Let $F$ be a free group generated by a set $S$. For $g\in F$, let $l(g)$ be the length of $g$ with respect to $S$. Now for $a\in G$ and $g_1,\dotsc,g_n\in G$, let $$T=g_1^{-1}ag_1g_2^{-1}ag_2\dotsm g_n^{-1}ag_n.$$ What can we say about $l(T)$ in terms of $l(a)$? Is it known that $l(T)\geq l(a)$?...