• Cover (1)
• Preface (6)
• Acknowledgement (7)
• Contents (12)
• Unit-l.Differential Calculus—I (18)
  • 1.1 Introduction (18)
  • 1.2 Radius of Curvature (18)
    • 1.2.1 Radius of Curvature in Cartesian Form (19)
    • 1.2.2 Radius of Curvature in Parametric Form (20)
      • Worked Out Examples (21)
      • Exercise 1.1 (35)
    • 1.2.3 Radius of Curvature in Pedal Form (36)
    • 1.2.4 Radius of Curvature in Polar Form (36)
      • Worked Out Examples (38)
      • Exercise 1.2 (43)
  • 1.3 Some Fundamental Theorem (44)
    • 1.3.1 Rolle’s Theorem (44)
    • 1.3.2 Lagrange’s Mean Value Theorem (44)
    • 1.3.3 Cauchy’s Mean Value Theorem (45)
    • 1.3.4 Taylor’s Theorem (46)
    • Worked Out Examples (47)
    • Exercise 1.3 (67)
    • Additional Problems (From Previous Years VTU Exams.) (69)
    • Objective Questions (74)
• Unit-ll Differential Calculus–II (78)
  • 2.1 Indeterminate Forms (78)
    • 2.1.1 Indeterminate Form 0/0 (78)
      • Wroked Out Examples (79)
      • Exercise 2.1 (85)
    • 2.1.2 Indeterminate Forms ∞ – ∞ and 0 × ∞ (86)
      • Worked Out Examples (86)
      • Exercises 2.2 (91)
    • 2.1.3 Indeterminate Forms 00, 1∞, ∞0, 0∞ (91)
      • Worked Out Examples (91)
      • Exercise 2.3 (94)
  • 2.2 Taylor’s Theorem for Functions of two Variables (95)
    • Worked Out Examples (95)
    • Exercise 2.4 (99)
  • 2.3 Maxima and Minima of Functions of two Variables (100)
    • 2.3.1 Necessary and Sufficient Conditions for Maxima and Minima (100)
    • Worked Out Examples (101)
    • Exercise 2.5 (106)
  • 2.4 Lagrange’s Method of Undetermined Multipliers (106)
    • Working Rules (107)
    • Worked Out Examples (108)
    • Exercise 2.6 (111)
    • Additional Problems (From Previous Years VTU Exams.) (111)
    • Objective Questions (118)
• Unit-lll Integral Calculus (122)
  • 3.1 Introduction (122)
  • 3.2 Multiple Integrals (122)
  • 3.3 Double Integrals (122)
    • Worked Out Examples (123)
    • Exercise 3.1 (129)
    • 3.3.1 Evaluation of a Double Integral by Changing the Order of Integration (130)
    • 3.3.2 Evaluation of a Double Integral by Change of Variables (130)
    • 3.3.3 Applications to Area and Volume (130)
    • Worked Out Examples (131)
    • Type 1. Evaluation over a given region (131)
    • Type 2. Evaluation of a double integral by changing the order of integration (136)
    • Type 3. Evaluation by changing into polars (139)
    • Type 4. Applications of double and triple integrals (141)
    • Exercise 3.2 (145)
  • 3.4 Beta and Gama Functions (146)
    • 3.4.1 Definitions (146)
    • 3.4.2 Properties of Beta and Gamma Functions (146)
    • 3.4.3 Relationship between Beta and Gamma functions (150)
    • Worked Out Examples (152)
    • Exercise 3.3 (173)
    • Additional Problems (From Previous Years VTU Exams) (176)
    • Objective Questions (179)
• Unit-lV Vector Integration and Orthogonal Curvilinear Coordinates (183)
  • 4.1 Introduction (183)
  • 4.2 Vector Integration (183)
    • 4.2.1 Vector Line Integral (183)
    • Worked Out Examples (183)
    • Exercise 4.1 (189)
  • 4.3 Integral Theorem (190)
    • 4.3.1 Green’s Theorem in a Plane (190)
    • 4.3.2 Surface integral and Volume integral (190)
    • 4.3.3 Stoke’s Theorem (191)
    • 4.3.4 Gauss Divergence Theorem (191)
    • Worked Out Examples (191)
    • Exercise 4.2 (205)
  • 4.4 Orthogonal Curvilinear Coordinates (206)
    • 4.4.1 Definition (206)
    • 4.4.2 Unit Tangent and Unit Normal Vectors (206)
    • 4.4.3 The Differential Operators (208)
    • Worked Out Examples (209)
    • Exercise 4.3 (211)
    • 4.4.4. Divergence of a Vector (211)
    • Worked Out Examples (212)
    • Exercise 4.4 (213)
    • 4.4.5 Curl of a Vector (213)
