To solve the given trigonometric equation, we can use the trigonometric identity:
Cos(a) - Cos(b) = 2Sin((a+b)/2)Sin((a-b)/2)
Therefore, the equation becomes:
2Sin(4x)/2 * Sin(-x)/2 = Sin(4x)
Which simplifies to:
Sin(2x) * Sin(2x) = Sin(4x)
Sin^2(2x) = Sin(4x)
An identity to be applied here is:
Sin^2(x) = (1 - Cos(2x)) / 2
Thus, the equation becomes:
(1 - Cos(4x)) / 2 = Sin(4x)
Solving for Cos(4x) yields:
Cos(4x) = 1 - 2Sin(4x)
An identity to be applied is:
Sin^2(x) + Cos^2(x) = 1
Therefore, the solution is Cos(4x) = 1 - 2(1 - Cos^2(2x))
Solution:
Cos(4x) = 1 - 2 + 2Cos^2(2x)Cos(4x) = -1 + 2Cos^2(2x)
Hence, the solution to the given trigonometric equation is Cos(4x) = -1 + 2Cos^2(2x).
To solve the given trigonometric equation, we can use the trigonometric identity:
Cos(a) - Cos(b) = 2Sin((a+b)/2)Sin((a-b)/2)
Therefore, the equation becomes:
2Sin(4x)/2 * Sin(-x)/2 = Sin(4x)
Which simplifies to:
Sin(2x) * Sin(2x) = Sin(4x)
Sin^2(2x) = Sin(4x)
An identity to be applied here is:
Sin^2(x) = (1 - Cos(2x)) / 2
Thus, the equation becomes:
(1 - Cos(4x)) / 2 = Sin(4x)
Solving for Cos(4x) yields:
Cos(4x) = 1 - 2Sin(4x)
An identity to be applied is:
Sin^2(x) + Cos^2(x) = 1
Therefore, the solution is Cos(4x) = 1 - 2(1 - Cos^2(2x))
Solution:
Cos(4x) = 1 - 2 + 2Cos^2(2x)
Cos(4x) = -1 + 2Cos^2(2x)
Hence, the solution to the given trigonometric equation is Cos(4x) = -1 + 2Cos^2(2x).