Natural numbers from the set { 4 , 7 , − 5 , 1 2 , 0. 31 ¯ , 0 , 0.2 , 12 } .

Question

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Answer 1

Question

Chapter P, Problem 1RE

a.

To determine

To find:

Natural numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

a.

Expert Solution

Answer to Problem 1RE

{4}.

Explanation of Solution

Given information:

Set of numbers is {4,7,−5,12,0.31¯,0,0.2,12}

Calculation:

Natural Numbers are the counting numbers that are used for counting and are greater than 0 i.e. 1,2,3,…

From the given set of numbers, it is seen that 4 is the only counting number.

Therefore natural numbers in the given set is {4}.

b.

To determine

To find:

Whole Numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

b.

Expert Solution

Answer to Problem 1RE

{0,4}.

Explanation of Solution

Given information:

Set of numbers is {4,7,−5,12,0.31¯,0,0.2,12}

Calculation:

Whole Numbers are natural numbers and 0 together i.e counting numbers that are used for counting and are greater than or equal to 0 i.e. 0,1,2,3,…

From the given set of numbers, it is seen that 0,4 are the counting numbers greater than or equal to 0.

Therefore whole numbers in the given set are {0,4}.

c.

To determine

To find:

Integers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

c.

Expert Solution

Answer to Problem 1RE

{−5,0,4}.

Explanation of Solution

Given information:

Set of numbers is {4,7,−5,12,0.31¯,0,0.2,12}

Calculation:

Integers are those numbers that can be written without a fractional component. They include 0, all natural numbers and the negatives of the natural numbers i.e. …-3,-2,-1,0,1,2,3,…

From the given set of numbers, it is seen that -5,0,4 come under the category of integers.

Therefore integers in the given set is {−5,0,4}.

d.

To determine

To find:

Rational Numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

d.

Expert Solution

Answer to Problem 1RE

{−5,0,0.2,0.31¯,12,4}.

Explanation of Solution

Given information:

Set of numbers is {4,7,−5,12,0.31¯,0,0.2,12}

Calculation:

Rational Numbers are those numbers that can be written as a fraction pq where q is not equal to 0. They include all the recurring decimals, fractions, 0, all natural numbers and the negatives of the natural numbers. In simpler terms, all the real numbers that are not irrational are rational numbers.

From the given set of numbers, it is seen that −5,0,0.2,0.31¯,12,4 come under the category of rational numbers.

Therefore rational numbers in the given set is {−5,0,0.2,0.31¯,12,4}.

e.

To determine

To find:

Irrational Numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

e.

Expert Solution

Answer to Problem 1RE

{7,12}.

Explanation of Solution

Given information:

Set of numbers is {4,7,−5,12,0.31¯,0,0.2,12}

Calculation:

Irrational Numbers are those numbers that cannot be written as rational numbers. They include all the non-recurring decimal numbers i.e. the decimal part of the number does not occur again in the same pattern. For example 2=1.414213.... This is a never ending decimal. All the numbers that do not have a root come under this category

From the given set of numbers, it is seen that 7,12 come under the category of irrational numbers.

Therefore irrational numbers in the given set is {7,12}.

f.

To determine

To find:

Real Numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

f.

Expert Solution

Answer to Problem 1RE

{4,7,−5,12,0.31¯,0,0.2,12}.

Explanation of Solution

Given information:

Set of numbers is {4,7,−5,12,0.31¯,0,0.2,12}

Calculation:

Real numbers is the set of all rational and irrational numbers together. All numbers that are not complex come under real numbers.

Since there are no complex numbers in the given set, all are real numbers

Therefore real numbers in the given set is {4,7,−5,12,0.31¯,0,0.2,12}.

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************* ********************************* Q.1) Classify the following statements as a true or false statements: a. If M is a module, then every proper submodule of M is contained in a maximal submodule of M. b. The sum of a finite family of small submodules of a module M is small in M. c. Zz is directly indecomposable. d. An epimorphism a: M→ N is called solit iff Ker(a) is a direct summand in M. e. The Z-module has two composition series. Z 6Z f. Zz does not have a composition series. g. Any finitely generated module is a free module. h. If O→A MW→ 0 is short exact sequence then f is epimorphism. i. If f is a homomorphism then f-1 is also a homomorphism. Maximal C≤A if and only if is simple. Sup Q.4) Give an example and explain your claim in each case: Monomorphism not split. b) A finite free module. c) Semisimple module. d) A small submodule A of a module N and a homomorphism op: MN, but (A) is not small in M.

