In this video, we'll solve a 2nd order ODE, initial value problem, using a 4th order Taylor series method. The method can be described as follows:

Step 1: Convert the second-order ODE into a system of first-order ODEs.
Step 2: Apply the 4th-order Taylor method by computing derivatives up to the 4th order.
Step 3: Use the Taylor series formula to approximate the solution at each step.
Step 4: Iterate the process over the desired interval.

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