What conclusion is drawn from the contradiction in the proof?

A rational times an irrational is irrational

A rational number is always irrational

A rational times an irrational is rational

An irrational number can be a fraction

Why is the initial assumption considered false?

Because it leads to a logical contradiction

Because it is not supported by evidence

Because it is not a valid mathematical statement

Because it is mathematically incorrect

What is the final statement of the proof?

An irrational number can be expressed as a ratio

Understanding Rational And Irrational Numbers

Understanding Rational and Irrational Numbers

Interactive Video

•

Mathematics

•

9th - 12th Grade

•

Practice Problem

•

Hard

•

CCSS

HSN.RN.B.3, HSN.CN.A.1, 8.NS.A.1

Standards-aligned

Jackson Turner

FREE Resource

Standards-aligned

CCSS.HSN.RN.B.3

CCSS.HSN.CN.A.1

CCSS.8.NS.A.1

The video tutorial demonstrates a proof by contradiction to show that multiplying a rational number by an irrational number results in an irrational number. The proof assumes the opposite, that the product is rational, and manipulates the equation to show that this assumption leads to a contradiction, proving the original statement true.

10 questions

Show all answers

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

What is the main objective of the video tutorial?

To prove that a rational number times an irrational number is rational

To prove that a rational number times an irrational number is irrational

To show that irrational numbers can be expressed as fractions

To demonstrate how to multiply two rational numbers

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

What method is suggested for proving the main objective?

Proof by construction

Proof by exhaustion

Proof by contradiction

Proof by induction

Tags

CCSS.HSN.RN.B.3

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

What assumption is made to start the proof by contradiction?

A rational number times an irrational number is rational

A rational number times an irrational number is irrational

A rational number is always greater than an irrational number

An irrational number can be expressed as a fraction

Tags

CCSS.HSN.CN.A.1

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

How is the rational number represented in the proof?

As a complex number

As a decimal

As a ratio of two integers

As a single integer

Tags

CCSS.HSN.RN.B.3

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

What is the result of multiplying both sides by the reciprocal in the proof?

The rational number becomes irrational

The irrational number is expressed as a ratio of two integers

The equation becomes unsolvable

The irrational number becomes a whole number

Tags

CCSS.8.NS.A.1

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

What does expressing the irrational number as a ratio of integers imply?

The irrational number is actually rational

The irrational number is undefined

The rational number is incorrect

The proof is invalid

Tags

CCSS.HSN.RN.B.3

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

What is the contradiction found in the proof?

The rational number is less than zero

The rational number is not a fraction

The irrational number is shown to be rational

The irrational number is greater than the rational number

Tags

CCSS.HSN.RN.B.3

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