According to the Complex Conjugate Root Theorem, if a+bi is a root of a quadratic equation, then blank is also a root of the equation. Which expression correctly completes the previous sentence?
a−bi
a+bi
−a−bi
−a+bi

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AlonsoDehner AlonsoDehner · Answer 1 · 2018-10-23T17:54:33+02:00

Answer:

a-bi

Step-by-step explanation:

If a quadratic equation lx^2+mx+n=0 has one imaginary root as a+bi then the other root is the conjugate of a+bi = a-bi

Because we have l, m and n are real numbers and they are the coefficients.

Sum of roots = a+bi + second root = -m/l

When -m/l is real because the ratio of two real numbers, left side also has to be real.

Since bi is one imaginary term already there other root should have -bi in it so that the sum becomes real.

i.e. other root will be of the form c-bi for some real c.

Now product of roots = (a+bi)(c-bi) = n/l

Since right side is real, left side also must be real.

i.e.imaginary part =0

bi(a-c) =0

Or a =c

i.e. other root c-bi = a-bi

Hence proved.