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In this paper we determine $\\sum_{k=0}^{p^a-1}\\binom{2k}{k+d}/m^k$ mod $p^2$ for $d=0,1$; for example, $$\\sum_{k=0}^{p^a-1}\\frac{\\binom{2k}k}{m^k}\\equiv\\left(\\frac{m^2-4m}{p^a}\\right)+\\left(\\frac{m^2-4m}{p^{a-1}}\\right)u_{p-(\\frac{m^2-4m}{p})}\\pmod{p^2},$$ where $(-)$ is the Jacobi symbol, and $\\{u_n\\}_{n\\geqslant0}$ is the Lucas sequence given by $u_0=0$, $u_1=1$ and $u_{n+1}=(m-2)u_n-u_{n-1}$ for $n=1,2,3,\\ldots$. As an application, we determine $\\sum_{00$ and $m \\not\\equiv0\\pmod p$. In this paper we determine $\\sum_{k=0}^{p^a-1}\\binom{2k}{k+d}/m^k$ mod $p^2$ for $d=0,1$; for example, $$\\sum_{k=0}^{p^a-1}\\frac{\\binom{2k}k}{m^k}\\equiv\\left(\\frac{m^2-4m}{p^a}\\right)+\\left(\\frac{m^2-4m}{p^{a-1}}\\right)u_{p-(\\frac{m^2-4m}{p})}\\pmod{p^2},$$ where $(-)$ is the Jacobi symbol, and $\\{u_n\\}_{n\\geqslant0}$ is the Lucas sequence given by $u_0=0$, $u_1=1$ and $u_{n+1}=(m-2)u_n-u_{n-1}$ for $n=1,2,3,\\ldots$. As an application, we determine $\\sum_{0