Cyclotomic polynomial: Difference between revisions

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:<math>\Phi_8(X) = X^4+1  ;\,</math>
:<math>\Phi_8(X) = X^4+1  ;\,</math>
:<math>\Phi_9(X) = X^6+X^3+1  ;\,</math>
:<math>\Phi_9(X) = X^6+X^3+1  ;\,</math>
:<math>\Phi_{10}(X) = X^4-X^3+X^2-X+1. ;\,</math>
:<math>\Phi_{10}(X) = X^4-X^3+X^2-X+1. ;\,</math>[[Category:Suggestion Bot Tag]]

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In algebra, a cyclotomic polynomial is a polynomial whose roots are a set of primitive roots of unity. The n-th cyclotomic polynomial, denoted by Φn has integer cofficients.

For a positive integer n, let ζ be a primitive n-th root of unity: then

The degree of is given by the Euler totient function .

Since any n-th root of unity is a primitive d-th root of unity for some factor d of n, we have

By the Möbius inversion formula we have

where μ is the Möbius function.

Examples