Chapter 7: Q. 67 (page 605)

Let c be a constant, and let $a k$ and $b k$ be convergent sequences with $a k$ as L and $b k$ as
as k.

Short Answer

Expert verified

The value is $\lim_{k 鈫� 鈭�} c a_{k} = c L .$

Step by step solution

Given information

The convergence sequence is $\{a_{k}\} such that a_{k} 鈫� L$ .

Calculation.

The goal is to demonstrate $c a_{k} 鈫� c L .$

To demonstrate $c a_{k} 鈫� c L$ , use the sequence's notion of convergence $\{a_{k}\}$ the series $\{a_{k}\}$ converges to L and is convergent.

When given $蔚 > 0$ , there is an integer N that is positive and such that,

$|a_{k} - L| < \frac{蔚}{c} f o r k 鈮� N$

Each term in the sequence is $0$ when $c = 0$ .

The series stabilizes and eventually converges to zero, becoming a constant sequence.

For $c 鈮� 0$ , the value of $|c a_{k} - c L|$ is

localid="1661332238088"

\begin{array}{rcl} |c a_{k} - c L| & = & | c | |a_{k} - L| < | c | \frac{蔚}{| c |} (Use of 1) \\ = & 蔚 \end{array}

Thus, for $k 鈮� N, |c a_{k} - c L| < 蔚$ and hence, $\{c a_{k}\}$ is convergent.

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91影视

Let c be a constant, and let $a k$ and $b k$ be convergent sequences with $a k$ as L and $b k$ as
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Let c be a constant, and let akand bkbe convergent sequences with akas L and bkas as k.

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Step by step solution

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Calculation.

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Let c be a constant, and let $a k$ and $b k$ be convergent sequences with $a k$ as L and $b k$ as
as k.