Is 17 a prime number?
Primality test for 17
Step-by-step primality test
√17 ≈ 4.12 → testing all candidates up to 4
Every prime > 3 is of the form 6k − 1 or 6k + 1. We test these candidates up to √N by computing the remainder using Euclidean division:
| 17 mod 2 = 1 | |
| 17 mod 3 = 2 |
No divisor found → 17 is prime.
17 is:
- prime
- odd
- a twin prime — part of the pair (17, 19)
- a Fermat prime (F2 = 2^(2^2) + 1)
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Limit: 2 to 10¹² (1,000,000,000,000). The tool tests up to ~78,500 candidate divisors and returns an answer in milliseconds.
About prime numbers
Why do primes matter?
Prime numbers are the building blocks of all integers. By the Fundamental Theorem of Arithmetic, every integer ≥ 2 can be written as a unique product of primes. Primes also underpin modern cryptography: RSA encryption relies on the fact that multiplying two large primes together is trivial, but factoring the result back is computationally hard.
How common are primes?
Primes become rarer as numbers grow, but they never stop entirely. The Prime Number Theorem (proved independently by Hadamard and de la Vallée Poussin in 1896) states that the count of primes up to N is approximately N ÷ ln(N). Around 10¹², roughly one integer in every 28 is prime — still very common.