Chapter 1: Vector Algebra, Theory of Equations, and Complex Numbers
Part II: Differential and Integral Calculus
Chapter 2: Differential Calculus
Chapter 3: Partial Differentiation
Chapter 4: Maxima and Minima
Chapter 5: Curve Tracing
Chapter 6: Integral Calculus
Chapter 7: Multiple Integrals
Part III: Ordinary Differential Equations
Chapter 8: Ordinary Differential Equations: First Order and First Degree
Chapter 9: Linear Differential Equations of Second Order and Higher Order
Chapter 10: Series Solutions
Chapter 11: Special Functions—Gamma, Beta, Bessel and Legendre
Chapter 12: Laplace Transform
Part IV: Linear Algebra and Vector Calculus
Chapter 13: Matrices
Chapter 14: Eigen Values and Eigen Vectors
Chapter 15: Vector Differential Calculus: Gradient, Divergence and Curl
Chapter 16: Vector Integral Calculus
Part V: Fourier Analysis and Partial Differential Equations
Chapter 17: Fourier Series
Chapter 18: Partial Differential Equations
Chapter 19: Application of Partial Differential Equations
Chapter 20: Fourier Integral, Fourier Transforms and Integral Transforms
Chapter 21: Linear Difference Equations and Z-Transforms
Part VI: Complex Analysis
Chapter 22: Complex Function Theory
Chapter 23: Complex Integration
Chapter 24: Theory of Residues
Chapter 25: Conformal Mapping.
Part VII: Probability and Statistics
Chapter 26: Probability
Chapter 27: Probability Distributions
Chapter 28: Sampling Distribution
Chapter 29: Estimation and Tests of Hypothesis
Chapter 30: Curve Fitting, Regression and Correlation Analysis
Chapter 31: Joint Probability Distribution and Markov Chains
Part VIII: Numerical Analysis
Chapter 32: Numerical Analysis
Chapter 33. Numerical Solutions of ODE and PDE
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