Advertisements
Advertisements
Question
Find the value of a and b in the following:
`(5 + sqrt(5))/(9 - 4sqrt(5)) = a + bsqrt(5)`
Advertisements
Solution
We are given the equation:
`(5 + sqrt(5))/(9 - 4sqrt(5)) = a + bsqrt(5)`
Step 1: Multiply numerator and denominator by the conjugate of the denominator:
The conjugate of `9 - 4sqrt(5)` is `9 + 4sqrt(5)`.
Multiply the numerator and denominator by `9 + 4sqrt(5)`:
`(5 + sqrt(5))/(9 - 4sqrt(5)) xx (9 + 4sqrt(5))/(9 + 4sqrt(5))`
= `((5 + sqrt(5))(9 + 4sqrt(5)))/((9 - 4sqrt(5))(9 + 4sqrt(5))`
Step 2: Simplify the denominator using the identity `(a - b)(a + b) = a^2 - b^2`:
`(9 - 4sqrt(5))(9 + 4sqrt(5))`
= `9^2 - (4sqrt(5))^2`
= 81 – 16 × 5
= 81 – 80
= 1
Step 3: Expand the numerator:
Now, expand the numerator `(5 + sqrt(5))(9 + 4sqrt(5))` using distributive property (FOIL):
1. 5 × 9
= 45
2. `5 xx 4sqrt(5)`
= `20sqrt(5)`
3. `sqrt(5) xx 9`
= `9sqrt(5)`
4. `sqrt(5) xx 4sqrt(5)`
= 4 × 5
= 20
So, the numerator becomes:
`45 + 20sqrt(5) + 9sqrt(5) + 20 = 65 + 29sqrt(5)`
Step 4: Simplify:
Since the denominator is 1, the expression simplifies to `65 + 29sqrt(5)`
a = 65, b = 29