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T. Determine the least common denominator and the domain for the 2x-3 10 problem: + x²+6x+8 x²+x-12 3 2x 2. Add: + Simplify and 5x+10 x²-2x-8 state the domain. 7 3. Add/Subtract: x+2 1 + x+6 2x+2 4 Simplify and state the domain. x+1 4 4. Subtract: - Simplify 3x-3 x²-3x+2 and state the domain. 1 15 3x-5 5. Add/Subtract: + 2 2x-14 x²-7x Simplify and state the domain.

Answer 2

Question

Chapter P, Problem 1RE

a.

To determine

To find:

Natural numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

a.

Expert Solution

Answer to Problem 1RE

{4}.

Explanation of Solution

Given information:

Set of numbers is {4,7,−5,12,0.31¯,0,0.2,12}

Calculation:

Natural Numbers are the counting numbers that are used for counting and are greater than 0 i.e. 1,2,3,…

From the given set of numbers, it is seen that 4 is the only counting number.

Therefore natural numbers in the given set is {4}.

b.

To determine

To find:

Whole Numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

b.

Expert Solution

Answer to Problem 1RE

{0,4}.

Explanation of Solution

Given information:

Set of numbers is {4,7,−5,12,0.31¯,0,0.2,12}

Calculation:

Whole Numbers are natural numbers and 0 together i.e counting numbers that are used for counting and are greater than or equal to 0 i.e. 0,1,2,3,…

From the given set of numbers, it is seen that 0,4 are the counting numbers greater than or equal to 0.

Therefore whole numbers in the given set are {0,4}.

c.

To determine

To find:

Integers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

c.

Expert Solution

Answer to Problem 1RE

{−5,0,4}.

Explanation of Solution

Given information:

Set of numbers is {4,7,−5,12,0.31¯,0,0.2,12}

Calculation:

Integers are those numbers that can be written without a fractional component. They include 0, all natural numbers and the negatives of the natural numbers i.e. …-3,-2,-1,0,1,2,3,…

From the given set of numbers, it is seen that -5,0,4 come under the category of integers.

Therefore integers in the given set is {−5,0,4}.

d.

To determine

To find:

Rational Numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

d.

Expert Solution

Answer to Problem 1RE

{−5,0,0.2,0.31¯,12,4}.

Explanation of Solution

Given information:

Set of numbers is {4,7,−5,12,0.31¯,0,0.2,12}

Calculation:

Rational Numbers are those numbers that can be written as a fraction pq where q is not equal to 0. They include all the recurring decimals, fractions, 0, all natural numbers and the negatives of the natural numbers. In simpler terms, all the real numbers that are not irrational are rational numbers.

From the given set of numbers, it is seen that −5,0,0.2,0.31¯,12,4 come under the category of rational numbers.

Therefore rational numbers in the given set is {−5,0,0.2,0.31¯,12,4}.

e.

To determine

To find:

Irrational Numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

e.

Expert Solution

Answer to Problem 1RE

{7,12}.

Explanation of Solution

Given information:

Set of numbers is {4,7,−5,12,0.31¯,0,0.2,12}

Calculation:

Irrational Numbers are those numbers that cannot be written as rational numbers. They include all the non-recurring decimal numbers i.e. the decimal part of the number does not occur again in the same pattern. For example 2=1.414213.... This is a never ending decimal. All the numbers that do not have a root come under this category

From the given set of numbers, it is seen that 7,12 come under the category of irrational numbers.

Therefore irrational numbers in the given set is {7,12}.

f.

To determine

To find:

Real Numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

f.

Expert Solution

Answer to Problem 1RE

{4,7,−5,12,0.31¯,0,0.2,12}.

Explanation of Solution

Given information:

Set of numbers is {4,7,−5,12,0.31¯,0,0.2,12}

Calculation:

Real numbers is the set of all rational and irrational numbers together. All numbers that are not complex come under real numbers.

