UNIVERSITY OF CALICUT SCHOOL OF DISTANCE EDUCATION

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1 School Of Distce Eductio Questio Bk UNIVERSITY OF ALIUT SHOOL OF DISTANE EDUATION B.Sc MATHEMATIS (ORE OURSE SIXTH SEMESTER ( Admissio OMPLEX ANALYSIS Module- I ( A lytic fuctio with costt modulus is : A ero B costt idetity mp D Noe of these. ( Rel prt of f ( log A log( x y B log( x y log( x iy D Noe of these ( If is positive iteger, the ( i ( i is equl to : A si B cos si D Noe of these. (4 Vlue of ( i ( i equls: A i B i D Noe of these. (5 Rel prt of f ( A x xy B x xy x x y D Noe of these (6 If f ( ( x y xy i( bx y xy is lytic, the vlue of d b is : A -, B, -, D Noe of these (7 If G is ope set i complex ple d f : G is differetible, the o G, f A Alytic B ot lytic Discotiuous D bouded (8 Vlue of i 4 A i 4 B 4 4 D Noe of these e (9 For y complex umber, if: A Re B Re Im D Noe of these omplex Alysis Pge e

2 School Of Distce Eductio i ( For y complex umber, e equls: A e i B e e D Noe of these ( For y rel umber, i i e e i i i e e A cot B t cos ec D Noe of these ( If S d T re domis i the complex ple, which of the followig eed NOT be true? A S T is domi if S T B S T is ope set S T is ope set D S T is domi ( The derivtive of f ( t i A 99 is : B D Noe of these (4 If f ( is rel vlued lytic fuctio i domi D, the : A f ( is costt B f ( is ideticlly ero f ( hs modulus D Noe of these (5 If v is hrmoic cojugte for u, the hrmoic cojugte for v A u B -u i u D Noe of these (6 If f( is lytic d o ero i domi D, the i D, l f ( A Alytic B costt ero D hrmoic (7 The fuctio i e hs period: A i B D (8 For rel umbers x d y, si( x iy equls : A Sixoshy i cos xsihy B osxoshy isixsihy Sixoshy i cos xsihy D osxoshy isixsihy (9 The fuctio Log is lytic t: A ll poits i the complex ple B ll o ero complex umbers ll complex umbers except tht o the o positive rel xis D ll complex umbers except tht o the o positive imgiry xis ( Let G be regio ot cotiig. Which of the followig fuctios is NOT hrmoic i G? A x y B x y x y D log( x y. ( Which of the followig is ot hrmoic? A u x( y B u xy y y u x y x y y D Noe of these 99 omplex Alysis Pge

3 School Of Distce Eductio ( If v is the imgiry prt of lytic fuctio f, lytic fuctio with rel prt v is give by: A f B f if D if ( Vlue of the limit lim equls: A B - D Not exists (4 Rel prt of the fuctio f ( equls: A xy B x y x y D Noe of these (5 For y complex umber, exp( i equls: A exp( B exp( D Noe of these exp( Module II ( A rc ( t ; t b is simple if : A ( t is cotiuous B ( t is oe to oe fuctio ( t is such tht ( = ( b D Noe of these ( Which of the followig is ot simply coected regio? A circulr disk B hlf ples ulus regio D prllel strip ( Which of the followig subset of is simply coected regio? A ; B ; 4 ; ; D (4 Let be y circle eclosig the origi d orieted couter clockwise. The the vlue of the itegrl cos d is : A i B - i D udefied (5 The itegrl Si d ( where the curve is tke ti-clockwise, equls : A -πi. B πi.. D 4πi. (6 The vlue of the itegrl d (, where is - = is : A B i i D Noe of these (7 The oly bouded etire fuctios re: A Rel vlued fuctios B hrmoic fuctios ostt fuctios D Expoetil fuctio omplex Alysis Pge

4 School Of Distce Eductio (8 Suppose f ( is lytic iside d o uit circle. If f (, with. The upper boud for f ( is : A! B! D Noe of these (9 The itegrl d roud closed curve cotiig - but ot, hs the vlue : A i B i D Noe of these ( The vlue of the itegrl 5 e d, where is = is : A i B i 5 i D Noe of these ( Vlue of the itegrl e i t dt A i B i D Noe of these ( Vlue of d where is ; A i B 6 i D i ( If is y o ero iteger, the e i d equls : A B D Noe of these (4 The vlue of the itegrl d evluted d the semi circle ; rg strtig t i B i A - D Noe of these (5 overse of uchy s itegrl theorem is kow s: A Liouville s theorem B Gourst s theorem Morer s theorem D Euler s theorem. (6 The vlue of the itegrl cos d is : i A B / D -/ (7 The prmetric equtio of the semi circle of rdius with ceter t, lyig i the upper hlf ple from the poit to - A t e t i t ( ; t B ( t e ; t i t i t ( t e ; t D ( t e ; t. e (8 The itegrl d 9 hs o ero vlue if is : A B D 4 omplex Alysis Pge 4

5 School Of Distce Eductio (9 If f is cotiuous i domi D d if f ( d for every simple closed positively orieted cotour i D, the: A f is costt i D B f is lytic i D f is rel vlued i D D f is purely imgiry i D ( If f is lytic withi d o simple closed, positively orieted cotour d if is poit f ( iterior to, the ( d equls : c i A f (! i f (! B f ( i i D f ( (! Module III ( A Mcluri series is Tylor series with cetre A = B = = D Noe of these ( Let f be lytic fuctio d let f ( ( A f ( (! ( be its Tylor series i some disc. The: B f ( f ( (! D f ( The rdius of covergece of the power series of the fuctio f( = A B¼ ¾ D (4 The coefficiet of / i the Luret series expsio of (5 If f ( f ( A B ½ D 4 is etire, the A f ( (! ( ( ( hs rdius of covergece: B e D Noe of these ( (! bout = /4 is : i the regio < < is : (6 A power series ( lwys coverges for: A t lest oe poit. B ll complex umbers t ll which re either rel or purely imgiry D t ll with R for some R >. (7 If f ( dmits Luret series expsio j j ( j i ulus regio. The j is give by: f ( j! f ( A d j i B d i j i f ( d j j! D Noe of these omplex Alysis Pge 5

