Mastering Trigonometric Equations: Solving cos 2x-cos^2 x=0

AI Thread Summary
The discussion focuses on solving the trigonometric equation cos 2x - cos²x = 0. Participants suggest using the double angle identity for cosine, which states cos(2x) = 2cos²x - 1. The equation can be rewritten as 2cos²x - 1 - cos²x = 0, simplifying to cos²x = y for easier manipulation. The goal is to express sin²x in terms of cos²x to facilitate solving the equation. The conversation emphasizes transforming the equation into a solvable format using substitutions.
lep11
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Homework Statement


cos 2x-cos^2 x=0

The Attempt at a Solution


I have no idea.
 
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Try getting everything in terms of ##cos^{2}{x}##

What is ##cos(2x)## equaled to? Hint. Double angle identity.
 
BloodyFrozen said:
Try getting everything in terms of ##cos^{2}{x}##

What is ##cos(2x)## equaled to? Hint. Double angle identity.

cos2x=2cos^2 -1
Therefore 2cos^2 x -1 -cos^2 x=0
How to continue?
 
lep11 said:
cos2x=2cos^2 -1
Therefore 2cos^2 x -1 -cos^2 x=0
How to continue?

Don't substitute it in yet.

##cos(2x)## has multiple identities; it also equals:

$$cos(2x) = cos^{2}(x) - sin^{2} (x)$$

How can you change the ##sin^{2} (x)## into cosines?
 
Last edited:
Anyone?
 
You already had 2cos^2 x -1 -cos^2 x=0.

Can you replace each occurrence of (cos^2 x) by y?
And then solve for y?
 

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