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2. Integration by parts - Wikipedia

   en.wikipedia.org/wiki/Integration_by_parts

   The antiderivative of − ⁠ 1 / x 2 ⁠ can be found with the power rule and is ⁠ 1 / x ⁠. Alternatively, one may choose u and v such that the product u′ (∫v dx) simplifies due to cancellation. For example, suppose one wishes to integrate:

3. Power rule - Wikipedia

   en.wikipedia.org/wiki/Power_rule

   With hindsight, however, it is considered the first general theorem of calculus to be discovered. [1] The power rule for differentiation was derived by Isaac Newton and Gottfried Wilhelm Leibniz, each independently, for rational power functions in the mid 17th century, who both then used it to derive the power rule for integrals as the inverse ...

4. Antiderivative - Wikipedia

   en.wikipedia.org/wiki/Antiderivative

   The slope field of () = +, showing three of the infinitely many solutions that can be produced by varying the arbitrary constant c.. In calculus, an antiderivative, inverse derivative, primitive function, primitive integral or indefinite integral [Note 1] of a continuous function f is a differentiable function F whose derivative is equal to the original function f.

5. Quantum calculus - Wikipedia

   en.wikipedia.org/wiki/Quantum_calculus

   A function F(x) is an h-antiderivative of f(x) if D h F(x) = f(x).The h-integral is denoted by ().If a and b differ by an integer multiple of h then the definite integral () is given by a Riemann sum of f(x) on the interval [a, b], partitioned into sub-intervals of equal width h.

6. Product rule - Wikipedia

   en.wikipedia.org/wiki/Product_rule

   In calculus, the product rule (or Leibniz rule [1] or Leibniz product rule) is a formula used to find the derivatives of products of two or more functions.For two functions, it may be stated in Lagrange's notation as () ′ = ′ + ′ or in Leibniz's notation as () = +.

7. Cauchy formula for repeated integration - Wikipedia

   en.wikipedia.org/wiki/Cauchy_formula_for...

   The Cauchy formula for repeated integration, named after Augustin-Louis Cauchy, allows one to compress n antiderivatives of a function into a single integral (cf. Cauchy's formula). For non-integer n it yields the definition of fractional integrals and (with n < 0) fractional derivatives .