To solve the equation, we can first isolate the cosine term:
2cos(2x+p/3) = √3
Divide both sides by 2:
cos(2x+p/3) = √3 / 2
Next, we can find the angles where the cosine function equals √3 / 2. Since cos(30°) = √3 / 2, we can write:
2x + p/3 = 30°
Solve for x:
2x = 30° - p/3x = (30° - p/3) / 2
Therefore, x = (30° - p/3) / 2.
To solve the equation, we can first isolate the cosine term:
2cos(2x+p/3) = √3
Divide both sides by 2:
cos(2x+p/3) = √3 / 2
Next, we can find the angles where the cosine function equals √3 / 2. Since cos(30°) = √3 / 2, we can write:
2x + p/3 = 30°
Solve for x:
2x = 30° - p/3
x = (30° - p/3) / 2
Therefore, x = (30° - p/3) / 2.