If a and b are rational numbers, find the value of a and b: a + b⁢√2 = 4 + 3⁢√2/4 − 3⁢√2 - Mathematics

Question

If a and b are rational numbers, find the value of a and b:

`a + bsqrt(2) = (4 + 3sqrt(2))/(4 - 3sqrt(2))`

Sum

Solution

Given: `a + bsqrt(2) = (4 + 3sqrt(2))/(4 - 3sqrt(2))`

Step-wise calculation:

1. Rationalise the denominator on the right-hand side:

`(4 + 3sqrt(2))/(4 - 3sqrt(2)) xx (4 + 3sqrt(2))/(4 + 3sqrt(2))`

= `(4 + 3sqrt(2))^2/((4)^2 - (3sqrt(2))^2`

2. Calculate numerator:

`(4 + 3sqrt(2))^2`

= `4^2 + 2 xx 4 xx 3sqrt(2) + (3sqrt(2))^2`

= `16 + 24sqrt(2) + 9 xx 2`

= `16 + 24sqrt(2) + 18`

= `34 + 24sqrt(2)`

3. Calculate denominator:

`4^2 - (3sqrt(2))^2`

= 16 – 9 × 2

= 16 – 18

= –2

4. Therefore, `(4 + 3sqrt(2))/(4 - 3sqrt(2))`

= `(34 + 24sqrt(2))/(-2)`

= `-17 - 12sqrt(2)`

From the equality, `a + bsqrt(2) = -17 - 12sqrt(2)`.

Comparing rational and irrational parts: a = –17, b = –12.

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Q 5. (i)Q 4. (iii)Q 5. (ii)

Chapter 1: Rational and Irrational Numbers - Exercise 1E [Page 32]

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Nootan Mathematics [English] Class 9 ICSE

Chapter 1 Rational and Irrational Numbers
Exercise 1E | Q 5. (i) | Page 32

If a and b are rational numbers, find the value of a and b: a + b⁢√2 = 4 + 3⁢√2/4 − 3⁢√2 - Mathematics

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If a and b are rational numbers, find the value of a and b: a + b⁢√2 = 4 + 3⁢√2/4 − 3⁢√2 - Mathematics

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