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Question
Find the roots of the following equation, if they exist, by applying the quadratic formula:
`x^2 - (sqrt(3) + 1)x + sqrt(3) = 0`
Sum
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Solution
Given: `x^2 - (sqrt(3) + 1)x + sqrt(3) = 0`
Step-wise calculation:
1. Compare with ax2 + bx + c = 0:
a = 1, b = `-(sqrt(3) + 1)`, c = `sqrt(3)`
2. By the quadratic formula `x = (-b ± sqrt(b^2 - 4ac))/(2a)`.
3. Compute the discriminant:
`b^2 - 4ac = (sqrt(3) + 1)^2 - 4 xx 1 xx sqrt(3)`
= `(3 + 2sqrt(3) + 1) - 4sqrt(3)`
= `4 - 2sqrt(3)`
4. Note `(sqrt(3) - 1)^2`
= `3 + 1 - 2sqrt(3)`
= `4 - 2sqrt(3)`
So, `sqrt(b^2 - 4ac) = sqrt(3) - 1`.
5. Now `x = ((sqrt(3) + 1) ± (sqrt(3) - 1))/2`.
For +: `x = (2sqrt(3))/2 = sqrt(3)`.
For −: `x = (2)/2 = 1`.
The roots are x = `sqrt(3)` and x = 1.
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