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Chapter 1: Q. 2 TB (page 106)

Find the solution sets of each of the following inequalities.
$0 < | x + 5 | < 0.1$

Short Answer

Expert verified

The solution set of inequality is $(- 5.1, - 5) 鈭� (- 5, - 4.9) .$

Step by step solution

01

Step 1. Given information

Given inequality is $0 < | x + 5 | < 0.1 .$

02

Step 2. simplify the first inequality.

Take inequality $0 < | x + 5 | .$

$0 < (x + 5) - 5 < x$

or role="math" localid="1648512971119" $0 < - (x + 5) 0 < - x + 5 - 5 > x$

Sorole="math" localid="1648513556279" $x 鈭� (- 鈭�, - 5) 鈭� (- 5, 鈭�)$

03

Step 3. simplify the second inequality.

Take inequality $| x + 5 | < 0.1 .$

$| x + 5 | < 0.1 x + 5 < 0.1 x < - 4.9$

or

role="math" localid="1648513291951" $| x + 5 | < 0.1 - (x + 5) < 0.1 - x - 5 < 0.1 x > - 5.1$

sorole="math" localid="1648513589151" $- 5.1 < x < - 4.9 x 鈭� (- 5.1, - 4.9)$

04

Step 4. The solution set of the inequality.

Combine both inequalities.

$x 鈭� ((- 鈭�, - 5) 鈭� (- 5, 鈭�)) 鈭� (- 5.1, - 4.9) x 鈭� [(- 鈭�, - 5) 鈭� (- 5.1, - 4.9)] 鈭� [(- 5, 鈭�) 鈭� (- 5.1, - 4.9)] x 鈭� (- 5.1, - 5) 鈭� (- 5, - 4.9)$

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Most popular questions from this chapter

Write delta-epsilon proofs for each of the limit statements in Exercises $47 鈥� 60 .$

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