Consider the following theorem.Fundamental Theorem for Contour IntegralsSuppose that a function is continuous on a domain D and F is an antiderivative of fin D. Then for any contour C in D with initial point zo and terminal point z₁,0+i[1(2).Use the theorem to evaluate the given integral.(In the integral, z¹/2 is the principal branch of the square root function. Write the answer in the form a + ib.f(z) dz = F(z₂) - F(zo).9√/24942¹/2dz, C is the arc of the circle z = 4et, .- 2st 2012

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Answered: Consider the following theorem.…

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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Recall that in calculus 1, the function f(r) = e¯z* only calc 1 tools, you cannot compute the improper integral was an example of a function with no closed form antueivacive. Hence, using ´dr. We will use calc 3 to compute the integral. (a) Let D be the first quadrant in the ry-plane. Write the double [fpe -z²-y° dA as an iterated improper integral. (b) Using polar coordinates, compute the iterated improper integral from part (a). (c) Using parts (a) and (b) compute the integral dr.
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Use the following theorem to evaluate the given integral. Fundamental Theorem for Contour Integrals Suppose that a function is continuous on a domain D and F is an antiderivative of f in D. Then for any contour C in D with initial point zo and terminal point z₁, [[ 1(2) dz f(z) dz = F(z₂) - F(zo). Write the answer in the form a + ib. (32²-42- 4z + 4l) dz
Consider the following theorem. Theorem If fis integrable on [a, b], then f(x) dx = lim n- 00 i = 1 b - a where Ax = = a + iAx. Use the given theorem to evaluate the definite integral. (8х2 + 8x) dx
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