The set to which the given numbers belong and complete the table.

Question

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Answer 1

Question

Chapter 5, Problem 1CRE

To determine

The set to which the given numbers belong and complete the table.

Expert Solution & Answer

Answer to Problem 1CRE

Solution:

The table can be completed as shown below.

Set\Number−22π6−2Real NumberYesYesYesYesIrrational NumberYesYesRational numberYesYesIntegersYesYesWhole numbersYesNatural numberYes

Given:

The given table is shown below.

Set\Number−22π6−2Real NumberIrrational NumberRational numberIntegersWhole numbersNatural number

Concept used:

A value that represents a quantity along a line called a real number. Real numbers include all the rational numbers and irrational numbers.

A rational number is any number that can be expressed as the quotient or fraction p/q of two integers, a numerator p and a non-zero denominator q.

A number that cannot be expressed as a fraction for any integers and have decimal expansions that neither terminate nor become periodic called irrational number.

A number that can be written without a fractional component is called integer number.

Whole numbers are positive numbers including zero, without any decimal or fractional parts.

A natural number is a number that occurs commonly and obviously in nature. As such, it is a whole, non-negative number.

Explanation of Solution

Calculation:

The number −22 represents a quantity along a line so it is a real number, rational number and integer number.

The number π represents a quantity along a line so it is a real number and have decimal expansions, so it is also irrational number.

The number 6 represents a quantity along a line, without a fractional component, positive number, so it is a real number, rational number, integer number, whole number and natural number.

The number −2represents a quantity along a line so it is a real number and have decimal expansions, so it is also irrational number.

Conclusion:

The sets for the numbers to which they belong can be represented by completing the given table as shown below.

Set\Number−22π6−2Real NumberYesYesYesYesIrrational NumberYesYesRational numberYesYesIntegersYesYesWhole numbersYesNatural numberYes

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In simplest terms, Sketch the graph of the parabola. Then, determine its equation. opens downward, vertex is (- 4, 7), passes through point (0, - 39)

Answer 2

Question

Chapter 5, Problem 1CRE

To determine

The set to which the given numbers belong and complete the table.

Expert Solution & Answer

Answer to Problem 1CRE

Solution:

The table can be completed as shown below.

Set\Number−22π6−2Real NumberYesYesYesYesIrrational NumberYesYesRational numberYesYesIntegersYesYesWhole numbersYesNatural numberYes

Given:

The given table is shown below.

Set\Number−22π6−2Real NumberIrrational NumberRational numberIntegersWhole numbersNatural number

Concept used:

A value that represents a quantity along a line called a real number. Real numbers include all the rational numbers and irrational numbers.

A rational number is any number that can be expressed as the quotient or fraction p/q of two integers, a numerator p and a non-zero denominator q.

A number that cannot be expressed as a fraction for any integers and have decimal expansions that neither terminate nor become periodic called irrational number.

A number that can be written without a fractional component is called integer number.

Whole numbers are positive numbers including zero, without any decimal or fractional parts.

A natural number is a number that occurs commonly and obviously in nature. As such, it is a whole, non-negative number.

Explanation of Solution

Calculation:

The number −22 represents a quantity along a line so it is a real number, rational number and integer number.

The number π represents a quantity along a line so it is a real number and have decimal expansions, so it is also irrational number.

The number 6 represents a quantity along a line, without a fractional component, positive number, so it is a real number, rational number, integer number, whole number and natural number.

The number −2represents a quantity along a line so it is a real number and have decimal expansions, so it is also irrational number.

Conclusion:

The sets for the numbers to which they belong can be represented by completing the given table as shown below.

Set\Number−22π6−2Real NumberYesYesYesYesIrrational NumberYesYesRational numberYesYesIntegersYesYesWhole numbersYesNatural numberYes

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Answer 3

Question

Chapter 5, Problem 1CRE

To determine

The set to which the given numbers belong and complete the table.

Expert Solution & Answer

Answer to Problem 1CRE

Solution:

The table can be completed as shown below.

Set\Number−22π6−2Real NumberYesYesYesYesIrrational NumberYesYesRational numberYesYesIntegersYesYesWhole numbersYesNatural numberYes

Given:

The given table is shown below.

