Rationalizing the Denominator 4
Try VividMath Premium to unlock full access
Time limit: 0
Quiz summary
0 of 6 questions completed
Questions:
- 1
- 2
- 3
- 4
- 5
- 6
Information
–
You have already completed the quiz before. Hence you can not start it again.
Quiz is loading...
You must sign in or sign up to start the quiz.
You have to finish following quiz, to start this quiz:
Loading...
- 1
- 2
- 3
- 4
- 5
- 6
- Answered
- Review
-
Question 1 of 6
1. Question
Rationalise the denominator:
√6+√32√6
- 1.
- 2.
- 3.
- 4.
Correct
Excellent!
Incorrect
Need Text
PlayCurrent Time 0:00/Duration Time 0:00Remaining Time -0:00Stream TypeLIVELoaded: 0%Progress: 0%0:00Fullscreen00:00MutePlayback Rate1x- 2x
- 1.5x
- 1.25x
- 1x
- 0.75x
- 0.5x
Subtitles- subtitles off
Captions- captions off
- English
Chapters- Chapters
Division Property of Square Roots
√ab=√a√bFor the answer to be in simplest form, the denominator should be a rational number.Multiply the numerator and the denominator by √6√6+√32√6 = √6+√32√6×√6√6 = (√6+√3)×√62×(√6×√6) = √6× √6+√3×√62×(√6×√6) Apply Distributive Property of Multiplication = √36+√182×√36 Apply the Multiplication Property = 6+3√212 √36=6 and √18=3√2 = 2+√24 Simplify 2+√24 -
Question 2 of 6
2. Question
Rationalise the denominator:
√10–√55√10
- 1.
- 2.
- 3.
- 4.
Correct
Excellent!
Incorrect
Need TextPlayCurrent Time 0:00/Duration Time 0:00Remaining Time -0:00Stream TypeLIVELoaded: 0%Progress: 0%0:00Fullscreen00:00MutePlayback Rate1x- 2x
- 1.5x
- 1.25x
- 1x
- 0.75x
- 0.5x
Subtitles- subtitles off
Captions- captions off
- English
Chapters- Chapters
Division Property of Square Roots
√ab=√a√bFor the answer to be in simplest form, the denominator should be a rational number.Multiply the numerator and the denominator by √10√10–√55√10 = √10–√55√10×√10√10 = (√10–√5)×√105×(√10×√10) = √10× √10-√5×√105×(√10×√10) Apply Distributive Property of Multiplication = √100–√505×√100 Apply the Multiplication Property = 10–5√250 √100=10 and √50=5√2 = 2-√210 Simplify 2-√210 -
Question 3 of 6
3. Question
Rationalise the denominator:23-√2- 1.
- 2.
- 3.
- 4.
Hint
Help VideoCorrect
Great Work!
Incorrect
Need TextPlayCurrent Time 0:00/Duration Time 0:00Remaining Time -0:00Stream TypeLIVELoaded: 0%Progress: 0%0:00Fullscreen00:00MutePlayback Rate1x- 2x
- 1.5x
- 1.25x
- 1x
- 0.75x
- 0.5x
Subtitles- subtitles off
Captions- captions off
- English
Chapters- Chapters
For the answer to be in simplest form, the denominator should be a rational number.Since the denominator is a binomial, multiply the numerator and the denominator by 3+√2This is simply the denominator but with the opposite operation23-√2 = 23-√2×3+√23+√2 = 2×(3+√2)(3-√2)×(3+√2) = 6+2√29-2 Apply Multiplication Property = 6+2√29-2 Apply Multiplication Property = 6+2√27 6+2√27 -
Question 4 of 6
4. Question
Rationalise the denominator:2√3-1- 1.
- 2.
- 3.
- 4.
Hint
Help VideoCorrect
Great Work!
