numbers when the HCF and LCM are given
HCF and LCM
HCF or the Highest Common Factor of two numbers is the largest number that can divide both the numbers. LCM or the Least Common Multiple is the smallest number that is evenly divisible by both the numbers. LCM is also known as Least Common Divisor. Now that we know what LCM and HCF are, how do we find two numbers when only their HCF and LCM are known?
Finding two numbers when their HCF and LCM are given:
Let us take any two numbers a, b, and let us say their HCF and LCM are s and y respectively. To find out the two numbers a and b, we must first understand the relationship between the two numbers and their HCF and LCM. For any two numbers, the product of the two numbers is equal to the product of their HCF and LCM. Let us take the example of 10 and 15. The HCF is 5 and the LCM is 30. Now, the product of the two numbers is 10✕15 = 150and this is equal to the product of the HCF and LCM which is 5 ✕ 30 = 150
Now that we have understood the relationship between the numbers and their HCF and LCM, we can find the two numbers by taking out the factors of the products of the HCF and LCM. We then eliminate the numbers which have a different HCF or LCM and any remaining pair is the number we are looking for. Note that there could be more than one pair of numbers that have the same HCF and LCM.
Taking the above example, let us find two numbers a and b, and their HCF is 5 while their LCM is 30.
Now we know that a ✕ b = 5✕30 = 150
Let us factorize the product 150.
Factors of 150 are
1 x 150,
2 x 75,
3 x 50,
5 x 30,
6 x 25, and
10 x 15
We know that the HCF of the two numbers is 5. So we can eliminate (1, 150) (2,75) (3,50) (6,25) since their HCF is not 5. we are left with (5,30) and (10,15) and these are the two possible answers to this question.
Practice Multiple Choice Questions
Questions
- The LCM and HCF of the two numbers are 750 and 125 respectively. If one of the numbers is 250, what is the other?
Solution:
Let y be the other number. We know that the product of the two numbers is equal to the product of the HCF and LCM of the numbers.
So, 250 ✕ y=750✕125
250y=93750
y=375
Therefore, the other number is 375.
2. The product of the two numbers is 765 and their HCF is 3. Find the LCM and the two numbers.
Solution:
Let a and b be the two numbers and y be the LCM.
We know that the product of the two numbers equals the product of the HCF and LCM.
i.e 765 = 3 X y
y = 255.
So the HCF and LCM of the two numbers are 3 and 255 respectively.
Given that the product of the two numbers is 765.
The factors of 765 are (1,765) (3,255) (5,153) (9,85) (15,51) (17,45)
Since the HCF of the two numbers is given as 3, that leaves only (3,255) and (15,51). These are two possible pairs of numbers whose LCM and HCF are 255 and 3 respectively.
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Frequently Asked Questions
1. What is the relationship between two numbers and their HCF and LCM?
Ans: The product of the numbers a, b equals the product of their HCF and LCM
2. What are co-primes?
Ans: Co-primes are two or more numbers that have only 1 as their common factor. Co-primes need not necessarily be prime numbers. For example, the numbers 4 and 9 have no common factor other than one. Hence they are co-prime numbers.
3. What is the relationship between two co-prime numbers and their HCF and LCM?
Ans: The HCF of co-prime numbers is 1. So, the product of two numbers a and b which are co-prime numbers, the LCM equals the product of a and b i.e the LCM of a,b = ab