Donate
We put a lot of effort and resources to keep the materials you enjoy in LearnClax free.
Consider making a donation by buying points.
Introduction to Real Analysis, 4th Edition by Robert Bartle, Donald Sherbert
Introduction to Real Analysis, 4th Edition written by Robert Bartle, Donald Sherbert was published in the year 2011. It has details on real analysis, sets, functions, mathematical induction, finite sets, infinite sets, real numbers, absolute value, real line, intervals, sequences, series, limit theorems, monotone sequences, Cauchy criterion, limits, limit theorems, continuous functions, uniform continuity, inverse function, monotone functions, derivative, mean value theorem, L' Hospital rule, Taylor's theorem, Riemann integral, Riemann integral functions, fundamental theorem, Darboux integral, approximate integrations, pointwise convergence, uniform convergence, exponential functions, logarithmic function, trigonometric functions, infinite series, absolute convergence, infinite integrals, convergence theorems, continuous functions, metric spaces .
Introduction to Real Analysis, 4th Edition was uploaded for 200 level Science and Technology students of Nnamdi Azikiwe University (UNIZIK, NAU). it is recommended for MAT251 course .
| Technical Details |
|---|
| Uploaded on: 22-January-2022 |
| Size: 5.81 MB |
| Number of points needed for download: 47 |
| Number of downloads: 1 |
other related books
Limits and Continuous Functions (Lecture 2)
Department: Science and Technology
Author: GC Ezeamama
school: Nnamdi Azikiwe University
course code: MAT102
Topics : Limits, Continuous Functions, continuity, left limit, right limit
Go to bookSchaum's Outline of Calculus, 6th edition
Department: Science and Technology
Author: Frank Ayres, Elliott Mendelson
school: Nnamdi Azikiwe University
course code: MAT231
Topics : Calculus, linear coordinate systems, absolute value, inequalities, rectangular coordinate systems, lines, circles, parabolas, ellipses, hyperbolas, conic sections, functions, limits, continuity, continuous function, derivative, delta notation, chain rule, inverse functions, implicit differentiation, tangent lines, normal lines, critical numbers, relative maximum relative minimum, cure sketching, concavity, symmetry, points of inflection, vertical asymptotes, trigonometry, trigonometric functions, inverse trigonometric functions, rectilinear motion, circular motion, differentials, Newton's method, antiderivatives, definite integral, sigma notation, natural logarithm, exponential functions, logarithmic functions, L'hopital's rule, exponential growth, decay, half-life, integration by parts, trigonometric integrands, trigonometric substitutions, improper integrals, parametric equations, curvature, plane vectors, curvilinear motion, polar coordinates, infinite sequences, infinite series, geometric series, power series, uniform convergence, Taylor's series, Maclaurin series, partial derivatives, total differential, differentiability, chain rules, space vectors, directional derivatives, vector differentiation, vector integration, double integrals, iterated integrals, centroids, triple integrals, Separable Differential Equations, Homogeneous Functions, Integrating Factors, Second-Order Equations
Go to bookThomas Calculus ,14th edition
Department: Science and Technology
Author: GeorgeThomas, Joel Hass, Christopher Heil, Maurice Weir
school: University of Ilorin
course code: MAT112
Topics : Calculus, Trigonometric Functions, functions, limits, continuity, One-Sided Limits, Differentiation Rules, Derivatives, chain rule, implict differentiation, related rates, linearization, differentials, Mean Value Theorem, integrals, Monotonic Functions, First Derivative Test, Concavity, Curve Sketching, Applied Optimization, antiderivatives, Sigma Notation, limits of Finite Sums, Definite integral, Transcendental Functions, inverse functions, natural logarithms, exponential functions, exponential change, seperable differential equation, Indeterminate Form, L’Hôpital’s Rule, Inverse Trigonometric Functions, Hyperbolic Functions, Integration by Parts, integration, trigonometric integrals, trigonometric substitution, Integral Tables, Computer Algebra Systems, probability, numerical integration, improper integrals, probability, First-Order Differential Equations, Slope Fields, Euler’s Method, First-Order Linear Equations, Infinite Sequences, infinite Series, integral test, comparison test, absolute convergence, power series, alternating series, Taylor series, Maclaurin series, Parametric Equations, Polar Coordinates, Conic Sections, vector, Partial Derivatives, Lagrange Multipliers, Multiple Integrals, vector fields, Path Independence, Conservative Fields, Potential Functions, Green’s Theorem, Surface Integrals, Stokes Theorem, Divergence Theorem
Go to bookThomas Calculus Early Transcendentals, 13th Edition Instructors Solutions Manual
Department: Science and Technology
Author: Elka Block, Frank Purcell
school: University of Ilorin
course code: MAT112
Topics : Calculus, Trigonometric Functions, functions, limits, continuity, One-Sided Limits, Differentiation Rules, Derivatives, chain rule, implict differentiation, related rates, linearization, differentials, Mean Value Theorem, integrals, Monotonic Functions, First Derivative Test, Concavity, Curve Sketching, Applied Optimization, antiderivatives, Sigma Notation, limits of Finite Sums, Definite integral, Transcendental Functions, inverse functions, natural logarithms, exponential functions, exponential change, seperable differential equation, Indeterminate Form, L’Hôpital’s Rule, Inverse Trigonometric Functions, Hyperbolic Functions, Integration by Parts, integration, trigonometric integrals, trigonometric substitution, Integral Tables, Computer Algebra Systems, probability, numerical integration, improper integrals, probability, First-Order Differential Equations, Slope Fields, Euler’s Method, First-Order Linear Equations, Infinite Sequences, infinite Series, integral test, comparison test, absolute convergence, power series, alternating series, Taylor series, Maclaurin series, Parametric Equations, Polar Coordinates, Conic Sections, vector, Partial Derivatives, Lagrange Multipliers, Multiple Integrals, vector fields, Path Independence, Conservative Fields, Potential Functions, Green’s Theorem, Surface Integrals, Stokes Theorem, Divergence Theorem
