How should I begin to add together these two trigonometric functions: $$3\cos\left(3t + \frac\pi5\right) + 4\cos\left(4t+\frac\pi8\right)$$ in order that I might obtain the value of the period of their sum?
I have considered expanding the two cosines, according to the rule of sum, but have gotten very little from it; and have wondered whether one could write the two using complex exponentials: $$3e^{i(3t+π/5)} + 4e^{i(4t+π/8)}.$$
\begin{align} & 3\cos(3t + \pi/5) + 4\cos(4t+\pi/8) \\[8pt] = {} & 3\cos(3t)\cos(\pi/5) - 3\sin(3t)\sin(\pi/5) \\ & {} + 4\cos(4t)\cos(\pi/8) - 4\sin(4t)\sin(\pi/8) \\[8pt] = {} & A\cos(3t) + B\sin(3t) + C\cos(4t) + D\sin(4t) \tag 1 \\[8pt] & \text{where } A = 3\cos(\pi/5),\, B=-3\sin(\pi/5), \\ & C= 4\cos(\pi/8), \, D = -4\sin(\pi/8). \end{align}
For some purposes it may be better to write it in the form seen on line $(1)$ above.
But the terms involving $3t$ and those involving $4t$ cannot be combined to make a single sine wave. To see that, look at the graph. It's not shaped like a single sine wave.
