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If `x = sqrt(2) + 1` then `x + 1/x` is equal to ______.
рдкрд░реНрдпрд╛рдп
2
`2sqrt(2)`
`sqrt(2) - 1`
4
MCQ
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If `x = sqrt(2) + 1` then `x + 1/x` is equal to `underlinebb(2sqrt(2))`.
Explanation:
Given `x = sqrt(2) + 1`, we want to find `x + 1/x`.
Step 1: Calculate `1/x`:
`1/x = 1/(sqrt(2) + 1)`
Multiply numerator and denominator by the conjugate `sqrt(2) - 1`:
`1/(sqrt(2) + 1) xx (sqrt(2) - 1)/(sqrt(2) - 1)`
= `(sqrt(2) - 1)/((sqrt(2) + 1)(sqrt(2) - 1))`
= `(sqrt(2) - 1)/(2 - 1)`
= `sqrt(2) - 1`
Step 2: Add x and `1/x`:
`x + 1/x`
= `(sqrt(2) + 1) + (sqrt(2) - 1)`
= `sqrt(2) + 1 + sqrt(2) - 1`
= `2sqrt(2)`
Therefore, `x + 1/x = 2sqrt(2)`.
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