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

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asked Dec 3, 2023 224k views

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Tomtomtom · Answer 1 · 2023-12-08T20:27:02+0000

Since x is a fourth quadrant angle, it is between 270° and 360° (or between -90° and 0°).

So, calculating x, we have:

$\begin{gathered} \cos (x)=\frac{\sqrt[]{2}}{2} \\ x=\cos ^(-1)(\frac{\sqrt[]{2}}{2}) \\ x=-45\degree \end{gathered}$

Now, multiplying x by 2, we have -45 * 2 = -90°.

So the tangent of 2x is:

$\begin{gathered} \sin (-90\degree)=-1 \\ \cos (-90\degree)=0 \\ \tan (-90\degree)=(\sin (-90\degree))/(\cos (-90\degree))=(-1)/(0)=\text{ undefined} \end{gathered}$

Therefore tan 2x is undefined.

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

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