    • Worked Out Examples (214)
    • Exercise 4.5 (215)
    • 4.4.6. Expression for Laplacian ∇2 ψ (216)
    • 4.4.7. Particular Coordinate System (216)
    • Worked Out Examples (220)
    • Exercise 4.6 (225)
    • Additional Problems (225)
    • Objective Questions (227)
• Unit-V Differential Equations-I (231)
  • 5.1 Introduction (231)
  • 5.2 Linear Differential Equations of Second and Higher Order with Constant Coefficients (231)
  • 5.3 Solution of a Homogeneous Second Order Linear Differential Equation (232)
    • Worked Out Examples (232)
    • Exercise 5.1 (236)
  • 5.4 Inverse Differential Operator And Particular Integral (237)
  • 5.5 Special Forms of X (238)
    • Worked Out Examples (241)
    • Exercise 5.2 (253)
    • Exercise 5.3 (258)
    • Exercise 5.4 (268)
  • 5.6 Method of Undetermined Coefficients (268)
    • Worked Out Examples (269)
    • Exercise 5.5 (279)
  • 5.7 Solution of Simultaneous Differential Equations (281)
    • Worked Out Examples (282)
    • Exercise 5.6 (284)
    • Additional Problems (From Previous Years VTU Exams.) (285)
    • Objective Questions (294)
• Unit-Vl Differential Equations-II (297)
  • 6.1 Methods of Variation of Parameters (297)
    • Worked Out Examples (298)
    • Exercise 6.1 (308)
  • 6.2 Solution of Cauchy’s Homogeneous Linear Equation And Lengendre’s Linear Equation (309)
    • Worked Out Examples (311)
    • Exercise 6.2 (323)
  • 6.3 Solution of Initial and Boundary Value Problems (325)
    • Worked Out Examples (325)
    • Exercise 6.3 (327)
    • Additional Problems (From Previous Years VTU Exams.) (327)
    • Objective Questions (335)
• Unit Vll Laplace Transforms (338)
  • 7.1 Introduction (338)
  • 7.2 Definition (338)
  • 7.3 Properties of Laplace Transforms (338)
    • 7.3.1 Laplace Transforms of Some Standard Functions (339)
    • Worked Out Examples (342)
    • Exercise 7.1 (347)
    • 7.3.2 Laplace Transforms of the form eat f (t) (348)
    • Worked Out Examples (349)
    • Exercise 7.2 (352)
    • 7.3.3 Laplace Transforms of the form t n f (t) Where n is a Positive Integer (353)
    • 7.3.4 Laplace Transforms of f(t)/t (354)
    • Worked Out Examples (354)
    • Exercise 7.3 (362)
  • 7.4 Laplace Transforms of Periodic Functions (363)
    • Worked Out Examples (364)
    • Exercise 7.3 (368)
  • 7.5 Laplace Transforms of Unit Step Function and Unit impulse Function (369)
    • Unit Step Function (Heaviside function) (369)
    • 7.5.1 Properties Associated with the Unit Step Function (369)
    • 7.5.2 Laplace Transform of the Unit Impulse Function (371)
    • Exercise 7.4 (376)
    • Additional Problems (From Previous Years VTU Exams.) (377)
    • Objective Questions (382)
• Unit Vlll Inverse Laplace Transforms (386)
  • 8.1 Introduction (386)
  • 8.2 Inverse Laplace Transforms of Some Standard Functions (386)
    • Worked Out Examples (389)
  • 8.3 Inverse Laplace Transforms Using Partial Fractions (393)
    • Exercise 8.1 (399)
  • 8.4 Inverse Laplace Transforms of the Functions of the form F(s)/s (401)
    • Worked Out Example (401)
    • Exercise 8.2 (404)
  • 8.5 Convolution Theorem (405)
    • Worked out Examples (406)
    • Exercise 8.3 (413)
  • 8.6 Laplace Transforms of the Derivatives (414)
  • 8.7 Solution of Linear Differential Equations (415)
    • Worked Out Examples (415)
    • Solution of Simultaneous Differential Equations (423)
    • Exercise 8.4 (427)
  • 8.8 Applications of Laplace Transforms (428)
    • Worked Out Examples (429)
    • Exercise 8.5 (433)
    • Additional Problems (From Previous Years VTU Exams.) (434)
    • Objective Questions (439)
• Model Question Paper–I (444)
• Model Question Paper–Il (458)