Consider the following theorem. Fundamental Theorem for Contour Integrals Suppose 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, [1(2). 0+i f(z) dz = F(z₂) - F(zo). Use the theorem to evaluate the given integral. 9 Jc 424/2 dz, C is the arc of the circle z = 4et, . In the integral, z¹/2 is the principal branch of the square root function. Write the answer in the form a + ib. 9√/2 4 - 2st 2012

Advanced Engineering Mathematics
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Chapter2: Second-order Linear Odes
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Consider the following theorem.
Fundamental Theorem for Contour Integrals
Suppose 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√/2
4
9
42¹/2
dz, C is the arc of the circle z = 4et, .
- 2st 2012
Transcribed Image Text:Consider the following theorem. Fundamental Theorem for Contour Integrals Suppose 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√/2 4 9 42¹/2 dz, C is the arc of the circle z = 4et, . - 2st 2012
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