4. Let U L. Let x1, x2, . . . be a sequence that is convergent...
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4. Let U ≥ L. Let x1, x2, . . . be a sequence that is convergent but not absolutely convergent.
Show that there is a reordering of the x’s such that U is the limit superior of the partial sums of the x’s, and so that L is the limit inferior. Hint: Study the proof of Riemann’s Rainbow Theorem 3.3.5.
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