Table of contents: Preface ix 1. Linear Equations 1 1.1 Introduction 1 1.2 Gaussian Elimination and Matrices 3 1.3 Gauss–Jordan Method 15 1.4 Two-Point BoundaryV alue Problems 18 1.5 Making Gaussian Elimination Work 21 1.6 Ill-Conditioned Systems 3 2. Rectangular Systems and Echelon Forms 41 2.1 Row Echelon Form and Rank 41 2.2 Reduced Row Echelon Form 47 2.3 Consistencyof Linea…
Table of contents: Chapter 1: Systems of Linear Equations 1.1: Introduction to Systems of Linear Equations (43) 1.2: Gaussian Elimination and Gauss-Jordan Elimination (38) 1.3: Applications of Systems of Linear Equations (22) 1: Review Exercises (12) Chapter 2: Matrices 2.1: Operations with Matrices (45) 2.2: Properties of Matrix Operations (45) 2.3: The I…
DAFTAR ISI Bab 1 Vektor 1.1. Pendahuluan 1.2. Besar dan arah vektor 1.3. Kesamaan vektor 1.4. Dot product vektor 1.5. Perkalian vektor dengan skalar 1.6. Vektor satuan 1.7. Proyeksi vektor pada vektor 1.8. PErkalian silang 2 vektor (cross product) 1.9. Menghitung luas segitiga dengan menggunakan perkalian vektor 1.10. Meghitung luas jajaran genjang dengan menggunakan perkalian vekt…
Daftar isi: BAB 1 Vektor BAB 2 Ruang vektor BAB 3 Matriks BAB 4 Determinan BAB 5 Matriks invers BAB 6 Sistem persamaan linier BAB 7 Transformasi linier BAB 8 Nilai eigen dan vector eigen BAB 9 Nilai di bidang komputer BAB 10 Matlab untuk aljabar linier dan matriks Daftar pustaka
Daftar isi: BAB I Pengantar regresi linier BAB II Metode estimasi regresi linier BAB III Asumsi regresi linier BAB IV Pemilihan model regresi terbaik BAB V Aplikasi regresi linier dalam penelitian ilmiah BAB VI Evaluasi pemahaman
Contents 1 Vector spaces 1 2 Finite-dimensional vector spaces 3 Linear maps 4 Polynomials 5 Eigenvalues, eigenvectors, and invariant subspaces 6 Inner product spaces 7 Operators on inner product spaces 8 Operators on complex vector spaces 9 Operators on real vector spaces 10 Trace and determinant
Daftar isi: Bab 1 Operasi pada himpunan Bab 2 Semigrup dan monoid Bab 3 Dasar-dasar grup Bab 4 Grup siklik, permutasi, homomorfisma grup Bab 5 Grup faktor Bab 6 Ring (gelanggang) Bab 7 Subring dan ideal Bab 8 Ring faktor dan homomorfisma ring Bab 9 Ring khusus Bab 10 Ring polinom
Table of contents: 1. Prerequisites and Notation 2. Basic Properties of the Integers 3. Groups, Rings and Ideals 4. Applications to Public Key Cryptography 5. Fields 6. Properties of Finite Fields 7. Applications to Stream Ciphers 8. Boolean Functions 9. Applications to Block Ciphers 10. Number Theory in Public Key Cryptography 11. Where Do We Go from Here?
Contents: 1. Mappings And Operations 2. Introduction To Groups 3. Equivalence. Congruence. Divisibility 4. Groups 5. Group Homomorphisms 6. Introduction To Rings 7. The Familiar Number R System 8. Polynomials 9. Quotient Rings 10. Galois Theory: Overview 11. Galois Theory 12. Geometric Constructions 13. Geometric Constructions 14. Applications Of Permutation Groups 15. Symmetry …
CONTENTS: 1.Integers 1.1.Natural Numbers 1.2.The Euclidean Algorithm 1.3.Fermat's Little Theorem and Its Generalisations 1.4.The Ring of Integers Modulo n. The Field Zp 1.5.Representation of Numbers 2.Cryptology 2.1.Classical Secret-Key Cryptology 2.2.Modern Public-Key Cryptology 2.3.Computational Complexity 2.4.The RSA Public-Key Cryptosystem 2.5.Applications of Cryptology 3…