TY - BOOK AU - Sastry, S.S. TI - Engineering mathematics SN - 9788120341005 U1 - 510.2462 PY - 2010/// CY - New Delhi PB - PHI Learning Private Limited KW - Engineering mathematics N1 - 1. Differentiation (Review) 3-11 1.1 Differential Coefficient 3 1.2 Formulae for Differentiation 3 1.2.1 Other Useful Formulae 4 Exercise 1.1 10 2. Successive Differentiation 12-23 2.1 Higher Derivatives of Functions 12 Exercise 2.1 16 2.2 Leibnitz's Theorem 17 Exercise 2.2 22 3. Partial Differentiation 24-40 3.1 Introduction 24 3.1.1 Partial Derivatives 24 3.1.2 Geometrical Interpretation of dzJ^x and dzl^y 26 3.1.3 Partial Derivatives of Higher Orders 27 Exercise 3.1 30 iii iv Contents 3.2 Homogeneous Functions 31 3.2.1 Euler's Theorem 32 3.2.2 Deductions from Euler's Theorem 33 Exercise 3.2 38 4. Total Differentiation 41-58 4.1 Total Differential Coefficient 41 4.1.1 Important Deductions 42 Exercise 4.1 51 4.2 Change of Variables 52 4.2.1 Change of Independent Variable to the Dependent Variable 53 4.2.2 Change to Another Variable 53 4.2.3 Change of Both Dependent and Independent Variables 54 4.2.4 Change of Two Independent Variables 54 Exercise 4.2 57 5. Expansion of Functions of Several Variables 59-66 5.1 Taylor's Series 59 Exercise 5.1 65 6. Curve Tracing 67-87 6.1 Introduction 67 6.1.1 Definitions 67 6.1.2 Asymptotes of a Curve 69 6.1.3 Tracing of Cartesian Curves 71 6.1.4 Sketches of Some Important Curves 75 Exercise 6.1 76 6.2 Tracing of Polar Curves 76 6.2.1 Sketches of Some Important Polar Curves 81 Exercise 6.2 81 6.3 Tracing of Curves Given in Parametric Form 81 Unit n Differential Calculus H 7. Jacobians 91-101 7.1 Definition 91 7.1.1 Properties of Jacobians 92 7.1.2 Jacobians of Implicit Functions 97 Exercise 7.1 100 8. Approximation of Errors 102-109 8.1 Differentials 102 8.1.1 Definitions 103 Exercise 8.1 108 9. Extrema of Functions of Several Variables 110-124 9.1 Maxima and Minima 110 9.1.1 Criteria for Maxima or Minima 110 Exercise 9.1 117 9.2 Lagrange's Method of Undetermined Multipliers 118 Exercise 9.2 123 Unit III Matrices 10. Algebra of Matrices 127-189 10.1 Introduction 127 10.1.1 Basic Definitions 127 10.1.2 Matrix Operations 129 10.1.3 Determinants 132 10.1.4 Transpose, Adjoint and Inverse of a Matrix 134 10.1.5 Some Special Matrices 138 Exercise 10.1 143 10.2 Elementary Transformations 145 10.2.1 Elementary Matrices 145 10.2.2 Rank of the Matrix 146 Exercise 10.2 152 10.3 Linear Dependence and Linear Independence of Vectors 153 Exercise 10.3 155 10.4 Solution of a System of Linear Equations 156 10.4.1 Consistency of a Nonhomogenous Linear System 156 10.4.2 Solution of Homogeneous Systems 160 10.4.3 Solution of AX = 5 when Ais Nonsingular 162 Exercise 10.4 165 10.5 Eigenvalues and Eigenvectors of Matrices 166 10.5.1 Eigenvalues of Some Important Matrices * 167 10.5.2 Properties of Eigenvalues and Eigenvectors 174 10.5.3 Cayley-Hamilton Theorem 177 10.5.4 Diagonalization of a Matrix 179 Contents V 10.5.5 Diagonalization by Orthogonal Transformation 183 Exercise 10.5 186 Unit IV Multiple Integrals 11. Double Integration 193-215 11.1 Double Integral 193 11.1.1 Evaluation