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Question
If `x = (3 + sqrt(2))/(3 - sqrt(2)), y = (3 - sqrt(2))/(3 + sqrt(2))`, find x2 + y2 + xy.
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Solution
Given: `x = (3 + sqrt(2))/(3 - sqrt(2)), y = (3 - sqrt(2))/(3 + sqrt(2))`
We are to find x2 + y2 + xy.
Stepwise calculation:
1. Rationalise x and y:
`x = (3 + sqrt(2))/(3 - sqrt(2)) xx (3 + sqrt(2))/(3 + sqrt(2))`
= `(3 + sqrt(2))^2/((3)^2 - (sqrt(2))^2`
= `(9 + 6sqrt(2) + 2)/(9 - 2)`
= `(11 + 6sqrt(2))/7`
Similarly for y:
`y = (3 - sqrt(2))/(3 + sqrt(2)) xx (3 - sqrt(2))/(3 - sqrt(2))`
= `(3 - sqrt(2))^2/(9 - 2)`
= `(9 - 6sqrt(2) + 2)/7`
= `(11 - 6sqrt(2))/7`
2. Calculate x2:
`x^2 = ((11 + 6sqrt(2))/7)^2`
= `((11)^2 + 2 xx 11 xx 6sqrt(2) + (6sqrt(2))^2)/49`
= `(121 + 132sqrt(2) + 72)/49`
= `(193 + 132sqrt(2))/49`
3. Calculate y2:
`y^2 = ((11 - 6sqrt(2))/7)^2`
= `(121 - 132sqrt(2) + 72)/49`
= `(193 - 132sqrt(2))/49`
4. Calculate xy:
`xy = ((3 + sqrt(2))/(3 - sqrt(2))) xx ((3 - sqrt(2))/(3 + sqrt(2)))`
xy = 1
5. Sum up x2 + y2 + xy:
x2 + y2 + xy
= `(193 + 132sqrt(2))/49 + (193 - 132sqrt(2))/49 + 1`
= `(193 + 132sqrt(2) + 193 - 132sqrt(2))/49 + 1`
= `386/49 + 1`
= `386/49 + 49/49`
= `435/49`
