Cyclotomic polynomial

English

Template:Lb For a positive integer n, a polynomial whose roots are the primitive n^th roots of unity, so that its degree is Euler's totient function of n. That is, letting $ζ_{n} = e^{i 2 π / n}$ be the first primitive n^th root of unity, then $Φ_{n} (x) = \prod_{\overset{1 \leq m < n}{\gcd (n, m) = 1}} (x - ζ_{n}^{m})$ is the n^th such polynomial. Template:C
For a prime number $p$ , the $p$ ^th cyclotomic polynomial is $\frac{x^{p} - 1}{x - 1} = x^{p - 1} + x^{p - 2} + . . . + x^{2} + x + 1$ .

Cyclotomic polynomials can be shown to be irreducible through the Eisenstein irreducibility criterion, after replacing $x$ with $x + 1$ .