of a Double Integral 194 11.1.2 Change of Order of Integration 199 vi Contents 11.1.3 Double Integral in Polar Coordinates 205 Exercise 11.1 208 11.2 Applications of Double Integrals 209 11.2.1 Moments and Centroid of Area 210 11.2.2 Moments of Inertia 210 11.2.3 Volume of a Solid of Revolution 212 11.2.4 Volume of a Solid as a Double Integral 212 Exercise 11.2 214 12. Triple Integrals 216-231 12.1 Volume as a Triple Integral 216 12.1.1 Cylindrical Coordinates 220 12.1.2 Spherical Polar Coordinates 221 12.1.3 Applications of Triple Integrals 222 12.1.4 Change of Variables 225 Exercise 12.1 229 13. Beta and Gamma Functions Ihl-IAl 13.1 Introduction 252 13.1.1 A Formula for r(n) 233 13.1.2 Transformations of Gamma Function 235 13.1.3 Transformations of Beta Function 236 13.1.4 Relation between Beta and Ganrmia Functions 237 13.1.5 Deductions 239 Exercise 13.1 246 Unit V Vector Calculus ' 14. Vector Differential Calculus 251-278 14.1 Introduction 251 14,1.1 Scalar and Vector Fields 251 •14.1.2 Derivatives of Vectors 251 14.1.3 The Directional Derivative 255 Exercise 14.1 261 14.2 Divergence and Curl of a Vector Point Function 263 14.2.1 Divergence of a Vector Point Function 263 14.2.2 The Curl of a Vector 267 14.2.3 Second-Order Expressions 272 Exercise 14.2 275 15. Vector Integration 279-304 15.1 Introduction 279 15.1.1 Line Integrals 279 15.1.2 Surface and Volume Integrals 284 . Exercise 15.1 287 15.2 Integral Theorems 289 15.2.1 Green's Theorem for a Plane 289 15.2.2 Stoke's Theorem 292 15.2.3 Divergence Theorem of Gauss 296 Exercise 15.2 301 UPTU Examination Paper 305-307 PART II (SECOND SEMESTER) Unit I Differential Equations 1. Differential Equations (Revision) 311-324 1.1 Introduction 311 1.1.1 Variables Separable 311 1.1.2 Exact Differential Equations 313 1.1.3 Homogeneous Equations 314 1.1.4 First-Order Linear Differential Equations 316 1.1.5 Bernoulli's Differential Equation 318 1.2 Differential Equations of First Order and Higher Degree 319 Exercise 1.1 322 2. Linear Differential Equations 325-370 2.1 Differential Equations of Higher Order 325 2.1.1 Homogeneous Linear Equations 327 2.1.2 Nonhomogeneous Linear Differential Equations 331 2.1.3 Method of Variation of Parameters 332 2.1.4 The Operator Method for Particular Integrals 336 Exercise 2.1 344 2.2 Simultaneous Linear Differential Equations 345 Exercise 2.2 350 2.3 Solution of Certain Types of Differential Equations 351 Exercise 2.3 358 2.4 Linear Equations with Variable Coefficients 359 2.4.1 Change of Independent Variable 359 2.4.2 Method of Variation of Parameters 363 Exercise 2.4 367 3. Applications of Differential Equations 371-402 3.1 Introduction 371 3.1.1 Electrical Circuits 371 3.1.2 Motion under Gravity 380 3.1.3 Elastic Strings 384 Contents Vii viii Contents 3.1.4 Vibration of a Particle 3.1.5 Elastic Curves 391 3.1.6 Motion of a Particle in a Plane 397 Exercise 3.1 399 Unit II Series Solutions and Special Functions 4. Solution in Series of Differential Equations 405-420 4.1 Ordinary Points of a Differential Equation 405 4.1.1 Solution of Differential Equations with Ordinary Points 405 4.2 Singular Points