A note on the set $\boldsymbol{A(A+A)}$

Abstract: Let $p$ a large enough prime number. When $A$ is a subset of $\mathbb{F}_p\smallsetminus{0}$ of cardinality $|A|> (p+1)/3$, then an application of Cauchy-Davenport Theorem gives $\mathbb{F}_p\smallsetminus{0}\subset A(A+A)$. In this note, we improve on this and we show that if $|A|\ge 0.3051 p$ implies $A(A+A)\supseteq\mathbb{F}_p\smallsetminus{0}$. In the opposite direction we show that there exists a set $A$ such that $|A| > (1/8+o(1))p$ and $\mathbb{F}_p\smallsetminus{0}\not\subseteq A(A+A)$.