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Question
Rationalise the denominator of `(3sqrt(3) - 2)/(2sqrt(7) + 1)`.
Sum
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Solution
Let’s rationalise the expression:
`(3sqrt(3) - 2)/(2sqrt(7) + 1)`
Step 1: Multiply numerator and denominator by the conjugate of the denominator `(2sqrt(7) - 1)`:
`(3sqrt(3) - 2)/(2sqrt(7) + 1) xx (2sqrt(7) - 1)/(2sqrt(7) - 1)`
Step 2: Simplify Denominator
`(2sqrt(7) + 1)(2sqrt(7) - 1)`
= `(2sqrt(7))^2 - 1^2`
= 4 × 7 – 1
= 28 – 1
= 27
Step 3: Expand the Numerator
`(3sqrt(3) - 2)(2sqrt(7) - 1)`
1. `3sqrt(3) xx 2sqrt(7)`
= `6sqrt(21)`
2. `3sqrt(3) xx (-1)`
= `-3sqrt(3)`
3. `-2 xx 2sqrt(7)`
= `-4sqrt(7)`
4. `-2 xx (-1)`
= 2
So the numerator becomes:
`(6sqrt(21) - 3sqrt(3) - 4sqrt(7) + 2)/27`
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Chapter 1: Rational and Irrational Numbers - EXERCISE 1C [Page 15]
