In this article, we consider random walk on the infinite cluster of bond percolation on $\Z^d \ (d \geq 2)$. We show that the Laplace transformation of the number of visited points $N_n$, has a behaviour as the random walk was on $\Z^d$. More precisely, for all $0<\alpha<1$, we proved that there exist constants $C_i$ and $C_s$ such that for all infinite cluster that contains the origin, we have: $$ e^{-C_i n^{ \frac{d}{d+2} } } \leq \E_0^{\omega} ( \alpha^{N_n} ) \leq e^{-C_sn^{ \frac{d}{d+2} }}.$$ Our approach is based on finding an isoperimetric inequalities on the infinite cluster, lifted on a wreath product which give good behaviour. The problem of the isoperimetry on wreath product was already raised by A.Ershler.