## Handbook of Mathematics for Engineers and ScientistsThe Handbook of Mathematics for Engineers and Scientists covers the main fields of mathematics and focuses on the methods used for obtaining solutions of various classes of mathematical equations that underlie the mathematical modeling of numerous phenomena and processes in science and technology. To accommodate different mathematical backgr |

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### Contents

3 | |

19 | |

43 | |

Analytic Geometry | 77 |

Algebra | 155 |

Limits and Derivatives | 235 |

Integrals | 273 |

Series | 337 |

Probability Theory | 1031 |

Mathematical Statistics | 1081 |

Mathematical Tables | 1111 |

Finite Sums and Infinite Series | 1113 |

Integrals | 1129 |

Integral Transforms | 1157 |

Orthogonal Curvilinear Systems of Coordinate | 1195 |

Ordinary Differential Equations | 1207 |

Differential Geometry | 367 |

Functions of Complex Variable | 399 |

Integral Transforms | 435 |

Ordinary Differential Equations | 453 |

FirstOrder Partial Differential Equations | 553 |

Linear Partial Differential Equations | 585 |

Nonlinear Partial Differential Equations | 653 |

Integral Equations | 801 |

Difference Equations and Other Functional Equations | 873 |

Special Functions and Their Properties | 937 |

Calculus of Variations and Optimization | 991 |

Systems of Ordinary Differential Equations | 1229 |

FirstOrder Partial Differential Equations | 1247 |

Linear Equations and Problems of Mathematical Physics | 1267 |

Nonlinear Mathematical Physics Equations | 1301 |

Systems of Partial Differential Equations | 1337 |

Integral Equations | 1385 |

Functional Equations | 1409 |

Some Useful Electronic Mathematical Resources | 1451 |

1453 | |

### Other editions - View all

Handbook of Mathematics for Engineers and Scientists Andrei D. Polyanin,Alexander V. Manzhirov No preview available - 2006 |

### Common terms and phrases

angle applied approximate arbitrary arbitrary constants assumed asymptotic axes axis boundary conditions boundary value problem bounded called Cauchy characteristic coefficients complex condition Consider continuous convergent coordinates corresponding curve defined definition denoted dependent derivatives determined difference direction domain eigenvalues elements equal Example exists expansion expressed Figure formula function given holds homogeneous independent integral integral equation interval invariant inverse kind limit linear matrix means method nonhomogeneous nonlinear normal obtain operator ordinary differential equation original Paragraph parameter partial particular solution plane polynomial positive problem properties reduced relation Remark representation represented respect resulting right-hand side roots satisfy second-order separable solution solution of equation solving space straight line Substituting Suppose surface Table taking THEOREM transform variables vector York zero