1 Answer

JonVD · Answer 1 · 2020-08-22T16:04:37+0000

Answer:

$x=(\pi)/(4)$ and
$x=-(3\pi)/(4)$

Explanation:

We are given that sin x+cos x=cos 2x

We have to solve the given equation for
$0\leq x\leq 2\pi$

sin x+cos x=cos^2x-sin^2x

Because

sinx+cos x=(sinx +cos x)(sinx-cos x)

1 =sin x-cos x

sin x=cos x

(sinx )/(cos x)=1

tan x=1

$tan x=tan(\pi)/(4)$

$x=(\pi)/(4)$

Tan x is positive in I and III quadrant

In III quadrant angle
$\theta$ replace by
$\theta -\pi$

Therefore,
$tan x=tan ((\pi)/(4)-\pi)=tan(\pi-4\pi)/(4)=tan(-3\pi)/(4)$

$x=-(3\pi)/(4)$

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