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Question
If `x = 3 + 2sqrt(2)`, find the value of `sqrt(x) + 1/sqrt(x)`.
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Solution
Given: `x = 3 + 2sqrt(2)`
We need to find the value of `sqrt(x) + 1/sqrt(x)`.
Step-wise calculation:
1. Let `y = sqrt(x) + 1/sqrt(x)`.
2. Square both sides:
`y^2 = (sqrt(x) + 1/sqrt(x))^2`
`y^2 = x + 2 + 1/x`
3. We already have:
`x = 3 + 2sqrt(2)` and we find `1/x = 1/(3 + 2sqrt(2))`
4. Rationalize the denominator of `1/x`:
`1/(3 + 2sqrt(2)) = (3 - 2sqrt(2))/((3 + 2sqrt(2))(3 - 2sqrt(2))`
`1/(3 + 2sqrt(2)) = (3 - 2sqrt(2))/(9 - 8)`
`1/(3 + 2sqrt(2)) = 3 - 2sqrt(2)`
5. Now, sum `x + 1/x`:
`(3 + 2sqrt(2)) + (3 - 2sqrt(2)) = 3 + 3 + 2sqrt(2) - 2sqrt(2)`
`(3 + 2sqrt(2)) + (3 - 2sqrt(2)) = 6`
6. Substitute the values back into y2:
`y^2 = x + 2 + 1/x`
y2 = 6 + 2
y2 = 8
7. Finally,
`y = sqrt(8)`
`y = 2sqrt(2)`