Since there are no complex numbers in the given set, all are real numbers

Therefore real numbers in the given set is {4,7,−5,12,0.31¯,0,0.2,12}.

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Answer 3

Question

Chapter P, Problem 1RE

a.

To determine

To find:

Natural numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

a.

Expert Solution

Answer to Problem 1RE

{4}.

Explanation of Solution

Given information:

Set of numbers is {4,7,−5,12,0.31¯,0,0.2,12}

Calculation:

Natural Numbers are the counting numbers that are used for counting and are greater than 0 i.e. 1,2,3,…

From the given set of numbers, it is seen that 4 is the only counting number.

Therefore natural numbers in the given set is {4}.

b.

To determine

To find:

Whole Numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

b.

Expert Solution

Answer to Problem 1RE

{0,4}.

Explanation of Solution

Given information:

Set of numbers is {4,7,−5,12,0.31¯,0,0.2,12}

Calculation:

Whole Numbers are natural numbers and 0 together i.e counting numbers that are used for counting and are greater than or equal to 0 i.e. 0,1,2,3,…

From the given set of numbers, it is seen that 0,4 are the counting numbers greater than or equal to 0.

Therefore whole numbers in the given set are {0,4}.

c.

To determine

To find:

Integers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

c.

Expert Solution

Answer to Problem 1RE

{−5,0,4}.

Explanation of Solution

Given information:

Set of numbers is {4,7,−5,12,0.31¯,0,0.2,12}

Calculation:

Integers are those numbers that can be written without a fractional component. They include 0, all natural numbers and the negatives of the natural numbers i.e. …-3,-2,-1,0,1,2,3,…

From the given set of numbers, it is seen that -5,0,4 come under the category of integers.

Therefore integers in the given set is {−5,0,4}.

d.

To determine

To find:

Rational Numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

d.

Expert Solution

Answer to Problem 1RE

{−5,0,0.2,0.31¯,12,4}.

Explanation of Solution

Given information:

Set of numbers is {4,7,−5,12,0.31¯,0,0.2,12}

Calculation:

Rational Numbers are those numbers that can be written as a fraction pq where q is not equal to 0. They include all the recurring decimals, fractions, 0, all natural numbers and the negatives of the natural numbers. In simpler terms, all the real numbers that are not irrational are rational numbers.

From the given set of numbers, it is seen that −5,0,0.2,0.31¯,12,4 come under the category of rational numbers.

Therefore rational numbers in the given set is {−5,0,0.2,0.31¯,12,4}.

e.

To determine

To find:

Irrational Numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

e.

Expert Solution

Answer to Problem 1RE

{7,12}.

Explanation of Solution

Given information:

Set of numbers is {4,7,−5,12,0.31¯,0,0.2,12}

Calculation:

Irrational Numbers are those numbers that cannot be written as rational numbers. They include all the non-recurring decimal numbers i.e. the decimal part of the number does not occur again in the same pattern. For example 2=1.414213.... This is a never ending decimal. All the numbers that do not have a root come under this category

From the given set of numbers, it is seen that 7,12 come under the category of irrational numbers.

Therefore irrational numbers in the given set is {7,12}.

f.

To determine

To find:

Real Numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

f.

Expert Solution

Answer to Problem 1RE

{4,7,−5,12,0.31¯,0,0.2,12}.

Explanation of Solution

Given information:

Set of numbers is {4,7,−5,12,0.31¯,0,0.2,12}

Calculation:

Real numbers is the set of all rational and irrational numbers together. All numbers that are not complex come under real numbers.

Since there are no complex numbers in the given set, all are real numbers

Therefore real numbers in the given set is {4,7,−5,12,0.31¯,0,0.2,12}.

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Answer 4

Question

Chapter P, Problem 1RE

a.

To determine

To find:

Natural numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

a.

Expert Solution

Answer to Problem 1RE

{4}.

Explanation of Solution

Given information:

Set of numbers is {4,7,−5,12,0.31¯,0,0.2,12}

Calculation:

Natural Numbers are the counting numbers that are used for counting and are greater than 0 i.e. 1,2,3,…

From the given set of numbers, it is seen that 4 is the only counting number.

Therefore natural numbers in the given set is {4}.

b.

