GCF of 109,900,009,129 and 199,742,422,863: The Greatest (Highest) Common Factor (Divisor) (HCF, GCD) Calculator

Calculator of the GCF (HCF, GCD) of 109,900,009,129 and 199,742,422,863, the greatest (highest) common factor (divisor), using the prime factorization, numbers' divisibility or the Euclidean algorithm

The greatest common factor and how to calculate it

Getting started and examples

  • 1. Factors of a number:
    • Factors of a number are the numbers that are multiplied together to get that number.
    • Examples: 2 × 3 × 4 = 24; 4 × 9 = 36.
    • In these cases we say that 2, 3 and 4 are factors of 24. And 4 and 9 are factors of 36.
  • 2. Common factors of multiple numbers:
    • Factors that are common to multiple numbers are called common factors.
    • In our examples 4 is both a factor of 24 and 36.
  • 3. The Greatest Common Factor, GCF, of several numbers
    • The Greatest Common Factor, GCF, is the largest of all the common factors of several numbers.
    • The Greatest Common Factor, GCF, is also called the Highest Common Factor, HCF, or the Greatest Common Factor, GCD.
  • 4. How is the Greatest Common Factor calculated? Step 1.
    • In our examples we might be tempted to say that 4 is the Greatest Common Factor of 24 and 36. But, let's try instead to break those factors into other ones that are as small as possible.
    • 24 could be written as: 24 = 2 × 2 × 2 × 3.
    • 36 could also be written as: 36 = 2 × 2 × 3 × 3.
    • In our example, 2 and 3 cannot be further broken down into any other smaller numbers.
  • 5. The mighty prime numbers:
    • 2 and 3 cannot be broken down into any other smaller numbers because they are prime numbers. This is the very definition of the prime numbers:
    • A prime number has no factors other than 1 and itself since it cannot be further broken down into any other smaller numbers.
    • Examples of prime numbers: 2, 3, 5, 7, 11, 13, 17, 19, 23, 29, and so on, there is an infinite number of prime numbers.
  • 6. How is the Greatest Common Factor calculated? Step 2.
    • We have seen that it is a good idea to decompose numbers into factors that are as small as possible, writing them as a product of prime factors. This is the very definition of the prime factorization of a number.
    • The prime factorization of 24 = 2 × 2 × 2 × 3 = 23 × 3.
    • The prime factorization of 36 = 2 × 2 × 3 × 3 = 22 × 32.
    • To calculate the GCF just take all the common prime factors of both numbers and multiply them together:
    • GCF (24 and 36) = 2 × 2 × 3 = 22 × 3 = 12.

Calculate the greatest (highest) common factor (divisor)
gcf, hcf, gcd (109,900,009,129; 199,742,422,863) = ?

Method 1. The prime factorization:

The prime factorization of a number: finding the prime numbers that multiply together to make that number.


109,900,009,129 = 37 × 167 × 2,659 × 6,689
109,900,009,129 is not a prime number but a composite one.

199,742,422,863 = 3 × 49,279 × 1,351,099
199,742,422,863 is not a prime number but a composite one.



Calculate the greatest (highest) common factor (divisor):

Multiply all the common prime factors, taken by their smallest exponents (the smallest powers).

But the two numbers have no common prime factors.


The greatest (highest) common factor (divisor),
gcf, hcf, gcd (109,900,009,129; 199,742,422,863) = 1
Coprime numbers (prime to each other, relatively prime).
Scroll down for the 2nd method...

Method 2. The Euclidean Algorithm:

  • This algorithm involves the process of dividing numbers and calculating the remainders.
  • 'a' and 'b' are the two natural numbers, 'a' >= 'b'.
  • Divide 'a' by 'b' and get the remainder of the operation, 'r'.
  • If 'r' = 0, STOP. 'b' = the gcf (hcf, gcd) of 'a' and 'b'.
  • Else: Replace ('a' by 'b') and ('b' by 'r'). Return to the step above.

