1 Answer

Ortho · Answer 1 · 2021-10-23T12:47:23+0000

Answer:

$$x=(25\pi )/(12) \text{ and }x=(29\pi )/(12)$

Explanation:

Solve

$\log_2(2 \sin x) + \log_2(\cos x) =1$

in interval
$\left(2\pi, (5\pi)/(2) \right)$

Remember that logarithms follow:

$f(x\cdot y)=f(x)+ f(y)$

Therefore

$\log_2(2 \sin x) + \log_2(\cos x) =-1 \implies \log_2(2 \sin x \cdot \cos x) =-1$

We got a double angle of sine:

$\sin(2x)= 2 \sin x \cos x$

$\log_2( \sin 2x ) =-1$

$2^(-1)=\sin 2x$

$(1)/(2) =\sin 2x$

The solutions for it are:

$2x=(\pi )/(6)+2\pi n \text{ and }2x=(5\pi )/(6)+2\pi n, \text{ as } n\in \mathbb{Z}$

As

$x=(\pi )/(12)+\pi n \text{ and }x=(5\pi )/(12)+\pi n, \text{ as } n\in \mathbb{Z}$

But we have the interval

$\left(2\pi, (5\pi)/(2) \right)$

Therefore, the answer is

$$x=(25\pi )/(12) \text{ and }x=(29\pi )/(12)$

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