To determine

To find:

Whole Numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

b.

Expert Solution

Answer to Problem 1RE

{0,4}.

Explanation of Solution

Given information:

Set of numbers is {4,7,−5,12,0.31¯,0,0.2,12}

Calculation:

Whole Numbers are natural numbers and 0 together i.e counting numbers that are used for counting and are greater than or equal to 0 i.e. 0,1,2,3,…

From the given set of numbers, it is seen that 0,4 are the counting numbers greater than or equal to 0.

Therefore whole numbers in the given set are {0,4}.

c.

To determine

To find:

Integers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

c.

Expert Solution

Answer to Problem 1RE

{−5,0,4}.

Explanation of Solution

Given information:

Set of numbers is {4,7,−5,12,0.31¯,0,0.2,12}

Calculation:

Integers are those numbers that can be written without a fractional component. They include 0, all natural numbers and the negatives of the natural numbers i.e. …-3,-2,-1,0,1,2,3,…

From the given set of numbers, it is seen that -5,0,4 come under the category of integers.

Therefore integers in the given set is {−5,0,4}.

d.

To determine

To find:

Rational Numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

d.

Expert Solution

Answer to Problem 1RE

{−5,0,0.2,0.31¯,12,4}.

Explanation of Solution

Given information:

Set of numbers is {4,7,−5,12,0.31¯,0,0.2,12}

Calculation:

Rational Numbers are those numbers that can be written as a fraction pq where q is not equal to 0. They include all the recurring decimals, fractions, 0, all natural numbers and the negatives of the natural numbers. In simpler terms, all the real numbers that are not irrational are rational numbers.

From the given set of numbers, it is seen that −5,0,0.2,0.31¯,12,4 come under the category of rational numbers.

Therefore rational numbers in the given set is {−5,0,0.2,0.31¯,12,4}.

e.

To determine

To find:

Irrational Numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

e.

Expert Solution

Answer to Problem 1RE

{7,12}.

Explanation of Solution

Given information:

Set of numbers is {4,7,−5,12,0.31¯,0,0.2,12}

Calculation:

Irrational Numbers are those numbers that cannot be written as rational numbers. They include all the non-recurring decimal numbers i.e. the decimal part of the number does not occur again in the same pattern. For example 2=1.414213.... This is a never ending decimal. All the numbers that do not have a root come under this category

From the given set of numbers, it is seen that 7,12 come under the category of irrational numbers.

Therefore irrational numbers in the given set is {7,12}.

f.

To determine

To find:

Real Numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

f.

Expert Solution

Answer to Problem 1RE

{4,7,−5,12,0.31¯,0,0.2,12}.

Explanation of Solution

Given information:

Set of numbers is {4,7,−5,12,0.31¯,0,0.2,12}

Calculation:

Real numbers is the set of all rational and irrational numbers together. All numbers that are not complex come under real numbers.

Since there are no complex numbers in the given set, all are real numbers

Therefore real numbers in the given set is {4,7,−5,12,0.31¯,0,0.2,12}.

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Answer 5

Chapter P, Problem 1RE

a.

To determine

To find:

Natural numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

a.

Expert Solution

Answer to Problem 1RE

{4}.

Explanation of Solution

Given information:

Set of numbers is {4,7,−5,12,0.31¯,0,0.2,12}

Calculation:

Natural Numbers are the counting numbers that are used for counting and are greater than 0 i.e. 1,2,3,…

From the given set of numbers, it is seen that 4 is the only counting number.

Therefore natural numbers in the given set is {4}.

b.

To determine

To find:

Whole Numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

b.

Expert Solution

Answer to Problem 1RE

{0,4}.

Explanation of Solution

Given information:

Set of numbers is {4,7,−5,12,0.31¯,0,0.2,12}

Calculation:

Whole Numbers are natural numbers and 0 together i.e counting numbers that are used for counting and are greater than or equal to 0 i.e. 0,1,2,3,…

From the given set of numbers, it is seen that 0,4 are the counting numbers greater than or equal to 0.

Therefore whole numbers in the given set are {0,4}.

c.

To determine

To find:

Integers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

c.

Expert Solution

Answer to Problem 1RE

{−5,0,4}.

