Calculus One and Several Variables 10th Ed Textbook + Student Solutions Manual PDF
Preview Calculus One and Several Variables 10th Ed Textbook + Student Solutions Manual
TENTH EDITION CALCULUS ONE VARIABLE JOHN WILEY & SONS, INC. CHAPTER I PRECALCULUS REVIEW 1.1 WhatisCalculus? I 1.2 Review of Elementary Mathematics J 1.3 Review of Inequalities II 1.4 Coordinate I'lane; Analytic Geometry 17 1.5 Functions 24 1.6 The Elementary Functions 32 1.7 Combinations of Functions 41 1.8 A Note on Mnthcmutical Proof; Mathematical Induction 41 CHAPTER 2 LIMITS AND CONTINUITY 53 2.1 The Limit Process (An Intuitive Introduction) S3 2.2 Definition of Limit 64 2.3 Some Limit Theorems 7J 2.4 Continuity 82 2.5 The Pinching Theorem; Trigonometric Limits 91 2.6 T"'O Basic Theorems 97 Project 2.6 The Bisection Method for Finding the Roots of f(x) = 0 1(}2 xv xvi • CONTENTS CHAPTER 3 THE DERIVATIVE; THE PROCESS OF DIFFERENTIATION 105 3.1 The Derivative 105 3.2 Some Ditl'crentimion Formulas 115 3.3 The d/dr Notation; Derivatives of Higher Order 124 3.4 The Derivative As A RateorChange 130 3.5 The Chain I{u[e 133 3.6 Differentiating The Trigonomt:trie runClions 142 3.7 Implicit Difii:rcntiation; Rational Powers 147 CHAPTER 4 THE MEAN-VALUE THEOREM; APPLICATIONS OF THE FIRST AND SECOND DERIVATIVES 154 4.1 The Mean-Value Theorem 154 4.2 Increasing and Decreasing Functions 160 4.3 Local Extreme Values 167 4.4 Endpoint Extrellll! Values; Absolute Extreme Values 174 4.5 Some Max-Min Problems 182 Projeet4.S Flight Paths ofBird~ 190 4.6 Concavily lmd Points of Inflection 190 4.7 Vertical and Horizontal Af.ymptotcs; Vertical Tangents alld Cusps 11)5 4.8 Some Curve Sketching 201 4.9 Velocity and Acceleration; Speed 209 Prujet.:t 4.9A Angular Vdoeity; Unifornl Cin:ular Motion 217 Project 4.98 Energy ofa railing Body (Ncar the Surface of tile Earth) 217 4.10 Related Rates of Change per Unit Time 218 4.11 Differentials 223 Project 4.11 Mar};inal Cost, Marginal ReV'cllue, Marginal Profit 228 4.12 Newton-Raph:>on Approximations 229 CHAPTER 5 INTEGRATION 234 5. I An Area Problem; a Speed·Distance Problem 234 5.2 The Definite Integral ora ContinuoL.!s Function 237 5.3 The Function j(x) = 1~ j(t)dt 246 5.4 The Fundamental Theorem of Integral Calculus 254 5.5 Some Area Problems 260 Project 5.5 Integrability; Integrating Discontinuous Functions 266 5.6 Indefinite Integrals 268 5.7 Working l3ack from the Chain R\lle; the II-Substitution 274 5.8 Additional Properties of the Definite Integral 281 5.9 Mean-Value Theorems for Integrals; Average Value ora Function 285 CONTENTS • xvii CHAPTER 6 SOME APPLICATIONS OF THE INTEGRAL 292 6.1 MoreonArca 292 6.2 Volume by Parallel Cross Sections; Disks and Washers 296 6.3 Volume by the Shell Method 306 6.4 The Centroid ora Region; j'appus's Theorem on Volumes 312 Project 6.4 Cenlmid ofa Solid of Revolution 319 6.5 ThcNotionofWork 319 "6.6 Fluid Force 327 CHAPTER 7 THE TRANSCENDENTAL FUNCTIONS 333 7.1 One-la-One runclil)ns; Jnver~es 333 7.2 The Lognrithm Function, Part r 342 7.3 The LAgarithm Function, Pm1 II 347 7.4 The Exp()ncntial Function 356 Project 7.4 Some RationalOounds for the Number e 364 7.5 Arbitmry Po ..... 