  • » The Euclidean Algorithm



Step 1. Divide the larger number by the smaller one:
199,742,422,863 ÷ 109,900,009,129 = 1 + 89,842,413,734
Step 2. Divide the smaller number by the above operation's remainder:
109,900,009,129 ÷ 89,842,413,734 = 1 + 20,057,595,395
Step 3. Divide the remainder of the step 1 by the remainder of the step 2:
89,842,413,734 ÷ 20,057,595,395 = 4 + 9,612,032,154
Step 4. Divide the remainder of the step 2 by the remainder of the step 3:
20,057,595,395 ÷ 9,612,032,154 = 2 + 833,531,087
Step 5. Divide the remainder of the step 3 by the remainder of the step 4:
9,612,032,154 ÷ 833,531,087 = 11 + 443,190,197
Step 6. Divide the remainder of the step 4 by the remainder of the step 5:
833,531,087 ÷ 443,190,197 = 1 + 390,340,890
Step 7. Divide the remainder of the step 5 by the remainder of the step 6:
443,190,197 ÷ 390,340,890 = 1 + 52,849,307
Step 8. Divide the remainder of the step 6 by the remainder of the step 7:
390,340,890 ÷ 52,849,307 = 7 + 20,395,741
Step 9. Divide the remainder of the step 7 by the remainder of the step 8:
52,849,307 ÷ 20,395,741 = 2 + 12,057,825
Step 10. Divide the remainder of the step 8 by the remainder of the step 9:
20,395,741 ÷ 12,057,825 = 1 + 8,337,916
Step 11. Divide the remainder of the step 9 by the remainder of the step 10:
12,057,825 ÷ 8,337,916 = 1 + 3,719,909
Step 12. Divide the remainder of the step 10 by the remainder of the step 11:
8,337,916 ÷ 3,719,909 = 2 + 898,098
Step 13. Divide the remainder of the step 11 by the remainder of the step 12:
3,719,909 ÷ 898,098 = 4 + 127,517
Step 14. Divide the remainder of the step 12 by the remainder of the step 13:
898,098 ÷ 127,517 = 7 + 5,479
Step 15. Divide the remainder of the step 13 by the remainder of the step 14:
127,517 ÷ 5,479 = 23 + 1,500
Step 16. Divide the remainder of the step 14 by the remainder of the step 15:
5,479 ÷ 1,500 = 3 + 979
Step 17. Divide the remainder of the step 15 by the remainder of the step 16:
1,500 ÷ 979 = 1 + 521
Step 18. Divide the remainder of the step 16 by the remainder of the step 17:
979 ÷ 521 = 1 + 458
Step 19. Divide the remainder of the step 17 by the remainder of the step 18:
521 ÷ 458 = 1 + 63
Step 20. Divide the remainder of the step 18 by the remainder of the step 19:
458 ÷ 63 = 7 + 17
Step 21. Divide the remainder of the step 19 by the remainder of the step 20:
63 ÷ 17 = 3 + 12
Step 22. Divide the remainder of the step 20 by the remainder of the step 21:
17 ÷ 12 = 1 + 5
Step 23. Divide the remainder of the step 21 by the remainder of the step 22:
12 ÷ 5 = 2 + 2
Step 24. Divide the remainder of the step 22 by the remainder of the step 23:
5 ÷ 2 = 2 + 1
Step 25. Divide the remainder of the step 23 by the remainder of the step 24:
2 ÷ 1 = 2 + 0
At this step, the remainder is zero, so we stop:
1 is the number we were looking for - the last non-zero remainder.
This is the greatest (highest) common factor (divisor).


The greatest (highest) common factor (divisor):
gcf, hcf, gcd (109,900,009,129; 199,742,422,863) = 1
Coprime numbers (prime to each other, relatively prime).
The two numbers have no prime factors in common


Why do we need to calculate the greatest common factor?


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The greatest (highest) common factor (divisor), gcf, hcf, gcd. What it is and how to calculate it.

  • Note 1: The greatest common factor (gcf) is also called the highest common factor (hcf), or the greatest common divisor (gcd).
  • Note 2: The Prime Factorization of a number: finding the prime numbers that multiply together to make that number.
  • Suppose the number "t" evenly divides the number "a" ( = when evenly dividing the number "a" by "t", the remainder is zero).
  • When we look at the prime factorization of "a" and "t", we find that:
  • 1) all the prime factors of "t" are also prime factors of "a"
  • and
  • 2) the exponents of the prime factors of "t" are equal to or smaller than the exponents of the prime factors of "a" (see the * Note below)
  • For example, the number 12 is a divisor (a factor) of the number 60:
  • 12 = 2 × 2 × 3 = 22 × 3
  • 60 = 2 × 2 × 3 × 5 = 22 × 3 × 5
  • * Note: 23 = 2 × 2 × 2 = 8. We say that 2 was raised to the power of 3. In this example, 3 is the exponent and 2 is the base. The exponent indicates how many times the base is multiplied by itself. 23 is the power and 8 is the value of the power.
  • If the number "t" is a common divisor of the numbers "a" and "b", then:
  • 1) "t" only has the prime factors that also intervene in the prime factorization of "a" and "b".
  • and
  • 2) each prime factor of "t" has the smallest exponents with respect to the prime factors of the numbers "a" and "b".
  • For example, the number 12 is the common divisor of the numbers 48 and 360. Below is their prime factorization:
  • 12 = 22 × 3
  • 48 = 24 × 3
  • 360 = 23 × 32 × 5
  • You can see that the number 12 has only the prime factors that also occur in the prime factorization of the numbers 48 and 360.
  • You can see above that the numbers 48 and 360 have several common factors: 2, 3, 4, 6, 8, 12, 24. Out of these, 24 is the greatest common factor (GCF) of 48 and 360.
  • 24 = 2 × 2 × 2 × 3 = 23 × 3
  • 48 = 24 × 3
  • 360 = 23 × 32 × 5
  • 24, the greatest common factor of the numbers 48 and 360, is calculated as the product of all the common prime factors of the two numbers, taken by the smallest exponents (powers).
  • If two numbers "a" and "b" have no other common factor than 1, gcf (a, b) = 1, then the numbers "a" and "b" are called coprime numbers (relatively prime, prime to each other).
  • If "a" and "b" are not relatively prime numbers, then every common divisor of "a" and "b" is a divisor of the greatest common divisor of "a" and "b".
  • Let's have an example on how to calculate the greatest common factor, gcf, of the following numbers:
  • 1,260 = 22 × 32
  • 3,024 = 24 × 32 × 7
  • 5,544 = 23 × 32 × 7 × 11
  • gcf (1,260, 3,024, 5,544) = 22 × 32 = 252
  • And another example:
  • 900 = 22 × 32 × 52
  • 270 = 2 × 33 × 5
  • 210 = 2 × 3 × 5 × 7
  • gcf (900, 270, 210) = 2 × 3 × 5 = 30
  • And one more example:
  • 90 = 2 × 32 × 5
  • 27 = 33
  • 22 = 2 × 11
  • gcf (90, 27, 22) = 1 - The three numbers have no prime factors in common, they are relatively prime.