Solve trigonometric inequality 2 cos^2 x+cos(2x) >= 1

inurbandojoa

inurbandojoa

Answered question

2022-11-04

Solve trigonometric inequality 2 cos 2 x + cos ( 2 x ) 1
My attempt:
2 cos 2 x + cos 2 x sin 2 x sin 2 x + cos 2 x
2 cos 2 x 2 sin 2 x 0
2 ( cos 2 x sin 2 x ) 0
2 cos ( 2 x ) 0
cos ( 2 x ) 0
What`s next?

Answer & Explanation

postotnojeyf

postotnojeyf

Beginner2022-11-05Added 16 answers

You ended up with (1) cos 2 x 0
This is possible if and only if 2x is in either first or the fourth quadrant. In particular,(1) is true if 2 x [ 0 , π 2 ] [ 3 π 2 , 2 π ]
To generalize the blue colored domain, just add 2 n π , n Z to get the following:
2 x [ 2 n π , 2 n π + π 2 ] [ 2 n π + 3 π 2 , 2 n π + 2 π ] , n Z
It follows that x [ n π , n π + π 4 ] [ n π + 3 π 4 , n π + π ] , n Z

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