Complex Variables Homework 6 - Christopher Newport University, Math 355-01 - Prof. P. P. K, Assignments of Mathematics

The sixth homework assignment for the complex variables course offered by the department of mathematics at christopher newport university during the spring term 2007. The assignment includes four problems, covering topics such as evaluating integrals using different methods, contour integration, and complex functions.

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Pre 2010

Uploaded on 08/19/2009

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Department of Mathematics
Christopher Newport University
Math 355-01 Complex Variables Spring Term 2007
Homework # 6
Due Friday March 2, 2007
1. Evaluate the integral in two different ways (a) directly, (b) by rewriting the integral as the sum of the integrals of the
real and imaginary part of the integrand.
Zπ/2
0
e(1 + 2 i)tdt
2. Evaluate each integral
(a) Z1
0
dt
ti(b) Zπ
0
sin(t+i)dt
3. Do problem # 7 on page 116.
4. Let f(z) = z . Evaluate ZC
f(z)dz for the following contour C.
(a) z=ei θ,π
2θ3π
2
(b) Cis the closed contour C1+C2+C3where
C1:y=x2,from (0,0) to (1,1)
C2: the line segment from (1,1) to (2,0)
C3: part of the x-axis from (2,0) to (0,0)

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Department of Mathematics Christopher Newport University

Math 355-01 Complex Variables Spring Term 2007 Homework # 6 Due Friday March 2, 2007

  1. Evaluate the integral in two different ways (a) directly, (b) by rewriting the integral as the sum of the integrals of the real and imaginary part of the integrand. (^) ∫ π/ 2

0

e(1 + 2^ i)^ t^ dt

  1. Evaluate each integral

(a)

0

dt t − i

(b)

∫ (^) π

0

sin(t + i) dt

  1. Do problem # 7 on page 116.
  2. Let f (z) = z. Evaluate

C

f (z) dz for the following contour C.

(a) z = ei θ^ ,

π 2

≤ θ ≤

3 π 2

(b) C is the closed contour C 1 + C 2 + C 3 where

C 1 : y = x^2 , from (0, 0) to (1, 1)

C 2 : the line segment from (1, 1) to (2, 0)

C 3 : part of the x-axis from (2, 0) to (0, 0)