'Cf'Sj Other Bases 364 7.6 Exponential Growth and Decay 370 7.7 The Inverse Trigonometric Functions 378 Projccl7.7Refrnction 387 7.8 The Hyperbolic Sine and Cosine 388 '7.9 The Other Hyperbolic Functions 392 CHAPTER 8 TECHNIQUES OF INTEGRATION 398 8.1 jnlegrdl Tables and Review 398 8.2 Intcgnltion by Parts 402 Project 8.2 Sine Wavesy = sinnx and Cosine Wavesy = cosnx 410 8.3 Powers 1l11d Products ofTrigonomelric Functions 411 8.4 Integrals Featuring.J'ii'f=X!, ..rar+:?, ~ 417 8.5 Rational Functions; Partial Fractions 422 '8.6 Somc Rationalizing Substitutions 430 8.7 NUJllericallmegration 433 CHAPTER 9 SOME DIFFERENTIAL EQUATIONS 443 9.1 First-Order Linear Equ31ions 444 9.2 Integral Curves; Scp3r.Ib1c Equations 451 Projecl9.2 Orthogonal Trajectories 458 9.3 The Equation y" + ar' + by = 0 459 'Denotcsoptional !.Celion. r xviii. CONTENTS CHAPTER 10 THE CONIC SECTIONS; POLAR COORDINATES; PARAMETRIC EQUATIONS 469 10.1 Geometry of Parubola. Ellipse, Hyperbola 469 10.2 Polar Coordinates 478 10.3 Sketching Curves in Polar Coordin&les 484 Projttt 10.3 Parabola, Ellip!>e, Hyperbola in Polar Coordinates 491 10.4 Area in PolarCoordinales 492 10.5 Curves Given Parametrically 496 Project 10.5 ParaboHc Trajectories 503 10.6 Tangents to Curves Given Panunctricnlly S03 10.7 Arc Lengtband Speed 509 10.8 The Area of A Surface of Rev oJu ti on; The Centroidofa Curve; Pappus's Theorem on Surface Area 517 Project 10.8 The Cycloid 525 CHAPTER II SEQUENCES; INDETERMINATE FORMS; IMPROPER INTEGRALS 528 11.1 The Least UppcrBound Axiom 521:1 11.2 Sequences or Real Numbers 532 11.3 Limit of a Sequence 538 Project 11.3 Sequences and the Ncwton-Raphson Method 541 11.4 Some Important limitS 550 11.5 The Indetenninate Fonn (0/0) SS4 11.6 The Indetenninate Form (00/00); Other Indeterminate Forms 560 11.7 Improper Integrals 565 CHAPTER 12 INFINITE SERIES 575 12.1 Sigma Norutioll 575 12.2 Infinite Series 577 12.3 The Integral Test; Basic Comparison, Limit CompOlrison 585 12.4 The Root Test; the: Ratio Test 593 12.5 Absolute Convergencc and Conditional Convergence; Alternating Series 597 12.6 Taylor Polynomials in .f; Taylor Series in x 602 12.7 Taylor Polynomials and Taylor Series in;r -a 613 12.8 Power Serics 616 12.9 Differclltiation and Integration of Power Series 623 Project 12.9A The Binomial Serics 633 Project 12.98 Estimating 1l 634 CONTENTS • xix APPENDIX