Finding the LCM and HCF of 510 and 92
Step 1: Prime Factorization
To find the Least Common Multiple (LCM) and Highest Common Factor (HCF), we can start by finding the prime factorization of both numbers:
Prime Factorization of 510:
- 510 can be divided by 2: 510 = 2 × 255
- 255 can be divided by 3: 255 = 3 × 85
- 85 can be divided by 5: 85 = 5 × 17
- 17 is a prime number.
So, the complete prime factorization of 510 is:
510 = 2 × 3 × 5 × 17
Prime Factorization of 92:
- 92 can be divided by 2: 92 = 2 × 46
- 46 can be divided by 2: 46 = 2 × 23
- 23 is a prime number.
Thus, the prime factorization of 92 is:
92 = 2² × 23
Step 2: Finding HCF
The HCF is found by taking the lowest power of all prime factors common to both numbers. From the prime factorizations:
- Common prime factor: 2
Thus, the HCF is:
HCF = 21 = 2
Step 3: Finding LCM
The LCM is found by taking the highest power of all prime factors present in either number:
- 22 (from 92)
- 31 (from 510)
- 51 (from 510)
- 171 (from 510)
- 231 (from 92)
Thus, the LCM is:
LCM = 2² × 3 × 5 × 17 × 23 = 23460
Step 4: Verification of LCM and HCF
To verify that the product of the two numbers is equal to the product of the LCM and HCF, we can perform the following calculation:
Product of the two numbers:
510 × 92 = 46920
Product of LCM and HCF:
23460 × 2 = 46920
Since both products are equal (46920 = 46920), we have verified the relationship:
Product of LCM and HCF = Product of the numbers
Conclusion
In summary, for the numbers 510 and 92, the HCF is 2, the LCM is 23460, and we have confirmed that:
LCM × HCF = Product of the two numbers