5. Give examples of two series am and b, such that: . མཁལ ཚབ་མ 0 <...
A) B) C) 1 Find the Laurent series for 22 +22 for 0 < 121 < 2 Find the Laurent series for (z+2)}(3-2) for 2 – 3) > 5 1 Find the Laurent series for z2(z-i) for 1 < 12 – 11 < V2
Given an angle 0° s < 360°, a. If I calculate sin (), am I calculating an angle or a ratio of sides? b. Explain, using the legs and hypotenuse of a right triangle, why sin(e) can never be greater than 1.
a < 1. Show the series on -a, a] to onverges uniformly 25.9 (a) Let 0 (b) Does the series Explain converge uniformly on (-1,1) to =0
Problem 2.1. Thinking about differentiating Taylor series, compute the sum n=0 for any z < 4.
The Fourier series of f(x) = x-1, 0<x<1 x + 1, -1 <x<0 is a Fourier sine series. True . False
determine the fourier series if -2 Sto f(3) = { 1 + x2 if 0<<<2 f(x + 4) = f(x) - 5={17
Solve sin’(x) + sin(x) = 0 for 0 SI<2m. Give your answer in radians.
Solve sin(20) NIE for 0 <o<2m. Give your answer in radians.
Find the fourier series و = (x) 1, 18, - 7<<0 0 << ;}
12. (8 points) Solve (sin 0)2 = 5.0 5 0 < 2t.