Explanation Calculation: Here as per diagram, According to above diagram, it is observe that f ( x ) = 1 x , c = 1 2 , L = 2 , ∈ = 0.01 We need to find the value of δ > 0 for all value of x . 0 < | x − c | < δ = | f ( x ) − L | < ∈ | ( x − ( 1 2 ) ) | < δ = − δ < ( x − 1 2 ) < δ Add 1 2 to both side of the inequality − δ < ( x − 1 2 ) < δ , we get − δ + 1 2 < ( x − 1 2 + 1 2 )<

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Author: Joel R. Hass, Maurice D. Weir, George B. Thomas, Jr., Przemyslaw Bogacki

Publisher: PEARSON

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Chapter 2.3, Problem 14E

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δ>0, if |f(x)−L|<∈ whenever 0<|x−c|<δ by using diagram.

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Chapter 2.3, Problem 13E

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δ > 0 , if | f ( x ) − L | < ∈ whenever 0 < | x − c | < δ by using diagram.

Solution Summary: The author explains how to determine the value of delta >0 by using diagram.

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δ>0, if |f(x)−L|<∈ whenever 0<|x−c|<δ by using diagram.

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δ &gt; 0 , if | f ( x ) − L | &lt; ∈ whenever 0 &lt; | x − c | &lt; δ by using diagram.

Solution Summary: The author explains how to determine the value of delta >0 by using diagram.

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δ>0, if |f(x)−L|<∈ whenever 0<|x−c|<δ by using diagram.

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Chapter 2 Solutions

δ > 0 , if | f ( x ) − L | < ∈ whenever 0 < | x − c | < δ by using diagram.