Explanation of Solution

Given information:

Set of numbers is {4,7,−5,12,0.31¯,0,0.2,12}

Calculation:

Integers are those numbers that can be written without a fractional component. They include 0, all natural numbers and the negatives of the natural numbers i.e. …-3,-2,-1,0,1,2,3,…

From the given set of numbers, it is seen that -5,0,4 come under the category of integers.

Therefore integers in the given set is {−5,0,4}.

d.

To determine

To find:

Rational Numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

d.

Expert Solution

Answer to Problem 1RE

{−5,0,0.2,0.31¯,12,4}.

Explanation of Solution

Given information:

Set of numbers is {4,7,−5,12,0.31¯,0,0.2,12}

Calculation:

Rational Numbers are those numbers that can be written as a fraction pq where q is not equal to 0. They include all the recurring decimals, fractions, 0, all natural numbers and the negatives of the natural numbers. In simpler terms, all the real numbers that are not irrational are rational numbers.

From the given set of numbers, it is seen that −5,0,0.2,0.31¯,12,4 come under the category of rational numbers.

Therefore rational numbers in the given set is {−5,0,0.2,0.31¯,12,4}.

e.

To determine

To find:

Irrational Numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

e.

Expert Solution

Answer to Problem 1RE

{7,12}.

Explanation of Solution

Given information:

Set of numbers is {4,7,−5,12,0.31¯,0,0.2,12}

Calculation:

Irrational Numbers are those numbers that cannot be written as rational numbers. They include all the non-recurring decimal numbers i.e. the decimal part of the number does not occur again in the same pattern. For example 2=1.414213.... This is a never ending decimal. All the numbers that do not have a root come under this category

From the given set of numbers, it is seen that 7,12 come under the category of irrational numbers.

Therefore irrational numbers in the given set is {7,12}.

f.

To determine

To find:

Real Numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

f.

Expert Solution

Answer to Problem 1RE

{4,7,−5,12,0.31¯,0,0.2,12}.

Explanation of Solution

Given information:

Set of numbers is {4,7,−5,12,0.31¯,0,0.2,12}

Calculation:

Real numbers is the set of all rational and irrational numbers together. All numbers that are not complex come under real numbers.

Since there are no complex numbers in the given set, all are real numbers

Therefore real numbers in the given set is {4,7,−5,12,0.31¯,0,0.2,12}.

Answer 6

Chapter P, Problem 1RE

a.

To determine

To find:

Natural numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

a.

Expert Solution

Answer to Problem 1RE

{4}.

Explanation of Solution

Given information:

Set of numbers is {4,7,−5,12,0.31¯,0,0.2,12}

Calculation:

Natural Numbers are the counting numbers that are used for counting and are greater than 0 i.e. 1,2,3,…

From the given set of numbers, it is seen that 4 is the only counting number.

Therefore natural numbers in the given set is {4}.

Answer 7

Chapter P, Problem 1RE

a.

To determine

To find:

Natural numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

Answer 8

a.

Expert Solution

Answer to Problem 1RE

{4}.

Answer 9

a.

Expert Solution

Answer 10

a.

Expert Solution

Answer 11

Expert Solution

Answer 12

Explanation of Solution

Given information:

Set of numbers is {4,7,−5,12,0.31¯,0,0.2,12}

Calculation:

Natural Numbers are the counting numbers that are used for counting and are greater than 0 i.e. 1,2,3,…

From the given set of numbers, it is seen that 4 is the only counting number.

Therefore natural numbers in the given set is {4}.

Answer 13

b.

To determine

To find:

Whole Numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

b.

Expert Solution

Answer to Problem 1RE

{0,4}.

Explanation of Solution

Given information:

Set of numbers is {4,7,−5,12,0.31¯,0,0.2,12}

Calculation:

Whole Numbers are natural numbers and 0 together i.e counting numbers that are used for counting and are greater than or equal to 0 i.e. 0,1,2,3,…

From the given set of numbers, it is seen that 0,4 are the counting numbers greater than or equal to 0.

Therefore whole numbers in the given set are {0,4}.

Answer 14

b.

To determine

To find:

Whole Numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

Answer 15

b.

Expert Solution

Answer to Problem 1RE

{0,4}.

