How do you find the general solutions for $2 cos x + 1 = cos x$ ?

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How do you find the general solutions for $2 cos x + 1 = cos x$ ?

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Answer 1 · 2015-11-28T11:11:11

$x= (2k+1)pi$

Explanation:

Subtract $cos(x)$ from both sides:

$2cos(x) +1 -cos(x)=cos(x)-cos(x)$

and summing things up, we have

$cos(x)+1=0$

Now subtract one from both sides:

$cos(x)+1-1=0-1$

and so

$cos(x)=-1$

And since the cosine is the projection of the points of the unit circle on the $x$ -axis, the only possible point is the "east pole" of the cirle, which means $x=180^@$ , or, in radians, $x=\pi$ .

Of course this solution is not unique, since you can do as many additional laps as you like, obtaining all the possible solutions

$x=pi+2kpi = (2k+1)pi$

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How do you find the general solutions for $2 cos x + 1 = cos x$ ?

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