Prove or disprove the following:
$(1)$ Let $H$,$K$ be subgroups of a finite group $G$. If $|HK|=|\langle H,K \rangle|$, then $HK=\langle H,K \rangle$, that is, $HK$ is a subgroup of $G$.
$(2)$ Let $H_{1}$,$H_{2}$,..., $H_{n}$ be subgroups of a finite group $G$, where $n$ is a positive intger. If $|H_{1}H_{2}...H_{n}|=|\langle H_{1},H_{1},...,H_{n} \rangle|$, then $H_{1}H_{2}...H_{n}=\langle H_{1},H_{1},...,H_{n} \rangle$, that is, $H_{1}H_{2}...H_{n}$ is a subgroup of $G$.
My try:
$(1)$ $HK$ is a subset of $\langle H,K \rangle$. Since $|HK|=|\langle H,K \rangle|$ and $\langle H,K \rangle$ is a subgroup of $G$, then $HK=\langle H,K \rangle$.
$(2)$ Same as in $(1)$.