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The Hankel matrix $\\mathcal{H}_\\mu=(\\mu_{n+k})_{n,k\\geq 0}$ with entries $\\mu_{n,k}=\\mu_{n+k}$ induces the operator $$ \\mathcal{H}_\\mu(f)(z)=\\sum^\\infty_{n=0}\\left(\\sum^\\infty_{k=0}\\mu_{n,k}a_k\\right)z^n $$ on the space of all analytic functions $f(z)=\\sum^\\infty_{n=0}a_nz^n$ in the unit disk $\\mathbb{D}$. In this paper, we characterize the boundedness and compactness of $\\mathcal{H}_\\mu$ from Bloch type spaces to the BMOA and the Bloch space. 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