1. Supply all the details of the proof of Gauss's Me If fis analytic in a simply connected domain D that contains the circle CR, S (zo + Re" )d0. 2л 1 centered at zo with radius R, then f(zo) = %3D Let a function f be continuous on a closed bounded region R, and let it be analytie and not constant throughout the interior of R. Assuming that f(z) # 0 anywhere in R, prove that [(z)| has a minimum value m in R which occurs on the boundary of R and never in the interior ofR by applying the Maximum Modulus Principle to the function 1/f(z). Find the sum of the series. (1+i 1 (а) (b) Σ 2 n=0 n=2 (2+i)" -iz eiz -e 4. Use the Maclaurin series e = }, Σ and the definition sin(z) = %3D n! 2i n=0 to find the Maclaurin series for the entire function f(z) = sin(z). Differentiate the Maclaurin series for f(z) = sin(z) term by term to obtain the Maclaurin series for f (z) = cos(z). %3D 6. Derive the Taylor series representation in the disk |z – i|< /2 : 1 (z-i)" Σ n=0 (1-i)"+1 %3D 1-z 1 1 Hint: Start by writing 1- z (1– i) - (z- i) 1-i 1-(z-i)/(1-i) 2. 3. 5.

Question 3

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1. Supply all the details of the proof of Gauss's Mean Value Theorem: If f is analytic in a simply connected domain D that contains the circle Cr , 1 27 centered at zo with radius R, then f(zo) =- + Re" )d0. 2л 2. Let a function ƒ be continuous on a closed bounded region R, and let it be analytie and not constant throughout the interior of R. Assuming that f(z) ± 0 anywhere in R, prove that [(z)| has a minimum value m in R which occurs on the boundary of R and never in the interior ofR by applying the Maximum Modulus Principle to the function 1/f(z). 3. Find the sum of the series. 00 1+i 8. 1 (a) (b) Σ 2 n=0 n=2 (2+i)" iz z" Σ and the definition sin(z)= eiz 4. Use the Maclaurin series e? n=0 n! to find the Maclaurin series for the entire function f(z) = sin(z). 2i Differentiate the Maclaurin series for f(z) = sin(z) term by term to obtain the Maclaurin series for f (z) = cos(z). 5. 6. Derive the Taylor series representation in the disk |z - i|< /2 : 1 (z-i)" Σ n=0 (1-i)"+1 1-z 1 1 Hint: Start by writing 1-z 1 %3D %3D (1- i) - (z - i) 1-i 1-(z-i)/(1- i) 203