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If cos x= √2/2 and x is a fourth quadrant angle, evaluate cos 2x

User Digvijaysinh Gohil
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1 Answer

24 votes
24 votes

Start by making a graph of the problem, taking into account that x is in the fourth quadrant and the triangle formed has a hypotenuse of 2 and an adjacent side of √2

use the Pythagorean theorem to find the missing side


\begin{gathered} a^2+b^2=c^2 \\ a=\sqrt[]{c^2-b^2} \\ a=\sqrt[]{(2)^2-(\sqrt[]{2})^2} \\ a=\sqrt[]{4-2} \\ a=\sqrt[]{2} \end{gathered}

then,

find the value of six(X)


\begin{gathered} \sin x=(op)/(hy) \\ \sin x=-\frac{\sqrt[]{2}}{2} \end{gathered}

use the double angle identities for cos


\begin{gathered} \cos 2x=\cos ^2x-\sin ^2x \\ \cos 2x=(\frac{\sqrt[]{2}}{2})^2-(-\frac{\sqrt[]{2}}{2})^2 \\ \cos 2x=(2)/(4)-(2)/(4) \\ \cos 2x=(1)/(2)-(1)/(2) \\ \cos 2x=0 \end{gathered}

If cos x= √2/2 and x is a fourth quadrant angle, evaluate cos 2x-example-1
If cos x= √2/2 and x is a fourth quadrant angle, evaluate cos 2x-example-2
User Never Quit
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