Set\Number−22π6−2Real NumberIrrational NumberRational numberIntegersWhole numbersNatural number

Concept used:

A value that represents a quantity along a line called a real number. Real numbers include all the rational numbers and irrational numbers.

A rational number is any number that can be expressed as the quotient or fraction p/q of two integers, a numerator p and a non-zero denominator q.

A number that cannot be expressed as a fraction for any integers and have decimal expansions that neither terminate nor become periodic called irrational number.

A number that can be written without a fractional component is called integer number.

Whole numbers are positive numbers including zero, without any decimal or fractional parts.

A natural number is a number that occurs commonly and obviously in nature. As such, it is a whole, non-negative number.

Explanation of Solution

Calculation:

The number −22 represents a quantity along a line so it is a real number, rational number and integer number.

The number π represents a quantity along a line so it is a real number and have decimal expansions, so it is also irrational number.

The number 6 represents a quantity along a line, without a fractional component, positive number, so it is a real number, rational number, integer number, whole number and natural number.

The number −2represents a quantity along a line so it is a real number and have decimal expansions, so it is also irrational number.

Conclusion:

The sets for the numbers to which they belong can be represented by completing the given table as shown below.

Set\Number−22π6−2Real NumberYesYesYesYesIrrational NumberYesYesRational numberYesYesIntegersYesYesWhole numbersYesNatural numberYes

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Answer 4

Question

Chapter 5, Problem 1CRE

To determine

The set to which the given numbers belong and complete the table.

Expert Solution & Answer

Answer to Problem 1CRE

Solution:

The table can be completed as shown below.

Set\Number−22π6−2Real NumberYesYesYesYesIrrational NumberYesYesRational numberYesYesIntegersYesYesWhole numbersYesNatural numberYes

Given:

The given table is shown below.

Set\Number−22π6−2Real NumberIrrational NumberRational numberIntegersWhole numbersNatural number

Concept used:

A value that represents a quantity along a line called a real number. Real numbers include all the rational numbers and irrational numbers.

A rational number is any number that can be expressed as the quotient or fraction p/q of two integers, a numerator p and a non-zero denominator q.

A number that cannot be expressed as a fraction for any integers and have decimal expansions that neither terminate nor become periodic called irrational number.

A number that can be written without a fractional component is called integer number.

Whole numbers are positive numbers including zero, without any decimal or fractional parts.

A natural number is a number that occurs commonly and obviously in nature. As such, it is a whole, non-negative number.

Explanation of Solution

Calculation:

The number −22 represents a quantity along a line so it is a real number, rational number and integer number.

The number π represents a quantity along a line so it is a real number and have decimal expansions, so it is also irrational number.

The number 6 represents a quantity along a line, without a fractional component, positive number, so it is a real number, rational number, integer number, whole number and natural number.

The number −2represents a quantity along a line so it is a real number and have decimal expansions, so it is also irrational number.

Conclusion:

The sets for the numbers to which they belong can be represented by completing the given table as shown below.

Set\Number−22π6−2Real NumberYesYesYesYesIrrational NumberYesYesRational numberYesYesIntegersYesYesWhole numbersYesNatural numberYes

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Answer 5

Chapter 5, Problem 1CRE

To determine

The set to which the given numbers belong and complete the table.

Expert Solution & Answer

Answer to Problem 1CRE

Solution:

The table can be completed as shown below.

Set\Number−22π6−2Real NumberYesYesYesYesIrrational NumberYesYesRational numberYesYesIntegersYesYesWhole numbersYesNatural numberYes

Given:

The given table is shown below.

Set\Number−22π6−2Real NumberIrrational NumberRational numberIntegersWhole numbersNatural number

Concept used:

A value that represents a quantity along a line called a real number. Real numbers include all the rational numbers and irrational numbers.

A rational number is any number that can be expressed as the quotient or fraction p/q of two integers, a numerator p and a non-zero denominator q.

A number that cannot be expressed as a fraction for any integers and have decimal expansions that neither terminate nor become periodic called irrational number.

A number that can be written without a fractional component is called integer number.

Whole numbers are positive numbers including zero, without any decimal or fractional parts.

A natural number is a number that occurs commonly and obviously in nature. As such, it is a whole, non-negative number.

Explanation of Solution

Calculation:

The number −22 represents a quantity along a line so it is a real number, rational number and integer number.

