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8. If lo (x < 0), I(x) = 1 (x >0), if {xn} is a sequence of distinct points of (a, b), and if C converges, prove that the series (a S.x <b) - n=1 f(x) = Σc, I(x – Χ.) f(x) = (x - ) converges uniformly, and that f is continuous for every x * Xn mos uniformly 104