f(z) = z² – 3ixy. (1) Determine whether f (z) is an analytic function or not. Evaluate the line integral of f(z) from z = 1 to z = i along the curves a and ß, where a follows the axes and passes through the origin, while ß is an anticlockwise arc of a unit circle centred at the origin (see Figure 1 below). (ii) 1 a 1 Figure 1 Curves a and ß.
f(z) = z² – 3ixy. (1) Determine whether f (z) is an analytic function or not. Evaluate the line integral of f(z) from z = 1 to z = i along the curves a and ß, where a follows the axes and passes through the origin, while ß is an anticlockwise arc of a unit circle centred at the origin (see Figure 1 below). (ii) 1 a 1 Figure 1 Curves a and ß.
Trigonometry (MindTap Course List)
10th Edition
ISBN:9781337278461
Author:Ron Larson
Publisher:Ron Larson
Chapter6: Topics In Analytic Geometry
Section6.2: Introduction To Conics: parabolas
Problem 4ECP: Find an equation of the tangent line to the parabola y=3x2 at the point 1,3.
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Transcribed Image Text:(b)
Given
f(z) = z? – 3ixy.
(1)
Determine whether f(z) is an analytic function or not.
Evaluate the line integral of f(z) from z = 1 to z = i along the
curves a and ß, where a follows the axes and passes through
the origin, while B is an anticlockwise arc of a unit circle centred
at the origin (see Figure 1 below).
(ii)
y
1
1
Figure 1 Curves a and ß.
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