A SOME ADDITIONAL TOPICS A-I A.l Rotation ofAxeR; Eliminating the xy-Term A-I A.2 Determinants A-3 APPENDIX B SOME ADDITIONAL PROOFS A-8 8.1 The Intermediate-Value Theorem A-8 B.2 l3oundcdncss; Extn:me-Valuc Theorem A-9 B.3 Inverses A-\O B.4 The Integrability of Continuous Functions A-ll 8.5 The Integral as the Limit of Riemann Sums A-14 ANSWERS TO ODD-NUMBERED EXERCISES A-15 Index 1-1 Tobie of Integrals Inside Covers TABLES OF INTEGRALS POWERS 1. J~ du=--nu++·C"1. n:;f':""l 2. J-d ;u; = In lui + C EXPONENTIALS AND LOGARITHMS J 3. e"du=e"+C 4. / P"du=i!....+C Inp f f 5. ue"du=ue"-e"+C 6. u2ell du = u2e" - 2ue" + 2e" + C J J 7. u"e" du = u"e" - n Un-leu du 8. !lnudu=Ulnu- u+C J 9. ! (lnU)2du=U(lnu)2-2ulnu+2u+C 10. ulnudu=4u21nu- *u2+C ,[ 1 11. Ju "lnudu=u"+ -11In+-" 1 -(n- +I- If +C 12. / -u dIn"u =inllnul+C ! SINES AND COSfIN ES 13. sinudu = -cosu + C 14. cosudu = sinu + C J f 15. sin2udu= ~u - ~sin211 +C 16. cos2udu= 4u+*sin lu+C f J 17. sinJudu = f cosJu - cosu + C 18. cosJudu = sinu - t sin3,t + C . 19. Jsm"udu=-sin-,,--l,u,-c0-5+11 -nn--Ijf sin .. -2 IIdu 11-1/ 20. / cos" II du = -cos"--I,,u-sin-u + -n- cos"-2 II du J f 21. II sinuciu = -/I casu + sinu + C 22. ucosudu=usinu+cosu+C f J 23. ju"sinudu=-ullcosu+n! u,,-lcosudu 24. u"cosudu=u"sinu- n un-Isinudu 25. s.ml.l/ usmllsinl [lemd -un=)u~] -sin [em~ + n)u] +C,m 2 #n 2 J/ 26 . cosmucosnu d u=sin[~(m- n+)u] ~sin[(m+n)u] + C ,m2 ,# n 2 . cos[(m-n)u] cos[(m+n)u] 2 2 27. / smmucosnudu= 2(m- n) ~+c, 111 ":f:.n f 28. (!"usinbudu= a2:Jil(aSinbu-bCOSbU)+C 29. / ellU cosbudu = -a 'e-+"-" b2 (acosbu + bsinbu) + C I J TANGENTS AND SfEC ANTS 30. lanudu = lnlsecul +C 31. seeudu=lnlsecu+tanul+C f f 32. tan2udu = lanu - u + C 33. seel udll = tanu +C f f 34. seeulanudu=seeu+C 35. tan3udu = 4t an2 u + Inleosul + C J 36. sec3lldll= ~seclltanu+~lnlseeu+tanlll+C n-2/ " 37. / lanl/udll = -lannn---I1I I - / tann-1udu 38. / sec" II dll = -sec"-n- 2-I-11ta n-ll + -n --1 sec -2 u du J CONTANGENTS AND fCO SECANTS 39. cOll/du = In I sinlll + C 40. eseudu = In Icscu - cotul + C ! 42.! 2 4J. co~ u du = -col u - u + C csc udll= -cotu+C 43.! J cscucotudu=-cscu+C 44. eOl31ldu = -~ COl2 II - In Isinul + C f 45. ese3 udu = -4escli COlu + i In Icscll - cmul + C -/eorr- 46. / COt"Udu=_cot"-lu 2udll 11-1 n-2/ 47. / cscnutiu = -C-SCnn- --21-l1C o-tu + -n - -I esc"-2Ildu J HYPERBOLIC FUNfCT IONS 48. sinhudu=eoshu+C 49. coshudu = sinhu + C J J 50. tanh u du = In (cosh u) + C 51. cothudu = In I sinh III + C J ! 