Is it true that the homotopy category of $E_n$-spaces group-like is equivalent to the homotopy category of pointed $n$-connected spaces ? If it is true, what should be the statement  when $"n\rightarrow \infty"$ ?

By $n$-connected space $X$, I mean that $\pi_{i}X=0$ for $0\leq i\leq n-1$.