In this post I’m going to work through the math showing that a simple harmonic wave profile/function satisfies the one-dimensional wave equation. The simple harmonic function is given in the following equation. The variable is the wave speed in the direction, while is the shape of the profile of the wave.
(1)
The 1D wave equation that we wish to satisfy is given below.
(2)
To see whether the wave function satisfies the wave equation, we only need to take a couple of partial derivatives. Let’s start with the left side of the equation. The first step is to take the partial derivative of with respect to while holding constant.
(3)
Now let’s take another partial derivative with respect to while holding constant again.
(4)
That’s it for the left hand side of the equation. Now we can move to the right hand side, and take a derivative of with respect to while holding constant.
(5)
Now we can take another partial derivative with respect to while holding constant.
(6)
We now have all the terms we need to plug into the wave equation, as seen below.
(7)
The last step is to cancel the term.
(8)
We can see that the left hand side is equal to the right hand side, indicating that our wave function does indeed satisfy the wave equation.