The question is about the integral of complex functions.[ c ]is a circle with center 0 and radius 2Use the method shown in the photo こz dzA)» I=6 dzc z²-1e1 ه )B X درس: آزمایشگاه فیزیک پایه 3_01_2 inE 0387095039.pdfO File | C:/study-1/math+physics/0387095039.pdfE Contents(D Page viewA Read aloudV DrawE Highlight517of 828Eraseno surprise that the value of an analytic function at a boundary (contour)determines the function at all points inside the boundary.19.1.4 Derivatives as IntegralsThe CIF is a very powerful tool for working with analytic functions. Oneof the applications of this formula is in evaluating the derivatives of suchfunctions. It is convenient to change the dummy integration variable to § andwrite the CIF asf(2) = f C) d£2πί Jc ξ1 [ f(E)(19.9)where C is a simple closed contour in the E-plane and z is a point within C.By carrying the derivative inside the integral, we getdfd [f(E) d£]f(E) d£2mi Jc (E – 2)²*1d11%3D2ni de f LE) dedzdz- Z2niBy repeated differentiation, we can generalize this formula to the nth deriva-tive, and obtainTheorem 19.1.11. The derivatives of all orders of an analytic function f(z)exist in the domain of analyticity of the function and are themselves analyticin that domain. The nth derivative of f(z) is given by6:43 PMe Type here to search4/17/20214

The given integrals are A. I=∮Cdzz2-1 and B. I=∮Ceizz3dz Where C is a circle…

Answered: A» = dz :1م)د %3D e²dz ミ3 す

Math

Advanced Math

A» = dz :1م)د %3D e²dz ミ3 す

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter10: Sequences, Series, And Probability

Section10.7: Distinguishable Permutations And Combinations

Problem 21E

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Concept explainers

Riemann Sum

Riemann Sums is a special type of approximation of the area under a curve by dividing it into multiple simple shapes like rectangles or trapezoids and is used in integrals when finite sums are involved. Figuring out the area of a curve is complex hence this method makes it simple. Usually, we take the help of different integration methods for this purpose. This is one of the major parts of integral calculus.

Riemann Integral

Bernhard Riemann's integral was the first systematic description of the integral of a function on an interval in the branch of mathematics known as real analysis.

Question

The question is about the integral of complex functions.

[ c ]is a circle with center 0 and radius 2

Use the method shown in the photo

X درس: آزمایشگاه فیزیک پایه 3_01_2 in
E 0387095039.pdf
O File | C:/study-1/math+physics/0387095039.pdf
E Contents
(D Page view
A Read aloud
V Draw
E Highlight
517
of 828
Erase
no surprise that the value of an analytic function at a boundary (contour)
determines the function at all points inside the boundary.
19.1.4 Derivatives as Integrals
The CIF is a very powerful tool for working with analytic functions. One
of the applications of this formula is in evaluating the derivatives of such
functions. It is convenient to change the dummy integration variable to § and
write the CIF as
f(2) = f C) d£
2πί Jc ξ
1 [ f(E)
(19.9)
where C is a simple closed contour in the E-plane and z is a point within C.
By carrying the derivative inside the integral, we get
df
d [f(E) d£]
f(E) d£
2mi Jc (E – 2)²*
1
d
1
1
%3D
2ni de f LE) de
dz
dz
- Z
2ni
By repeated differentiation, we can generalize this formula to the nth deriva-
tive, and obtain
Theorem 19.1.11. The derivatives of all orders of an analytic function f(z)
exist in the domain of analyticity of the function and are themselves analytic
in that domain. The nth derivative of f(z) is given by
6:43 PM
e Type here to search
4/17/2021
4

With differentiation, one of the major concepts of calculus. Integration involves the calculation of an integral, which is useful to find many quantities such as areas, volumes, and displacement.

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