1 Answer

Andrew Rukin · Answer 1 · 2021-01-14T02:43:42+0000

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

Condense the logarithms on the left side:

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

Recall the double angle identity for sine,
$\sin(2x)=2\sin x\cos x$ :

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

Write both sides as powers of 2:

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

Simplify this:

$\sin(2x)=\frac12$

Solve for
:

$2x=\sin^(-1)\left(\frac12\right)+2n\pi\text{ OR }2x=\pi-\sin^(-1)\left(\frac12\right)+2n\pi$

(where
is any integer)

Recall that
$\sin^(-1)\left(\frac12\right)=\frac\pi6$ :

$2x=\frac\pi6+2n\pi\text{ OR }2x=\frac{5\pi}6+2n\pi$

Solve for
:

$x=\frac\pi{12}+n\pi\text{ OR }x=(5\pi)/(12)+n\pi$

We get solutions in the interval
$2\pi <x<\frac{5\pi}2$ when
n=2 , giving

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

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