: Methods for computing Galois groups for specific types of polynomials, such as cubics or cyclotomic polynomials.
A well-known repository for Dummit and Foote solutions. Dummit And Foote Solutions Chapter 14
Let $G$ be a group and $\rho: G \to GL(V)$ a representation. Show that if $W$ is a $G$-invariant subspace of $V$, then $\rho(G)W \subseteq W$. : Methods for computing Galois groups for specific
From that day on, I approached my studies with a newfound sense of confidence and humility, knowing that sometimes, it's okay to ask for help and that the right resources can make all the difference. knowing that sometimes