What is the answer?Please write neatly, thank you! Let (xn) be bounded, and lim (xn – xn+1) = 0. Let L = lim inf rn and H = lim sup xn. Show that everyn00n 00n00number in the interval [L, H] is a limit point for (xn).Hint: prove by contradiction.

Given that,xn is bounded and limn→∞xn-xn+1=0. Also, L=limn→∞inf xnH=limn→∞sup xn By the definition…

Answered: Let (xn) be bounded, and lim (xn –…

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

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Let (xn) be bounded, and lim (xn – xn+1) = 0. Let L = lim inf xn and H = lim sup xn. Show that every n00 n00 n00 number in the interval [L, H] is a limit point for (xn). Hint: prove by contradiction.