evaluate the following integrals. delvelop h(z)= z/((z+1)(z-1)) into a laurent series, in the followinf domains. 7)...
evaluate the following integrals. please show procedure. Develop g(z)= 1/(z-1)(z-2) into a laurent series that is valid for the following anular domains. 4) 23. 01/22 dz Y a) r=1121=5), bydle-il-24 Sol: Ti r = {12-21 = 2 3 4 Sol: Ti 1 5) S dz 23(2-1) 4 r 6) J ze² z ²-1 dz 8=2 Izl=2) Sol: 2li cash (1) Y 9) 0시레시 (o) 0 12-2[J.
Evaluate each of the following integrals Z 2z Je cos dz i. 4/ (Xcos (4x)dx 2 ii. t'sin 2t dt ii Sy°cos 3ydy iv. 14x3-9х*+7х+3)е*dx- 2 V.
please answer its urgent. develop f(z)=(z(z-3)) into a laurent serkes valid for the following domains develop g(z)= 1/((z-1)(z-2)) into a laurent series valid for the following domains develop h(z)= z/((z+1)(z-2)) into a laurent series valid for the following domains 7) 0 < 1 2 -3/ <3 6) 1८11-4/<4 9) 0시레시 10) 0<l2-2시 ) ۵ < ( 2 + ( ( 3 (2) 02 ( 2 -2) 3.
Develop f(z)=1/(z(z-3)) in a laurent series valid for the indicated domains. determine the nature of the singularities of the following functions. 0시리 <3 6) 3<시리 22 13) f(3) = -1 14) FCZ) = sen (42) - 42 Z 22
Solve: Laurent series h(z) - Z O CIZ + 11 <3 (2+1)(2-2)
U Question 15 "C 7 pts "С If S is the surface of the cylinder E= {(x,y,z) : 32 + y < 4,1523}, oriented outwards, which of the following (after applying the Divergence Theorem) will compute zyz) - dS? 40 O (1 + y2 cos & sin 6)r dr de dz REC O 1988 6%" /*(1 + == sin ®)r dr do dz %%% %%% %%% (r cos 0 + 32 + y2 z cos ( sin 0), dr do...
Evaluate the following integrals (from A to E) A. Integration by parts i) ſ (3+ ++2) sin(2t) dt ii) Z dz un (ricos x?cos 4x dx wja iv) (2 + 5x)eš dr. B. Involving Trigonometric functions 271 п i) | sin? ({x)cos*(xx) dx ii) Sco -> (=w) sins (įw) iii) sec iv) ſ tan” (63)sec^® (6x) dx . sec" (3y)tan?(3y)dy C. Involving Partial fractions 4 z? + 2z + 3 1) $77 dx 10 S2-6922+4) dz x2 + 5x -...
Laurent series the following function open the Laurent series in 1<|z+1|<3 1. Aşagıdaki fonksiyonu 1 <1: +11 < 3 bölgesinde Laurent SC 223-2)
exercise 4 please 1. Expand the function in a Laurent series that converges for 0 < [z] <R and determine the precise region of convergence. Show details. a. zz-1) (10%) 72-73 (10%) ez b. 2. Determine the location and order of the zeros. a. sin 2 (10%) b. coshºz (10%) 3. Residue integration a. Dedz,c: [2] = a (15%) b. $ 273dz,c: [2] => (15%) 4. Evaluate the following integrals. Show details. a. Lorem (15%) b. Lo**ay (15%)
evaluate the following integrals in the given regions. 5) S 37 + 1 2(2-2)2 dz r 2 6)S piz (z²+1)? dz I Y