6 School Of Distce Eductio (8 If f ( ( is represeted s the Luret series, the is removble sigulrity of f ( if: A, for > B, for <, for D, for (9 A fuctio f ( give by power series is lytic t : A Every poit of its domi B every poit iside its circle of covergece every poit o its circle of covergece D every poit i the complex ple ( The Tylor series expsio of f ( e i the regio A B!!! D Noe of these ( The sigulr poits of the fuctio f ( 4 re: A d 4 B d 4 4 d 4 D d ( The sigulr poits of the fuctio ( e f ( tht lies iside i re : A d i B d i i d i D d ( The costt term i the Luret series expsio of e f ( i the regio < < is : A B D Noe of these (4 The Luret series expsio of f ( e i the regio A B!! D Noe of these! (5 The power series b b b... coverges: A iside of some circle R B o the circle o some circle R D outside of some circle R omplex Alysis Pge 6

7 School Of Distce Eductio Module- IV ( The residue of t A B - D. Si x ( Vlue of dx x. A is : B D ( If f ( hs ero of order m t d g ( hs pole of order t d m, the the product f ( g ( hs t : A A essetil sigulrity B pole of order m - A removble sigulrity D pole of order m -. (4 If f ( hs pole of order m t / f (, the g (, t f ( hs: A simple pole B pole of order m pole of order m + D pole of order m -. (5 If f ( hs pole of order m t, the t, hs : f ( A A removble sigulrity B essetil sigulrity A pole of order m D oe of these (6 Zeros of Si ( re : A ; Z B ; Z ; Z D. (7 For t f (, is : A Essetil sigulrity B simple pole Removble sigulrity D double pole (8 If f ( hs pole of order m t, the f ( hs pole of order.. t : A m B m m D m + (9 Which of the followig fuctio hs simple ero t d essetil sigulrity? A e B e ( e D ( e ( If f ( ( is represeted s the Luret series, the is removble sigulrity of f ( if: A, for > B, for <, for D, for ( The fuctio Si f ( ( - t = hs : A pole of order 4 B pole of order pole of order D essetil sigulrity omplex Alysis Pge 7

8 School Of Distce Eductio ( If rtiol fuctio hs pole of order m t, the its derivtive hs pole of order t A m - B m + m D m ( Residue of 4 9 f ( t A 64 (4 The fuctio 6 5 i f ( t i hs: i i B D Noe of these A Regulr poit B Simple pole double pole D removble sigulrity (5 Sigulrities of rtiol fuctio re: A poles B essetil o isolted D removble (6 If e f (, the t, f( hs: e A Isolted sigulrity B o-isolted sigulrity Pole D ero (7 If fuctio f( hs isolted sigulrity t =, the it is removble sigulrity if : A lim( f ( B lim( f ( lim f ( D lim f ( si (8 The sigulrity of the fuctio (9 Residue of t = is : A Essetil sigulrity B simple pole Removble sigulrity D double pole m A ( ( m! ( m!(! ( m! ( m!(!, m d re turl umbers t = is : B D ( m! m!! ( m! m!! ( At =, the residue of f ( ( A - B D ( The residue of f ( ( t is : A - 5 B D Noe of these ( The fuctio f( = / t (, t = hs : A isolted sigulrity B o- isolted sigulrity simple pole D Noe of these omplex Alysis Pge 8

9 School Of Distce Eductio ( The ero of first order is kow s A omplex ero B Simple ero Sigulrity D Noe of these (4 The poles of the fuctio f( = si / cos re t A (+ π\, y iteger B π \ ; y iteger π, y iteger D Noe of these (5 For the fuctio is : f ( e, the poit A removble sigulrity B simple pole essetil sigulrity D Noe of these SHOOL OF DISTANE EDUATION - UNIVERSITY OF ALIUT B.Sc DEGREE PROGRAMME MATHEMATIS (ORE OURSE SIXTH SEMESTER - MM6B - OMPLEX ANALYSIS Aswer Key Module I. B. A. B A 6. A 7. A B.. B. D. B 4. A 5. B 6. D 7. B 8. A 9.. B. B. D. D A Module II. B.. D 4. B 5. A 6. A A 9. A.. A.. A D 7. A 8. D 9. B. A Module III. B.. 4. A A 7. A 8. B 9. B. A. B. B. B D Module IV.. A. 4. A 5. A 6. B A. B.. B. D 4. B 5. A 6. B 7. B D. D. B. B 4. A 5. omplex Alysis Pge 9

UNIVERSITY OF CALICUT SCHOOL OF DISTANCE EDUCATION. (2014 Admn. onwards) III Semester. B.Sc. Mathematics CORE COURSE CALCULUS AND ANALYTICAL GEOMETRY

UNIVERSITY OF CALICUT SCHOOL OF DISTANCE EDUCATION (0 Adm. owrds) III Semester B.Sc. Mthemtics CORE COURSE CALCULUS AND ANALYTICAL GEOMETRY Questio Bk & Aswer Key. l l () =... 0.00 b) 0 c). l d =... c