EBK MATHEMATICS FOR MACHINE TECHNOLOGY
8th Edition
ISBN: 9781337798396
Author: SMITH
Publisher: CENGAGE LEARNING - CONSIGNMENT
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Textbook Question
Chapter 1, Problem 3A
The circle in Figure 1-5 is divided into equal parts. Write the fractional part represented by each of the following in Exercises 3 and 4:
3. a. 1 part.
b. 3 parts .
c. 7 parts .
d. 5 parts .
e. 16 parts .
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Students have asked these similar questions
Use the Euclidean algorithm to find two sets of integers (a, b, c) such
that
55a65b+143c:
Solution
= 1.
By the Euclidean algorithm, we have:
143 = 2.65 + 13 and 65 = 5.13, so 13 = 143 – 2.65.
-
Also, 55 = 4.13+3, 13 = 4.3 + 1 and 3 = 3.1,
so 1 = 13 — 4.3 = 13 — 4(55 – 4.13) = 17.13 – 4.55.
Combining these, we have:
1 = 17(143 – 2.65) - 4.55 = −4.55 - 34.65 + 17.143,
so we can take a = − −4, b = −34, c = 17. By carrying out the division
algorithm in other ways, we obtain different solutions, such as
19.55 23.65 +7.143, so a = = 9, b -23, c = 7.
=
=
how
?
come
[Note that 13.55 + 11.65 - 10.143 0, so we can obtain new solutions by
adding multiples of this equation, or similar equations.]
-
Let n = 7, let p = 23 and let S be the set of least positive residues mod p of the first (p − 1)/2
multiple of n, i.e.
n mod p, 2n mod p, ...,
p-1
2
-n mod p.
Let T be the subset of S consisting of those residues which exceed p/2.
Find the set T, and hence compute the Legendre symbol (7|23).
23
32
how come?
The first 11 multiples of 7 reduced mod 23 are
7, 14, 21, 5, 12, 19, 3, 10, 17, 1, 8.
The set T is the subset of these residues exceeding
So T = {12, 14, 17, 19, 21}.
By Gauss' lemma (Apostol Theorem 9.6),
(7|23) = (−1)|T| = (−1)5 = −1.
Let n = 7, let p = 23 and let S be the set of least positive residues mod p of the first (p-1)/2
multiple of n, i.e.
n mod p, 2n mod p, ...,
2
p-1
-n mod p.
Let T be the subset of S consisting of those residues which exceed p/2.
Find the set T, and hence compute the Legendre symbol (7|23).
The first 11 multiples of 7 reduced mod 23 are
7, 14, 21, 5, 12, 19, 3, 10, 17, 1, 8.
23
The set T is the subset of these residues exceeding
2°
So T = {12, 14, 17, 19, 21}.
By Gauss' lemma (Apostol Theorem 9.6),
(7|23) = (−1)|T| = (−1)5 = −1.
how come?
Chapter 1 Solutions
EBK MATHEMATICS FOR MACHINE TECHNOLOGY
Ch. 1 - Write the fractional part that each length, A...Ch. 1 - A welded support base is cut into four pieces as...Ch. 1 - The circle in Figure 1-5 is divided into equal...Ch. 1 - The circle in Figure 1-5 is divided into equal...Ch. 1 - Reduce to halves. a. 48 b. 918 c. 100200 d. 121242Ch. 1 - Reduce to halves. a. 2510 b. 1812 c. 12636 d....Ch. 1 - Reduce numbers to lowest terms in Exercises 7 and...Ch. 1 - Reduce numbers to lowest terms in Exercises 7 and...Ch. 1 - Express the fractions in Exercises 9 and 10 as...Ch. 1 - Express the fractions in Exercises 9 and 10 as...
Ch. 1 - In Exercises 11 and 12, express the given...Ch. 1 - In Exercises 11 and 12, express the given...Ch. 1 - Express the mixed numbers in Exercises 13 and 14...Ch. 1 - Express the mixed numbers in Exercises 13 and 14...Ch. 1 - Express the improper fractions in Exercises 15 and...Ch. 1 - Express the improper fractions in Exercises 15 and...Ch. 1 - Express the mixed numbers in Exercises 17 and 18...Ch. 1 - Express the mixed numbers in Exercises 17 and 18...Ch. 1 - Sketch and redimension the plate shown in Figure...
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