The number π represents a quantity along a line so it is a real number and have decimal expansions, so it is also irrational number.

The number 6 represents a quantity along a line, without a fractional component, positive number, so it is a real number, rational number, integer number, whole number and natural number.

The number −2represents a quantity along a line so it is a real number and have decimal expansions, so it is also irrational number.

Conclusion:

The sets for the numbers to which they belong can be represented by completing the given table as shown below.

Set\Number−22π6−2Real NumberYesYesYesYesIrrational NumberYesYesRational numberYesYesIntegersYesYesWhole numbersYesNatural numberYes

Answer 6

Chapter 5, Problem 1CRE

To determine

The set to which the given numbers belong and complete the table.

Expert Solution & Answer

Answer to Problem 1CRE

Solution:

The table can be completed as shown below.

Set\Number−22π6−2Real NumberYesYesYesYesIrrational NumberYesYesRational numberYesYesIntegersYesYesWhole numbersYesNatural numberYes

Given:

The given table is shown below.

Set\Number−22π6−2Real NumberIrrational NumberRational numberIntegersWhole numbersNatural number

Concept used:

A value that represents a quantity along a line called a real number. Real numbers include all the rational numbers and irrational numbers.

A rational number is any number that can be expressed as the quotient or fraction p/q of two integers, a numerator p and a non-zero denominator q.

A number that cannot be expressed as a fraction for any integers and have decimal expansions that neither terminate nor become periodic called irrational number.

A number that can be written without a fractional component is called integer number.

Whole numbers are positive numbers including zero, without any decimal or fractional parts.

A natural number is a number that occurs commonly and obviously in nature. As such, it is a whole, non-negative number.

Explanation of Solution

Calculation:

The number −22 represents a quantity along a line so it is a real number, rational number and integer number.

The number π represents a quantity along a line so it is a real number and have decimal expansions, so it is also irrational number.

The number 6 represents a quantity along a line, without a fractional component, positive number, so it is a real number, rational number, integer number, whole number and natural number.

The number −2represents a quantity along a line so it is a real number and have decimal expansions, so it is also irrational number.

Conclusion:

The sets for the numbers to which they belong can be represented by completing the given table as shown below.

Set\Number−22π6−2Real NumberYesYesYesYesIrrational NumberYesYesRational numberYesYesIntegersYesYesWhole numbersYesNatural numberYes

Answer 7

Chapter 5, Problem 1CRE

To determine

The set to which the given numbers belong and complete the table.

Answer 8

Expert Solution & Answer

Answer to Problem 1CRE

Solution:

The table can be completed as shown below.

Set\Number−22π6−2Real NumberYesYesYesYesIrrational NumberYesYesRational numberYesYesIntegersYesYesWhole numbersYesNatural numberYes

Given:

The given table is shown below.

Set\Number−22π6−2Real NumberIrrational NumberRational numberIntegersWhole numbersNatural number

Concept used:

A value that represents a quantity along a line called a real number. Real numbers include all the rational numbers and irrational numbers.

A rational number is any number that can be expressed as the quotient or fraction p/q of two integers, a numerator p and a non-zero denominator q.

A number that cannot be expressed as a fraction for any integers and have decimal expansions that neither terminate nor become periodic called irrational number.

A number that can be written without a fractional component is called integer number.

Whole numbers are positive numbers including zero, without any decimal or fractional parts.

A natural number is a number that occurs commonly and obviously in nature. As such, it is a whole, non-negative number.

Answer 9

Expert Solution & Answer

Answer 10

Expert Solution & Answer

Answer 11

Explanation of Solution

Calculation:

The number −22 represents a quantity along a line so it is a real number, rational number and integer number.

The number π represents a quantity along a line so it is a real number and have decimal expansions, so it is also irrational number.

The number 6 represents a quantity along a line, without a fractional component, positive number, so it is a real number, rational number, integer number, whole number and natural number.

The number −2represents a quantity along a line so it is a real number and have decimal expansions, so it is also irrational number.

Conclusion:

The sets for the numbers to which they belong can be represented by completing the given table as shown below.

Set\Number−22π6−2Real NumberYesYesYesYesIrrational NumberYesYesRational numberYesYesIntegersYesYesWhole numbersYesNatural numberYes