Gauß Quadratur - Numerische Integration - Finite Elemente

In numerical mathematics, numerical integration (traditionally also called numerical quadrature[1]) refers to the approximate calculation of integrals. Numerical integration is used when an antiderivative cannot be expressed using elementary functions, the numerical evaluation of the antiderivative is too complex, or the integrand is only available in discrete form, such as the result of measurements. For this purpose, the integral of a function f over the interval [a, b] is represented as the sum of the value Q(f) of an approximate formula Q (also called a quadrature formula) and an error value E(f). . . . . . . . . . . .    • day1 NYC -  welcome to the secre part of m...