Question: Given a real number R, define f(x) = x^ ln x. (a) For each R, compute lim x0+ f(x). (b) Determine for which values R

Given a real number R, define f(x) = x^ ln x.

(a) For each R, compute lim x0+ f(x).

(b) Determine for which values R the integral x^ lnx dx converge (1 is the upper bound and 0 is the lower bound)

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