calculuslike

Calculuslike is a term used to describe mathematical concepts or operations that share similarities with fundamental calculus principles, such as differentiation and integration, but are applied in contexts that are not strictly part of traditional calculus. This can include discrete mathematics, numerical analysis, or even certain algorithms where rates of change, accumulation, or approximations of continuous processes are involved.

For instance, in discrete calculus, finite differences are used to approximate derivatives for functions defined only

The essence of calculuslike approaches lies in extending the ideas of continuous change and accumulation to