0 the branch of calculus in which rates of change and connected quantities are calculated --
We now mention briefly other approaches to differential calculus in domain theory, computable analysis, differential inclusions and interval analysis.
Both this unified approach and the results of differential calculus allow us to characterize distributions in terms of three different types of conditional expectations.
Conversely, the induced by the deriving transformation must reduce to when the deriving transformation was induced by the differential calculus.
Lagrange invented the method of solving differential equations known as variation of parameters, applied differential calculus to the theory of probabilities and attained notable work on the solution of equations.
Archimedes was the first to find the tangent to a curve, other than a circle, in a method akin to differential calculus.
Craig was needed to teach differential calculus and integral calculus.
Silva worked in analytic functionals, the theory of distributions, vector-valued distributions, ultradistributions, the operational calculus, and differential calculus in locally convex spaces.
Fermat's derivation also utilized his invention of adequality, a mathematical procedure equivalent to differential calculus, for finding maxima, minima, and tangents.