Answer:
For any integer k, ...
Step-by-step explanation:
You want the solutions to the equation cos(3x+2) = cos(x+11/3).
The cosine function is an even function with period 2π. This means ...
cos(x) = cos(2kπ±x)
Using this to find the solutions of the given equation, we have ...
cos(3x+2) = cos(2kπ ± (x +11/3))
Function values are the same when the arguments are the same:
3x +2 = 2kπ ± (x + 11/3)
This resolves to two equations.
[tex]3x+2=2k\pi+x+\dfrac{11}{3}\\\\9x+6=6k\pi+3x+11\qquad\text{multiply by 3}\\\\6x=6k\pi+5\qquad\text{subtract $3x+6$}\\\\\boxed{x=\dfrac{5}{6}+k\pi}\qquad\text{divide by 6}[/tex]
And the other equation is ...
[tex]3x+2=2k\pi-x-\dfrac{11}{3}\\\\9x+6=6k\pi-3x-11\qquad\text{multiply by 3}\\\\12x=6k\pi-17\qquad\text{add $3x-6$}\\\\\boxed{x=\dfrac{k\pi}{2}-\dfrac{17}{12}}\qquad\text{divide by 12}[/tex]