(a) To determine To graph: The given function; g ( x ) = { x 2 → x < − 1 x + 2 → − 1 ≤ x < 1 3 − x → x ≥ 1 . Explanation Given: The function, g ( x ) = { x 2 → x < − 1 x + 2 → − 1 ≤ x < 1 3 − x → x ≥ 1 is given and its curve has to be drawn. g ( x ) Is divided into 3 parts, and value of g ( x ) is calculated by inserting values of x in g ( x ) to obtain the graph. Graph: (i) g ( x ) = x 2 when x < − 1 x -2 -3 -4 g ( x ) 4 9 16 (ii) g ( x ) = x + 2 when − 1 ≤ x < 1 x -1 0 0.5 g ( x ) 1 2 2 (b) To determine To calculate: The value of indicated limit lim x → − 1 g ( x ) using the graph in (a) (c) To determine To calculate: The value of indicated limit lim x → 0 g ( x ) using the graph in (a) (d) To determine To calculate: The value of indicated limit lim x → 1 g ( x ) using the graph in (a)

12th Edition

ISBN: 9780134776323

Author: MULLINS

Publisher: PEARSON CUSTOM PUB.(CONSIGNMENT)

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Question

Chapter 11.1, Problem 30E

(a)

To determine

To graph: The given function;

g(x)={x2→x<−1x+2→−1≤x<13−x→x≥1.

(b)

To determine

To calculate: The value of indicated limit limx→−1g(x) using the graph in (a)

(c)

To determine

To calculate: The value of indicated limit limx→0g(x) using the graph in (a)

(d)

To determine

To calculate: The value of indicated limit limx→1g(x) using the graph in (a)

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Chapter 11.1, Problem 29E

Chapter 11.1, Problem 31E

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Example: For what odd primes p is 11 a quadratic residue modulo p? Solution: This is really asking "when is (11 | p) =1?" First, 11 = 3 (mod 4). To use LQR, consider two cases p = 1 or 3 (mod 4): p=1 We have 1 = (11 | p) = (p | 11), so p is a quadratic residue modulo 11. By brute force: 121, 224, 3² = 9, 4² = 5, 5² = 3 (mod 11) so the quadratic residues mod 11 are 1,3,4,5,9. Using CRT for p = 1 (mod 4) & p = 1,3,4,5,9 (mod 11). p = 1 (mod 4) & p = 1 (mod 11 gives p 1 (mod 44). p = 1 (mod 4) & p = 3 (mod 11) gives p25 (mod 44). p = 1 (mod 4) & p = 4 (mod 11) gives p=37 (mod 44). p = 1 (mod 4) & p = 5 (mod 11) gives p 5 (mod 44). p = 1 (mod 4) & p=9 (mod 11) gives p 9 (mod 44). So p =1,5,9,25,37 (mod 44).

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Chapter 11 Solutions

EBK MATHEMATICS WITH APPLICATIONS IN TH

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To graph: The given function; g ( x ) = { x 2 → x &lt; − 1 x + 2 → − 1 ≤ x &lt; 1 3 − x → x ≥ 1 .

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To graph: The given function; g(x)={x2→x<−1x+2→−1≤x<13−x→x≥1.

To calculate: The value of indicated limit limx→−1g(x) using the graph in (a)

To calculate: The value of indicated limit limx→0g(x) using the graph in (a)

To calculate: The value of indicated limit limx→1g(x) using the graph in (a)

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Chapter 11 Solutions

To graph: The given function; g ( x ) = { x 2 → x < − 1 x + 2 → − 1 ≤ x < 1 3 − x → x ≥ 1 .

To graph: The given function;

g(x)={x2→x<−1x+2→−1≤x<13−x→x≥1.