Prime Factorization Method
There are multiple ways to find the greatest common factor of given integers. One of these involves computing the prime factorizations of each integer, determining which factors they have in common, and multiplying these factors to find the GCD.
- Find the prime factorization of each number:
14 = 2, 7
67 = 67
- Identify the common prime factors:
There are no common prime factors between 14 and 67.
- Since there are no common prime factors, the GCF is:
GCF(14, 67) = 1
Thus, the Greatest Common Factor of 14 and 67, using the prime factorization method, is 1.
This means 14 and 67 are relatively prime (coprime), having no common factors other than 1.
Listing All Common Factors Method
To find the Greatest Common Factor (GCF) of 14 and 67 by listing all common factors, follow these steps:
- List all factors of each number:
- Factors of 14: 1, 2, 7, 14
- Factors of 67: 1, 67
- Identify the common factors: The only common factor is 1.
- Determine the greatest common factor:
- The greatest common factor is the largest number in the list of common factors:
- GCF = 1
- The greatest common factor is the largest number in the list of common factors:
Since 14 is a prime number and does not share any common factors with 67 other than 1, the GCF of 14 and 67 is: 1
This means 14 and 67 are relatively prime (coprime), having no common factors other than 1.
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