the GCF is 33
This cannot be determined based on the number you provided. You must have at least two whole numbers to determine a greatest common factor. Leave a space between the digits if you want to specify two or more numbers.Yiou need at least two numbers to find a GCF.
143
For small numbers which we can factorize easily, it is practical to use prime factorizations to find the greatest common factor. For larger numbers, however, this is not always practical. So instead we use the Euclidean Algorithm, as follows. (Here, * means multiply.) 330495 = 400 * 825 + 495 825 = 1 * 495 + 330 495 = 1 * 330 + 165 330 = 2 * 165 + 0 At each step, we divide one number by the other and get a remainder. (So when 330495 is divided by 825 the remainder is 495, etc). So we get the sequence 330495 , 825 , 495 , 330 , 165 , 0. Every common factor of 330495 and 825 is also a factor of 495, and every common factor of 825 and 495 is also a factor of 330495. Therefore the common factors of 330495 and 825 are precisely the common factors of 825 and 495. Similarly, the common factors of 825 and 495 are precisely the common factors of 495 and 330; and the common factors of 495 and 330 are precisely the common factors of 330 and 165; and these are precisely the factors of 165. In short, the common factors of the original two numbers are the factors of 165 (including 165 itself) and no others.
Factors of 1323: 1, 3, 7, 9, 21, 27, 49, 63, 147, 189, 441, 1323.Factors of 9009: 1, 3, 7, 9, 11, 13, 21, 33, 39, 63, 77, 91, 99, 117, 143, 231, 273, 429, 693, 819, 1001, 1287, 3003, 9009.GCF (1323, 9009) = 63
11 and 429's highest common factor is 11.
The GCF is: 143
the GCF is 33
The greatest common factor is the highest number that divides exactly into two or more numbers.' 429: 1, 3, 11, 13, 33, 39, 143, 429 715: 1, 5, 11, 13, 55, 65, 143, 715. The GCF of 429 and 715 is 143.
The GCF is 39.
This cannot be determined based on the number you provided. You must have at least two whole numbers to determine a greatest common factor. Leave a space between the digits if you want to specify two or more numbers.Yiou need at least two numbers to find a GCF.
The GCF of 429 and 507 is 39. The prime factorization of 507 is 3 x 13 x 13 The prime factorization of 429 is 3 x 11 x 13; THe common factors are 3 & 13 so the GCF is 39
143
The common factors are: 1, 3, 13, 39
429 is a composite number because it has factors other than 1 and itself. It is not a prime number.The 8 factors of 429 are 1, 3, 11, 13, 33, 39, 143, and 429.The factor pairs of 429 are 1 x 429, 3 x 143, 11 x 39, and 13 x 33.The proper factors of 429 are 1, 3, 11, 13, 33, 39, and 143 or,if the definition you are using excludes 1, they are 3, 11, 13, 33, 39, and 143.The prime factors of 429 are 3, 11, and 13.The 2 distinct prime factors (listing each prime factor only once) of 429 are 3, 11, and 13.The prime factorization of 429 is 3 x 11 x 13.NOTE: There cannot be common factors, a greatest common factor, or a least common multiple because "common" refers to factors or multiples that two or more numbers have in common.
No.
For small numbers which we can factorize easily, it is practical to use prime factorizations to find the greatest common factor. For larger numbers, however, this is not always practical. So instead we use the Euclidean Algorithm, as follows. (Here, * means multiply.) 330495 = 400 * 825 + 495 825 = 1 * 495 + 330 495 = 1 * 330 + 165 330 = 2 * 165 + 0 At each step, we divide one number by the other and get a remainder. (So when 330495 is divided by 825 the remainder is 495, etc). So we get the sequence 330495 , 825 , 495 , 330 , 165 , 0. Every common factor of 330495 and 825 is also a factor of 495, and every common factor of 825 and 495 is also a factor of 330495. Therefore the common factors of 330495 and 825 are precisely the common factors of 825 and 495. Similarly, the common factors of 825 and 495 are precisely the common factors of 495 and 330; and the common factors of 495 and 330 are precisely the common factors of 330 and 165; and these are precisely the factors of 165. In short, the common factors of the original two numbers are the factors of 165 (including 165 itself) and no others.