Let $G$ be a group with subgroups $H$ and $K$ with index $r=[G:H]$ and $s=[G:K]$. Show that: $[G:H\cap K]\leq rs$
I know it works with Lagrange, but I don't know exactly how.
Let $G$ be a group with subgroups $H$ and $K$ with index $r=[G:H]$ and $s=[G:K]$. Show that: $[G:H\cap K]\leq rs$
I know it works with Lagrange, but I don't know exactly how.
linear-algebra? – José Carlos Santos Oct 14 '18 at 15:44