Let (x,) be a sequence of real numbers. If for some x e R, (x,) converges to both 7x + 2 and 2x - 13 then converges to -19 (x,) cannot converge to both 7x + 2 and 2x - 13 since the limit of a sequence, if (x,) b0 exists, is unique none of the listed statements is true .c O converges to 19 (x,) .dO
Let (x,) be a sequence of real numbers. If for some x e R, (x,) converges to both 7x + 2 and 2x - 13 then converges to -19 (x,) cannot converge to both 7x + 2 and 2x - 13 since the limit of a sequence, if (x,) b0 exists, is unique none of the listed statements is true .c O converges to 19 (x,) .dO
Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
Section: Chapter Questions
Problem 1RQ
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Transcribed Image Text:Let (x,) be a sequence of real numbers. If for some x e R. (x,) converges to
both 7x + 2 and 2x - 13 then
converges to -19 (x,)
cannot converge to both 7x + 2 and 2x - 13 since the limit of a sequence, if (x,) b0
exists, is unique
none of the listed statements is true
.c O
converges to 19 (x,) .dO
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