Answer 16

b.

Expert Solution

Answer 17

b.

Expert Solution

Answer 18

Expert Solution

Answer 19

Explanation of Solution

Given information:

Set of numbers is {4,7,−5,12,0.31¯,0,0.2,12}

Calculation:

Whole Numbers are natural numbers and 0 together i.e counting numbers that are used for counting and are greater than or equal to 0 i.e. 0,1,2,3,…

From the given set of numbers, it is seen that 0,4 are the counting numbers greater than or equal to 0.

Therefore whole numbers in the given set are {0,4}.

Answer 20

c.

To determine

To find:

Integers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

c.

Expert Solution

Answer to Problem 1RE

{−5,0,4}.

Explanation of Solution

Given information:

Set of numbers is {4,7,−5,12,0.31¯,0,0.2,12}

Calculation:

Integers are those numbers that can be written without a fractional component. They include 0, all natural numbers and the negatives of the natural numbers i.e. …-3,-2,-1,0,1,2,3,…

From the given set of numbers, it is seen that -5,0,4 come under the category of integers.

Therefore integers in the given set is {−5,0,4}.

Answer 21

c.

To determine

To find:

Integers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

Answer 22

c.

Expert Solution

Answer to Problem 1RE

{−5,0,4}.

Answer 23

c.

Expert Solution

Answer 24

c.

Expert Solution

Answer 25

Expert Solution

Answer 26

Explanation of Solution

Given information:

Set of numbers is {4,7,−5,12,0.31¯,0,0.2,12}

Calculation:

Integers are those numbers that can be written without a fractional component. They include 0, all natural numbers and the negatives of the natural numbers i.e. …-3,-2,-1,0,1,2,3,…

From the given set of numbers, it is seen that -5,0,4 come under the category of integers.

Therefore integers in the given set is {−5,0,4}.

Answer 27

d.

To determine

To find:

Rational Numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

d.

Expert Solution

Answer to Problem 1RE

{−5,0,0.2,0.31¯,12,4}.

Explanation of Solution

Given information:

Set of numbers is {4,7,−5,12,0.31¯,0,0.2,12}

Calculation:

Rational Numbers are those numbers that can be written as a fraction pq where q is not equal to 0. They include all the recurring decimals, fractions, 0, all natural numbers and the negatives of the natural numbers. In simpler terms, all the real numbers that are not irrational are rational numbers.

From the given set of numbers, it is seen that −5,0,0.2,0.31¯,12,4 come under the category of rational numbers.

Therefore rational numbers in the given set is {−5,0,0.2,0.31¯,12,4}.

Answer 28

d.

To determine

To find:

Rational Numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

Answer 29

d.

Expert Solution

Answer to Problem 1RE

{−5,0,0.2,0.31¯,12,4}.

Answer 30

d.

Expert Solution

Answer 31

d.

Expert Solution

Answer 32

Expert Solution

Answer 33

Explanation of Solution

Given information:

Set of numbers is {4,7,−5,12,0.31¯,0,0.2,12}

Calculation:

Rational Numbers are those numbers that can be written as a fraction pq where q is not equal to 0. They include all the recurring decimals, fractions, 0, all natural numbers and the negatives of the natural numbers. In simpler terms, all the real numbers that are not irrational are rational numbers.

From the given set of numbers, it is seen that −5,0,0.2,0.31¯,12,4 come under the category of rational numbers.

Therefore rational numbers in the given set is {−5,0,0.2,0.31¯,12,4}.

Answer 34

e.

To determine

To find:

Irrational Numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

e.

Expert Solution

Answer to Problem 1RE

{7,12}.

Explanation of Solution

Given information:

Set of numbers is {4,7,−5,12,0.31¯,0,0.2,12}

Calculation:

Irrational Numbers are those numbers that cannot be written as rational numbers. They include all the non-recurring decimal numbers i.e. the decimal part of the number does not occur again in the same pattern. For example 2=1.414213.... This is a never ending decimal. All the numbers that do not have a root come under this category

From the given set of numbers, it is seen that 7,12 come under the category of irrational numbers.

Therefore irrational numbers in the given set is {7,12}.

Answer 35

e.

