What is the asymptotic estimate of $\sharp\left\{n\leq x,\frac{\Omega (n)}{\omega (n)}> 1+\varepsilon \right\}$, with fixed $\varepsilon > 0$, where $ n=s\cdot q$ ; $s$-a powerfull part of $n$ and $q$ a squarefree part of $n$, under the condition $s> q$ and $q> 1$ ?