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Chapter 1: Q. 23 (page 153)

Limits of combinations: Fill in the blanks to complete the limit
rules that follow. You may assume that k and c are any real
numbers and that both $\lim_{x 鈫� c} f (x) and \lim_{x 鈫� c} g (x)$ exist.
$\lim_{x 鈫� c} (f (x) - g (x)) =______$

Short Answer

Expert verified

The value of the limit is $\lim_{x 鈫� c} (f (x) - g (x)) = \lim_{x 鈫� c} f (x) - \lim_{x 鈫� c} g (x) .$

Step by step solution

01

Step 1. Given Information.

The given limit function is $\lim_{x 鈫� c} (f (x) - g (x)) .$

02

Step 2. Filling the blank.

To fill the blank, use the Difference Rule of limits.

So,

$\lim_{x 鈫� c} (f (x) - g (x)) = \lim_{x 鈫� c} f (x) - \lim_{x 鈫� c} g (x) .$

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Most popular questions from this chapter

Write a delta鈥揺psilon proof that proves that $f$ is continuous on its domain. In each case, you will need to assume that 未 is less than or equal to $1$ .

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Each function in Exercises 9鈥�12 is discontinuous at some value x = c. Describe the type of discontinuity and any one-sided continuity at x = c, and sketch a possible graph of f.

$\lim_{x 鈫� 2^{-}} f (x) = - 鈭�, \lim_{x 鈫� 2^{+}} f (x) = 鈭�, f (2) = 3 .$

$\lim_{x 鈫� + 2} \sqrt{2^{x} - 4}$

Use what you know about one-sided limits to prove that a function $f$ is continuous at a point $x = c$ if and only if it is both left and right continuous at $x = c$ .

Sketch a labeled graph of a function that fails to satisfy the hypothesis of the Intermediate Value Theorem, and illustrate on your graph that the conclusion of the Intermediate Value Theorem does not necessarily hold.

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