Incorrect
Need TextPlayCurrent Time 0:00/Duration Time 0:00Remaining Time -0:00Stream TypeLIVELoaded: 0%Progress: 0%0:00Fullscreen00:00MutePlayback Rate1x- 2x
- 1.5x
- 1.25x
- 1x
- 0.75x
- 0.5x
Subtitles- subtitles off
Captions- captions off
- English
Chapters- Chapters
For the answer to be in simplest form, the denominator should be a rational number.Multiply the numerator and the denominator by √3+12√3-1 = 2√3-1×√3+1√3+1 = 2×(√3+1)(√3-1)×(√3+1) = 2√3+2√9+√3-√3-1 Expand the brackets = 2√3+23-1 √9=3 = 2√3+22 = √3+1 √3+1 -
Question 5 of 6
5. Question
Rationalise the denominator:√6+1√6+√2- 1.
- 2.
- 3.
- 4.
Hint
Help VideoCorrect
Excellent!
Incorrect
Need TextPlayCurrent Time 0:00/Duration Time 0:00Remaining Time -0:00Stream TypeLIVELoaded: 0%Progress: 0%0:00Fullscreen00:00MutePlayback Rate1x- 2x
- 1.5x
- 1.25x
- 1x
- 0.75x
- 0.5x
Subtitles- subtitles off
Captions- captions off
- English
Chapters- Chapters
For the answer to be in simplest form, the denominator should be a rational number.Multiply the numerator and the denominator by √6-√2√6+1√6+√2 = √6+1√6+√2×√6-√2√6-√2 = (√6+1)(√6-√2)(√6+√2)(√6-√2) = 6-√12+√6-√26-2 Expand the brackets = 6-2√3+√6-√24 6-2√3+√6-√24 -
Question 6 of 6
6. Question
Rationalise the denominator:√5-√2√5+√2- 1.
- 2.
- 3.
- 4.
Hint
Help VideoCorrect
Well Done!
Incorrect
Need TextPlayCurrent Time 0:00/Duration Time 0:00Remaining Time -0:00Stream TypeLIVELoaded: 0%Progress: 0%0:00Fullscreen00:00MutePlayback Rate1x- 2x
- 1.5x
- 1.25x
- 1x
- 0.75x
- 0.5x
Subtitles- subtitles off
Captions- captions off
- English
Chapters- Chapters
For the answer to be in simplest form, the denominator should be a rational number.Multiply the numerator and the denominator by √5-√2√5-√2√5+√2 = √5-√2√5+√2×√5-√2√5-√2 = (√5-√2)(√5-√2)(√5+√2)(√5-√2) = 5-√10-√10+25-2 Expand the brackets = 7-2√103 7-2√103
Quizzes
- Simplify Square Roots 1
- Simplify Square Roots 2
- Simplify Square Roots 3
- Simplify Square Roots 4
- Simplify Radicals with Variables 1
- Simplify Radicals with Variables 2
- Simplify Radicals with Variables 3
- Rewriting Entire and Mixed Radicals 1
- Rewriting Entire and Mixed Radicals 2
- Add and Subtract Radical Expressions (Basic) 1
- Add and Subtract Radical Expressions (Basic) 2
- Add and Subtract Radical Expressions (Basic) 3
- Add and Subtract Radical Expressions 1
- Add and Subtract Radical Expressions 2
- Add and Subtract Radical Expressions 3
- Multiply Radical Expressions 1
- Multiply Radical Expressions 2
- Multiply Radical Expressions 3
- Multiply Radical Expressions 4
- Divide Radical Expressions 1
- Divide Radical Expressions 2
- Divide Radical Expressions 3
- Multiply and Divide Radical Expressions
- Simplify Radical Expressions using the Distributive Property 1
- Simplify Radical Expressions using the Distributive Property 2
- Simplify Radical Expressions using the Distributive Property 3
- Simplify Binomial Radical Expressions using the FOIL Method 1
- Simplify Binomial Radical Expressions using the FOIL Method 2
- Rationalizing the Denominator 1
- Rationalizing the Denominator 2
- Rationalizing the Denominator 3
- Rationalizing the Denominator 4
- Rationalizing the Denominator using Conjugates