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- ==Derivation and integration== The integration can be expressed with4 KB (661 words) - 10:12, 20 July 2020
- With such a representation, in the first integral in (4), the variable of integration \(y\) can be changed to \(x\), ===Change of variable of integration===9 KB (1,358 words) - 18:27, 30 July 2019
- The contour of integration of equation (1) goes from zero to the imaginary part of \(z\) along the ima The contour of integration of equation (1) can be modified without to affect the values of the functio27 KB (4,071 words) - 18:29, 16 July 2020
- ...ral''' of function \(f\) is function \(J^n f\) expressed with iteration of integration: ==Cauchi representation for the iterated integration==9 KB (1,321 words) - 18:26, 30 July 2019
- ...e included "as is" to the [[C++]] code for the numerical implementation of integration. This file is used in the generators of figures for the [[Cauchi integral]] [[Integration]], [[Tetration]], [[C++]]108 KB (1,626 words) - 18:46, 30 July 2019
- A. integration along the line \(\Re(t)=1\) from \(t = 1−\mathrm i A\) to \(t = 1+\mathrm B. integration from point \(t = 1+\mathrm iA\) to \(t = −1+ \mathrm i A\), passing above6 KB (987 words) - 10:20, 20 July 2020
- The appropriate contour of integration may go straight from zero to \(z\).9 KB (982 words) - 18:48, 30 July 2019
- With new variable of integration \(y=x_n\),3 KB (421 words) - 18:26, 30 July 2019
- Integration of the equations above with initial conditions \(X_0(0)=0\), \(Y_0(0)=-1/\s8 KB (1,036 words) - 18:25, 30 July 2019
- The contour of integration of equation (1) goes from zero to the imaginary part of \(z\) along the ima The contour of integration of equation (1) can be modified without to affect the values of the functio4 KB (610 words) - 10:22, 20 July 2020
- Form the expression for the derivative, the [[integration]] of the [[power function]] also can be derived:15 KB (2,495 words) - 18:43, 30 July 2019
- For this expression, the Integration by parts is possible, because the function <math>\varepsilon(x\! -\! 0) + \38 KB (6,232 words) - 18:46, 30 July 2019
- The polynomial is good function for the analytic integration with exponential; so, the representation with the truncated series above ca In particular the upper curve, \(y=\mathrm{agreeA}(x)\), shows, that at the integration with this approximation from zero to at least 42 with a complex exponent, t13 KB (1,759 words) - 18:45, 30 July 2019
- Let \(d= \pi/N\) be step of integration at the uniform grid,5 KB (721 words) - 18:44, 30 July 2019
- The last table corresponds to the exact integration,8 KB (1,153 words) - 18:44, 30 July 2019
- ...president of Ukraine, was supposed to sing the documents that would allow integration of Ukraine into the European Union, but suddenly he had changed his mind an4 KB (557 words) - 07:00, 1 December 2018
- [[Category:Numerical integration]]7 KB (997 words) - 18:44, 30 July 2019
- ...used for the modification of the formulas above for arbitrary interval of integration.3 KB (486 words) - 18:47, 30 July 2019
- The upper curve, \(y=\mathrm{A}(x)\), shows, that at the integration of square of this approximation from zero to at least 42 with a complex exp The straightforward numerical integration in these expressions happened to be non-efficient, even for real \(p\); for14 KB (1,943 words) - 18:48, 30 July 2019
- In particular, the upper curve, \(y=\mathrm{A}(x)\), shows, that at the integration with this approximation from zero to at least 42 with a complex exponent, t ...piece" with some holomorphic function; then deformation of the contour of integration do not affect the result.4 KB (644 words) - 18:47, 30 July 2019
