How do you solve $1 + cos x + cos 2 x = 0$ $1+ cos x + cos 2x = 0$ ?

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How do you solve $1 + cos x + cos 2 x = 0$ $1+ cos x + cos 2x = 0$ ?

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Answer 1 · 2016-04-27T01:30:27

$x=pi/2+kpi,(2pi)/3+2kpi,(4pi)/3+2kpi,kinZZ$

Explanation:

Use the identity for the cosine double angle formula:

$cos2x=2cos^2x-1$

The equation then becomes

$1+cosx+2cos^2x-1=0$

$2cos^2x+cosx=0$

Factor out a $cosx$ term.

$cosx(2cosx+1)=0$

Set each of these equal to $0$ .

$cosx=0" "" ""and"" "" "2cosx+1=0$
$" "" "" "" "" "" "" "" "" "cosx=-1/2$

$cosx=0$ occurs at $x=pi/2,(3pi)/2,(5pi)/2$ , which can be generalized as $x=pi/2+kpi,kinZZ$ (this means where $k$ is an integer).

$cosx=-1/2$ occurs at $x=(2pi)/3,(4pi)/3$ and all other concentric angles (which are $2pi$ away), thus we have $x=(2pi)/3+2kpi$ and $x=(4pi)/3+2kpi$ , both where $kinZZ$ .

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How do you solve $1 + cos x + cos 2 x = 0$ $1+ cos x + cos 2x = 0$ ?

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