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Feras Arabiat · Answer 1 · 2023-08-12T11:54:55+0000

$\theta=(\pi)/(6),\: \theta=(11\pi)/(6)$

1) Let's start out isolating the cosine by dividing both sides by 2

$\begin{gathered} 2\cos \mleft(\theta\mright)=√(3) \\ (2\cos\left(θ\right))/(2)=(√(3))/(2) \\ \cos \mleft(\theta\mright)=(√(3))/(2) \\ \end{gathered}$

2) From that we can find two general solutions in which the cosine of theta yields the square root of 3 over two:

$\begin{gathered} \cos (30^(\circ))or\cos ((\pi)/(6))\text{ and }cos(330^(\circ)or(11)/(6)\pi)=\frac{\sqrt[]{3}}{2} \\ \theta=(\pi)/(6)+2\pi n,\: \theta=(11\pi)/(6)+2\pi n \end{gathered}$

But not that there is a restraint, so we can write out the solution as:

$\theta=(\pi)/(6),\: \theta=(11\pi)/(6)$

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