I'm aware that I could toss this into wolfram alpha and get an answer using the sine function, but assuming I have all of my data in integers, it should be solvable as them as well.

So I've got two waves, and they'll always have integer wavelengths. For my example, it's a 3 wavelength wave and a 4 wavelength wave. In the simplest case of both starting at time 0 sec, they are both 0 at the start and every 12 seconds afterward. Using the lcm to determine these crossing points works in every case I think, but if they start at different times it can only predict the frequency of them both being zero but not when it starts.

For instance, if the 3 length wave starts at time 1, and 4 length at time 0, they both are 0 at time 4 then every 12 afterward. But if the 4 length starts at time 2 and the 3 length at time 1, they are both 0 at time 10 and every 12 afterward.

What is the method to determine that first time they will both be 0 together?