52. scchudu = arctan(sinhu)+C 53. cschudll = In I tanh 4111+ C J J 54. scch2udu = tanh II + C 55. csch 2udu = -cath 1/ + C J f 56. sech u tanh II du = -scch II + C 57. csehueoliludll=-cschll+C f f 58. sinhl udu = ~sinh2u - 4" + C 59. cosh2udll= ~sinh2u + 4u +C f f 60. lanh2II du = u - Ianhu + C 61. eoth2udu=u-cothu+C f f 62. usinhudu =ucoshu - sinhu + C 63. u coshudu = usinhu - coshu + C (rabiecofilinued<JIlhehadr;) (continued/rom/herronl) f INVERSE TRIGONOMETRICf FUNCTIONS 64. arcsinudll=lIarcsinu+~+C 65. arccosudu=lIarccosu -~+C f f 66. arctanu du = u arctanu - 4 In(1 + u2) + C 67. arccotu du = u arccotu + 41n(1 + u2) + C f f 68. arcsecudu = uarcsecu -Inlu +~I +C 69. arccscudu= uarccscu+lnlu+~1 +C f f 70. u arcsinudu = ~[(2u2-I)arcsinu + u~ + C] 71. uarctanlldu = 4(u2 + l)arctanu - 4u + C f 72. lIarccosudu = ~[(2U2 - 1) arccos u - u~ + c] J 73. Ju narCSinlldu=- I - [ un+1arCS.l TIU- ~u"+d' u ] ,n#--i n+1 v1- u2 J 74. Ju " arccosu du = - I - [ un+1 arccosu + "-u--"-+---'- --.,, du ] ,n #--I n+l vl-u2 J 1 75. Ju narctanudun= +1- -1 [ u,,+larctanu- -1u +"+-u' 2du ,n#--l ~,a>O 76. J-a 2d+u- u2 = -a1 arctan -au + C 77. f .ja~:u2 =In(u+Ja2+u2)+C f 78. ..,Ja2 +u2du = ~.Ja2 +u2 + ~In(u +.Ja2 +u2) +C 79.! 1I2Ja2+u2du= 80. J-.J-a2u+-ud2 u=.Ja2+u2- aln la+-..-/au-2+-u21+ C 81. J-~u-,- du=-,/-a2-u+-u' +1n ( u+v~a2+)u2 +C 82. J ~u=2d-u. .,Ju 02+u2-a-2 1n ( u+.Ja2+u2 ) +C v02+u2 2 2 83 . J -u-du~- _ _ --a1 In l-a+-~u- -1 + C· 84. J -u2../-ad2u + - u2 ~ -.J-aa2- 2+u -u2 + C 85. J (-a2 +-d uu 2-)3/2~ a-2../-0 121 +- u2 +C ~,a>O 86. J- d-u - = arcsin -u + c 87. J /a2 -u2du = Zu .Ja2 _u2 + a22a rcsin~u + C ../a2 _ u2 a 88. Ju 2.Ja2 - u2 du = _u8 ( 2u2 - (2))02 - u2 + -a84 arcsin -au + C 89. j-~-,,- dl/= ..r;;0--2----u-2, -0In /-a+v-'a,, _'-_"'/ +C 90. j-~-I12 - dll= --IlIv r=a;-2- _--1-1:2; -arcst.n1-1a + C 91. j -~/l-2du- = --U2v ra=2;- _--1-1-:2; + -02a2 rcsinaI-I +C du r;------, 92. j u./02_U2 =-;1; In /-a-+u~-/- +C 93. j --d-" =--1v a2-u2+C u2~ a1u 95. j -(a2 -_d l1-l/ 2)3=/2 -a2.-jaI2I- _+112 C 96. j -02 d--u u=l -210 In la-a +--"II1 +C Ju2_a2, u >0 97. j 11./11t2il l_ 02 = -;I:; arcsec -lu;;i + C 98. j-~-- dll = 'l/rU=2;- _---0-:2; - aarcsec-II + C f " a 99. Ju2 -a1du = ~ju2 _ 02 - ~ln)u +/112 - a2) +C j ~ -I,,' _a' I r;------,I 101. -,-,,-dU=---,,-+ln u+..;u2_02 +C I r;------,I 102. j -JI1l1-22 d_l-l0 2 = -2/IV 1r=l2;- _---0-:2; + 0-22 In II + "u2 _02 +C j 103. j -",-.;-,d,-u, - -a' = -./1a12- '-,, -0-2 + C 104. -u(-,- d-au' -)'-/' = -a-'-';"-u- '- -a-' + C l05.j(~u2_a2)3/2 --~~+ 1 n II I +~II Ia +C a + bu,...;a+bii j udu I 106. a+bu =/J.(a+bu- aln1a+bul)+C 107. j ou+2bdull = W1[ (a+bu) 2 - 4a(a+bu)+2a21nla+bul]+C 108.ju~(a=+b.u)! .a lnla-+"b_u I+C 109. j -u2(-a d+-u b=ll) --a+1u -ab2 I n l-a+/Ib- "l +C I1l1l0.. jj -((aau+u~-'ddbbUuuu- r) ~' == -ObIJ' ((aaQ+ +bbuu) +-pa-I- +alnb' -1ua- +2baull+nlCa+ bulI )l l+. Cj -u(a- d+u - bul=l a-(a -+1 b-ll) --a12 In l-a+II- bul +C j 113. j ,,~0u= -d-u-b u- -;3(2tbr u-,2-a)-",,a,+b-u+C 114. uvra-+:-b;l-ldu=I~S2(b 3bu-2a)(a+buiI2+C
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