Prime factorization of 9477

Below you can find the full step by step solution for you problem. We hope it will be very helpful for you and it will help you to understand the solving process.

If it's not what You are looking for type in the field below your own integer, and You will get the solution.

Prime factorization of 9477:

By prime factorization of 9477 we follow 5 simple steps:
1. We write number 9477 above a 2-column table
2. We divide 9477 by the smallest possible prime factor
3. We write down on the left side of the table the prime factor and next number to factorize on the ride side
4. We continue to factor in this fashion (we deal with odd numbers by trying small prime factors)
5. We continue until we reach 1 on the ride side of the table

9477
prime factorsnumber to factorize
33159
31053
3351
3117
339
313
131


Prime factorization of 9477 = 1×3×3×3×3×3×3×13= $ 1 × 3^6 × 13 $

 

See similar ones:

| Factors of 14428676 | | Factors of 13220496 | | Prime factorization of 63475 | | Factors of 67597 | | Prime factorization of 222784 | | Factors of 636804 | | Factors of 636805 | | Prime factorization of 790321 | | Prime factorization of 55225 | | Prime factorization of 16039370 | | Factors of 166753 | | Factors of 185259 | | Factors of 4582 | | Prime factorization of 153770 | | Prime factorization of 33185509 | | Prime factorization of 1033162084 | | Factors of 7409811047825 | | Prime factorization of 20112871792 | | Prime factorization of 357535 | | Prime factorization of 198669 | | Factors of 95823 | | Prime factorization of 26867 | | Prime factorization of 2490 | | Prime factorization of 6815 | | Prime factorization of 3628411 | | Prime factorization of 13488475 | | Factors of 101574 | | Factors of 28050 | | Prime factorization of 30294 | | Prime factorization of 13464 | | Prime factorization of 10098 | | Factors of 30758 |

Equations solver categories