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?
Lv 7
? asked in Science & MathematicsMathematics · 6 years ago

x=2+sqrt(3)-i is a root of x^2+2ix-4[2+sqrt(3)]=0, what is the other root, what is the characteristic of them can be found?

2 Answers

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  • 6 years ago
    Favourite answer

    You may be learning techniques I never studied, but here's how I'd approach it:

    By completing the square, x+2ix = (x + i)² + 1, so the equation rewrites as:

    (x + i)² = 4(2 + √3) - 1

    The right side doesn't matter if you're not finding the roots "from scratch." The roots will be:

    x + i = ± √(something)

    x = (-i) ± √(something)

    Apparently that +√(something) is 2 + √3, so the other root must be

    x = -i - √(something) = -i - 2 - √3

    Both that and the given actually do work if plugged back into the original equation. I was surprised that √[ 4(2 + √3) - 1 ] = √(7 + 4√3) simplifies to 2+√3..

  • ?
    Lv 7
    6 years ago

    By the synthetic division:

    1..................2i...............-8-4sqrt(3) | [2+sqrt(3)-i]

    .....2+sqrt(3)-i................8+4sqrt(3) |

    -------------------------------------------------

    1...2+sqrt(3)+i

    =>

    x= -2-sqrt(3)-i is the other root

    These 2 non-real roots are symetrical

    to the imaginary y-axis in the complex

    plane.

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