A numerical method employs approximations of derivatives to solve differential equations. For example, the derivative of a function at a specific point can be estimated using the difference in the function’s values at nearby points, divided by the distance between those points. This foundational concept allows for the creation of tools that can handle complex equations across various scientific and engineering disciplines.
This approach offers practical solutions where analytical methods are intractable. Its historical roots lie in the earliest attempts to understand and model continuous change, predating modern computing. The ability to approximate solutions numerically has been essential to advancements in fields like physics, engineering, and finance, enabling simulations and predictions that would otherwise be impossible.