Greatest Common Factor of 10327 and 10333

Greatest common factor or Greatest common divisor (GCD) can be calculated in following way;

• Greatest Common Factor of 10327 and 10333 by prime factorization method
• Greatest Common Factor of 10327 and 10333 by matching factors method

Prime Factorization of 10327

Prime factors of 10327 are 23,449. Prime factorization of 10327 in exponential form is:

10327 = 23¹×449¹

Prime Factorization of 10333

Prime factors of 10333 are 10333. Prime factorization of 10333 in exponential form is:

10333 = 10333¹

∴ So by taking common prime factors GCF of 10327 and 10333 is 1

Factors of 10327

List of positive integer factors of 10327 that divides 10327 without a remainder.

1,23,449,10327

Factors of 10333

List of positive integer factors of 10333 that divides 10333 without a remainder.

1,10333

Greatest Common Factor

We found the factors and prime factorization of 10327 and 10333. The biggest common factor number is the GCF number.
So the greatest common factor 10327 and 10333 is 1.

Also check out the Least Common Multiple of 10327 and 10333

(i) The GCF of 10327 and 10333 is associative

GCF of 10327 and 10333 = GCF of 10333 and 10327

1. What is the GCF of 10327 and 10333?

Answer: GCF of 10327 and 10333 is 1.

2. What are the Factors of 10327?

Answer: Factors of 10327 are 1, 23, 449, 10327. There are 4 integers that are factors of 10327. The greatest factor of 10327 is 10327.

3. What are the Factors of 10333?

Answer: Factors of 10333 are 1, 10333. There are 2 integers that are factors of 10333. The greatest factor of 10333 is 10333.

4. How to Find the GCF of 10327 and 10333?

Answer:

Greatest Common Factor of 10327 and 10333 = 1

Step 1: Find the prime factorization of 10327

10327 = 23 x 449

Step 2: Find the prime factorization of 10333

10333 = 10333

Step 3: Multiply those factors both numbers have in common in steps i) or ii) above to find the gcf:

GCF = = 1

Step 4: Therefore, the greatest common factor of 10327 and 10333 is 1