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If $X$ is distal, we prove that the average \\[\\frac{1}{N}\\sum_{i=0}^{N} f_1(T_1^nx)f_2(T_2^nx)\\cdots f_d(T_d^nx) \\] converges for $\\mu$-a.e. $x\\in X$ as $N\\to\\infty$. 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