To determine

To find:

Irrational Numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

Answer 36

e.

Expert Solution

Answer to Problem 1RE

{7,12}.

Answer 37

e.

Expert Solution

Answer 38

e.

Expert Solution

Answer 39

Expert Solution

Answer 40

Explanation of Solution

Given information:

Set of numbers is {4,7,−5,12,0.31¯,0,0.2,12}

Calculation:

Irrational Numbers are those numbers that cannot be written as rational numbers. They include all the non-recurring decimal numbers i.e. the decimal part of the number does not occur again in the same pattern. For example 2=1.414213.... This is a never ending decimal. All the numbers that do not have a root come under this category

From the given set of numbers, it is seen that 7,12 come under the category of irrational numbers.

Therefore irrational numbers in the given set is {7,12}.

Answer 41

f.

To determine

To find:

Real Numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

f.

Expert Solution

Answer to Problem 1RE

{4,7,−5,12,0.31¯,0,0.2,12}.

Explanation of Solution

Given information:

Set of numbers is {4,7,−5,12,0.31¯,0,0.2,12}

Calculation:

Real numbers is the set of all rational and irrational numbers together. All numbers that are not complex come under real numbers.

Since there are no complex numbers in the given set, all are real numbers

Therefore real numbers in the given set is {4,7,−5,12,0.31¯,0,0.2,12}.

Answer 42

f.

To determine

To find:

Real Numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

Answer 43

f.

Expert Solution

Answer to Problem 1RE

{4,7,−5,12,0.31¯,0,0.2,12}.

Answer 44

f.

Expert Solution

Answer 45

f.

Expert Solution

Answer 46

Expert Solution

Answer 47

Explanation of Solution

Given information:

Set of numbers is {4,7,−5,12,0.31¯,0,0.2,12}

Calculation:

Real numbers is the set of all rational and irrational numbers together. All numbers that are not complex come under real numbers.

Since there are no complex numbers in the given set, all are real numbers

Therefore real numbers in the given set is {4,7,−5,12,0.31¯,0,0.2,12}.

Answer 48

Ch. P.1 - Whole numbers are formed by adding the number...Ch. P.1 - The number 3 is an integer, but it is also a(n)...Ch. P.1 - If a < b, then a is to the __________ of b on the...Ch. P.1 - If a real number is not a rational number, it is...Ch. P.1 - True or False. If —x is positive, then —x > 0.Ch. P.1 - True or False. 52212.Ch. P.1 - Prob. 7E Ch. P.1 - In Exercises 916, write each of the following...Ch. P.1 - In Exercises 916, write each of the following...Ch. P.1 - Prob. 10E

Natural numbers from the set { 4 , 7 , − 5 , 1 2 , 0. 31 ¯ , 0 , 0.2 , 12 } .

Videos

To find:

Natural numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

Answer to Problem 1RE

Explanation of Solution

To find:

Whole Numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

Answer to Problem 1RE

Explanation of Solution

To find:

Integers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

Answer to Problem 1RE

Explanation of Solution

To find:

Rational Numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

Answer to Problem 1RE

Explanation of Solution

To find:

Irrational Numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

Answer to Problem 1RE

Explanation of Solution

To find:

Real Numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

Answer to Problem 1RE

Explanation of Solution

Want to see more full solutions like this?

Chapter P Solutions

Natural numbers from the set { 4 , 7 , − 5 , 1 2 , 0. 31 ¯ , 0 , 0.2 , 12 } .

Videos

To find: Natural numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

Answer to Problem 1RE

Explanation of Solution

To find: Whole Numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

Answer to Problem 1RE

Explanation of Solution

To find: Integers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

Answer to Problem 1RE

Explanation of Solution

To find: Rational Numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

Answer to Problem 1RE

Explanation of Solution

To find: Irrational Numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

Answer to Problem 1RE

Explanation of Solution

To find: Real Numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

Answer to Problem 1RE

Explanation of Solution

Want to see more full solutions like this?

Chapter P Solutions

To find:

Natural numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

To find:

Whole Numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

To find:

Integers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

To find:

Rational Numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

To find:

Irrational Numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .

To find:

Real Numbers from the set {4,7,−5,12,0.31¯,0,0.2,12} .