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Roots of a Quadratic Equation

x2+2x+2=0 has...

Question

$x^{2} + 2 x + 2 = 0$ has the roots as $α$ and $β$ then find $α^{15} + β^{15} = ?$

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Solution

$x^{2} + 2 x + 2 = 0$
Here, $a = 1, b = 2,, c = 2$
From quadratic formula,
$x = \frac{- 2 \pm \sqrt{2^{2} - 4 \times 2 \times 1}}{2 \times 1}$
$\Rightarrow x = \frac{- 2 \pm 2 i}{2} = - 1 \pm i$
Therefore,
$α = - 1 + i \Rightarrow α^{2} = {(- 1 + i)}^{2} = - 2 i$
$β = - 1 - i \Rightarrow β^{2} = {(- 1 - i)}^{2} = 2 i$
Now,
$α^{15} + β^{15}$
$= {(α^{2})}^{7} \cdot α + {(β^{2})}^{7} \cdot β$
$= {(- 2 i)}^{7} (- 1 + i) + {(2 i)}^{7} (- 1 - i)$
$= {(- 2)}^{7} (- i) (- 1 + i) + 2^{7} (- i) (- 1 - i)$
$= 2^{7} i (- 1 + i) + 2^{7} i (1 + i)$
$= 2^{7} i (- 1 + i + 1 + i)$
$= 2^{7} i \cdot 2 i$
$= 2^{8} \cdot (- 1)$
$= - 256$

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