Cyclotomic polynomial identity proof with primes.

86 Views Asked by user482939 At 25 Mar 2026 - 7:01

If p is prime, show that $\Phi_{p}(x^{p^{k-1}})=\Phi_{p^{k}}(x)$.

Here is my attempt:

$x^{p^{k}}-1=\prod_{d|p^{k}}\Phi_{d}(x)=\prod_{i=1}^{k}\Phi_{p^{i}}(x)=\Phi_{p^{k}}(x)(\Phi_{p}\Phi_{p^{2}}\cdots \Phi_{p^{k-1}})=(x^{p^{k-1}})^{p}-1=(x^{p^{k-1}}-1)\Phi_{p}(x^{p^{k-1}})$

But how do I show that $x^{p^{k-1}}-1=\Phi_{p}\Phi_{p^{2}}\cdots \Phi_{p^{k-1}}$?

Original Q&A

Cyclotomic polynomial identity proof with primes.

Related Questions in PRIME-NUMBERS

Related Questions in PROOF-EXPLANATION

Related Questions in CYCLOTOMIC-POLYNOMIALS

Trending Questions

Popular # Hahtags

Popular Questions