of a Differential Equation 408 4.2.1 Roots Distinct and do not Differ by an Integer 408 4.2.2 The Roots C| and C2 are Equal 412 4.2.3 Roots Distinct and Differ by an Integer 416 Exercise 4.1 419 5. Bessel Functions 421-440 5.1 Introduction 421 5.2 Bessel's Differential Equation and Bessel Functions 421 5.3 Recurrence Formulae for y„(jc) 426 5.4 Generating Function for Jn{x) 430 5.5 Integral Relations Involving Bessel Functions 435 5.6 Bessel Functions of the Second Kind 435 Exercise 5.1 439 6. Legendre Polynomials 441-460 6.1 Legendre's Equation and Its Solutions 441 6.1.1 Solution of Legendre's Equation 441 6.2 Rodrigue's Formula 444 6.3 Generating Function 447 6.4 Orthogonal Properties 448 6.5 Recurrence Formulae 452 6.6 Legendre's Polynomials as Integrals 454 Exercise 6.1 458 Unit III Laplace Transforms 7. Laplace Transforms 463-509 7.1 Introduction 463 7.1.1 Definition and Conditions for Existence 463 7.1.2 Laplace Transforms of Some Elenientary Functions 465 7.1.3 Table of Laplace Transforms 470 7.1.4 Properties of Laplace Transforms 470 7.1.5 Transforms of Derivatives 484 Exercise 7.1 486 7.2 The Inverse Laplace Transform 487 1.2.1 Definition and Uniqueness 487 7.2.2 Properties of Inverse Transforms 489 7.2.3 Use of Partial Fractions 496 Exercise 7.2 499 7.3 Applications to Differential Equations 500 7.3.1 Linear Differential Equations with Constant Coefficients 500 7.3.2 Linear Differential Equations with Variable Coefficients 503 7.3.3 Simultaneous Differential Equations 504 Exercise 7.3 506 Unit IV Fourier Series and Partial Differential Equations 8. Fourier Series 513-556 9. 8.1 Introduction 513 8.1.1 Definitions and Derivations 513 8.1.2 Odd and Even Functions 523 Exercise 8.1 530 8.2 Half-Range Series from 0 to ;r 531 Exercise 8.2 535 8.3 Change of Scale 536 8.3.1 Parseval's Equalities 542 Exercise 8.3 548 8.4 Numerical Harmonic Analysis 550 Exercise 8.4 552 Contents ix Partial Differential Equations 557-586 9.1 Introduction 557 9.1.1 Formation of Partial Differential Equations 559 9.1.2 Solution of a Partial Differential Equation 562 Exercise 9.1 564 9.2 Partial Differential Equations of the First Order 565 9.2.1 Solutions of Some Standard Types 565 9.2.2 Lagrange's Linear Equation 570 Exercise 9.2 575 9.3 Nonlinear First-Order Partial Differential Equations 576 9.3.1 Some Standard Types 576 9.3.2 Charpit's Method 580 Exercise 9.3 585 X Contents 10. Partial Differential Equations of the Second Order 587-608 10.1 Introduction 587 10.1.1 Classification of Second-Order Linear Equations 587 10.1.2 Homogeneous Linear Partial Differential Equations 589 10.1.3 Linear Non-homogeneous Equations 591 Exercise 10.1 592 10.2 Evaluation of Particular Integrals 593 10.2.1 Method of Separation of Variables 603 Exercise 10.2 606 Unit V Applications of Partial Differential Equations 11. Initial Boundary-Value Problems 611-639 11.1 Introduction 611 11.1.1 One-Dimensional Wave Equation (Vibrations of a String) 611 11.1.2 One-Dimensional Heat Flow 620 11.1.3 Two-Dimensional Heat Flow 626 11.1.4 Laplace's Equation in Polar Coordinates 632 11.1.5 Equations of Transmission Lines 634 ER -