數(shù)值方法：MATLAB版英文原版

定　價：￥59.00

作　者：	（美）John H.Mathews，（美）Kurtis D.Fink著
出版社：	電子工業(yè)出版社
叢編項(xiàng)：	國外計算機(jī)科學(xué)教材系列
標(biāo)　簽：	Matlab

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ISBN：	9787505377608	出版時間：	2002-06-01	包裝：	簡裝本
開本：	26cm	頁數(shù)：	662	字?jǐn)?shù)：

內(nèi)容簡介

　　本書介紹了數(shù)值方法的理論及實(shí)用知識，講述了如間利用MATLAB軟件實(shí)現(xiàn)各種數(shù)值算法，以便為讀者今后的學(xué)習(xí)打下堅實(shí)的數(shù)值分析與科學(xué)計算基礎(chǔ)。本書內(nèi)容豐富、翔實(shí)，可以根據(jù)不同的學(xué)習(xí)對象和學(xué)習(xí)目的選擇相應(yīng)的章節(jié)，形成理論與實(shí)踐相結(jié)合的學(xué)習(xí)策略。書中的每個概念均以實(shí)例說明，同時還包含大量的習(xí)題，范圍涉及多個不同的領(lǐng)域。通過這些實(shí)例，進(jìn)一步說明數(shù)值方法是如何被實(shí)際應(yīng)用的。本書的突出特點(diǎn)是強(qiáng)調(diào)利用MATLAB進(jìn)行數(shù)值方法的程序設(shè)計，可提高讀者的實(shí)踐能力和加深對數(shù)值方法理論的理解；同時它的覆蓋范圍廣，包含數(shù)據(jù)方法的眾多研究領(lǐng)域，可以滿足不同專業(yè)和不同層次學(xué)生的需求。本書概念清晰、邏輯性強(qiáng)，可作為大專院校計算機(jī)、工程和應(yīng)用數(shù)學(xué)專業(yè)的教材和參考書。

作者簡介

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圖書目錄

1 Preliminaries 1
1.1 Review of Calculus 2
1.2 Binary Numbers I3
1.3 Error Analysis 24
2 The Solution of Nonlinear Equations
f(x) == 0 40
2.l Iteration for Solving x = g(x) 41
2.2 Bracketing Methods for Locating a Root 51
2.3 Initial Approximation and Convergence Criteria 62
2.4 Newton-Raphson and Secant Methods 70
2.5 Aitken's Process and Steffensen's and
Muller's Methods (Optional) 90
3 The Solution of Linear Systems AX = B
3.1 Introduction to Vectors and Matrices 101
3.2 Properties of Vectors and Matrices 109
3.3 Uppertriangular Linear Systems i20
3.4 Gaussian Elimination and Pivoting 125
3.5 TriangularFactorization 141
3.6 Iterative Methods tbr Linear Systems 156
3.7 Iteration for Non]inear Systems: Seide1 and
Newton's Methods (Optiona1) i67
4 Interpolation and Polynomial
Approximation 186
4.1 Taylor Series and Calculation of Functions I87
4.2 Introduction to Interpolation i99
4.3 Lagrange Approximation 206
4.4 Newton Po1ynomials 220
4.5 Chebyshev Polynomials (Optional) 230
4.6 Pade Approximations 243
5 Curve Fitting 252
5.1 Least-squares Line 253
5.2 Curve Fitting 263
5.3 Interpolation by Spline Functions 279
5.4 Fourier Series and Trigonometric Polynomia1s 297
6 Numerical Differentiation 310
6.1 Approximating The Derivative 311
6.2 Numerical Differentiation Formulas 329
7 Numerical Integration J42
7.1 Introduction to Quadrature 343
7.2 Composite Trapezoidal and Simpson's Rule 354
7.3 Recursive Rules and Romberg Integration 368
7.4 Adaptive Quadrature 382
7.5 Gauss-Legendre Integration (Optional) 389
8 Numerical Optimization 399
8.1 Minimization of a Function 400
9 Solution of Differential Equations 426
9.1 Introduction to Differential Equations 427
9.2 Euler's Method Jj3
9.3 Heun's Method 443
9.4 Taylor Series Method 451
9.5 Runge-Kutta Methods 458
9.6 Predictor-Corrector Methods 474
9.7 Systems of Differential Equations 487
9.8 Boundary Value Problems 497
9.9 Finite-difference Method 505
10 Solution of Partial Differential Equations S14
10.1 Hyperbolic Equations 516
10.2 Parabolic Equations 526
10.3 Elliptic Equations 538
11 Eigenvalues and Eigenvectors 555
11.1 Homogeneous Systems f The Eigenvalue Problem 556
11.2 Power Method 568
11.3 Jacobi's Method 581
11.4 Eigenvalues of Symmetric Matrices 594
Appendix: An Introduction to MATLAB 608
Some Suggested References for Reports 616
Bibliography and References 619
Answers to Selected Exercises 631
Index 655