The equation of the smallest degree with real coefficients having 1 + i as one of the roots is

Question:

The equation of the smallest degree with real coefficients having 1 + i as one of the roots is

(a) $x^{2}+x+1=0$

(b) $x^{2}-2 x+2=0$

(c) $x^{2}+2 x+2=0$

 

(d) $x^{2}+2 x-2=0$

Solution:

(b) $x^{2}-2 x+2=0$

We know that, imaginary roots of a quadratic equation occur in conjugate pair.

It is given that, $1+i$ is one of the roots.

So, the other root will be $1-i$.

Thus, the quadratic equation having roots $1+i$ and $1-i$ is,

$x^{2}-(1+i+1-i) x+(1+i)(1-i)=0$

$\Rightarrow x^{2}-2 x+2=0$

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