Go to bookUniversity calculus early transcendentals, 4th edition
Department: Science and Technology
Author: Joel Hass, Christopher Heil, Przemyslaw Bogacki, Maurice Weir, George Thomas
school: Federal University of Agriculture, Abeokuta
course code: MTS241
Topics : functions, combining functions, trigonometric functions, exponential functions, inverse functions, logarithms, limit, continuity, derivatives, differentiation rules, chain rule, implicit differentiation, inverse trigonometric functions, related rates, linearization, differentials, mean value theorem, monotonic functions, applied optimization, integrals, transcendental functions, hyperbolic functions, integration, trigonometric integrals, trigonometric substitution, numerical integration, improper integrals, infinite sequences, infinite series, integral test, comparison test, absolute convergence, power series, Taylor series, Maclurin series, parametric equations, polar coordinates, vectors, dot product, cross product, vector-valued functions, partial derivatives, saddle points, multiple integrals, vector fields, Euler equations
Go to bookCalculus and Analytic Geometry,9th Edition
Department: Science and Technology
Author: George Thomas, Ross Finney
school: Federal University of Agriculture, Abeokuta
course code: MTS101
Topics : Calculus, Analytic Geometry, real numbers, real line, coordinates, functions, shifting graphs, trignometric functions, rates of change, limits, continuity, tangent lines, derivative of a function, differentiation rules, rates of change, chain rule, derivatives, implicit differentiation, rational exponents, extreme values of functions, mean value theorem, first derivative test, optimization, linearization, differentials, Newton's method, integration, indefinite integrals, differential equations, initial value problems, mathematical modelling, Riemann sums, definite integrals, mean value theorem, fundamental theorem, numerical integration, cylindrical shells, application of integrals, work, fluid pressure, inverse functions, natural logarithms, transcendental functions, L'Hopital's rule, inverse trignometric functions, hyperbolic functions, first order differential equations, Euler's numerical method, Integration formulas, integration by parts, integral tables, infinite series, power series, Maclaurin series, Taylor series, conic sections
Go to bookFoundations of Mathematical Analysis
Department: Science and Technology
Author: CE Chidume, Chukwudi Chidume
school: Federal University of Technology, Owerri
course code: MTH301
Topics : real number system, order relation, natural numbers, countable sets, uncountable sets, bounded sets, limits, Monotone Sequences, Sandwich Theorem, limit theorems, Bolzano-Weierstrass Theorem, Limit Superior, Limit Inferior, Cauchy Sequences, continuity, topological notions, One-sided Continuity, Continuity Theorems, Uniform Continuity, Uniform Continuity Theorems, closed sets, compact sets, continuous maps, differentiability, derivative, Rolle’s Theorem, Mean Value Theorem, L’Hospital’s Rule, Nonnegative Real Numbers series, Integral Test, Comparison Test, Limit Comparison Test, Cauchy’s Root Test, D’Alembert’s Ratio Test, Alternating Series, Absolute Convergence, Conditional Convergence, Riemann Integral, Integration, Uniform convergence, Power Series, Equicontinuity, Arzela-Ascoli Theorem
Go to bookDerivatives of Real-Valued Functions (Lecture 3)
Department: Science and Technology
Author: GC Ezeamama
school: Nnamdi Azikiwe University
course code: MAT102
Topics : differentiation, constant rule, constant multiple rule, power rule, sum rule, difference rule, product rule, quotient rule, chain rule, higher order derivatives
Go to bookFunctions (Lecture 1)
Department: Science and Technology
Author: GC Ezeamama
school: Nnamdi Azikiwe University
course code: MAT102
Topics : functional value, inverse functions, implicit functions, power functions, polynomial functions, rational functions, identity functions, constant functions, exponential functions, Logarithmic Functions, square root, Trigonometric Functions
Go to bookMathematical Logic On Numbers, Sets, Structures, and Symmetry
Department: Science and Technology
Author: Roman Kossak
school: University of Ilorin
course code: CSC408
Topics : first-order login, logical seeing, number, number structures, points, lines, structure of real numbers, set theory, relations, structures, geometry, definable elements, definable constants, minimal structure, order-minimal structures, definable sets, complex numbers, first-order properties, symmetries, logical visibility
Go to bookTaylor and MacLaurin Series
Department: Science and Technology
Author: Elizabeth Wood
school: University of Ilorin
course code: MAT102
Topics : Taylor Series, MacLaurin Series
Go to bookSequences Series and Binomial Theorem
Department: Science and Technology
Author: MTS FUNAAB
school: Federal University of Agriculture, Abeokuta
course code: MTS101
Topics : Sequences, Series, Binomial Theorem, Geometric Progression, Arithmetic sequence, Arithmetic series
Go to bookSequences, series and binomial exapnsion
Department: Science and Technology
Author: Ilojide
school: Federal University of Agriculture, Abeokuta
course code: MTS105
Topics : sequence, arithmetic progression, arithmetic series, arithmetic mean, geometric progression, geometric series, sum to infinity, geometric mean, binomial expansion, binomial theorem
Go to bookReal Analysis 1 lecture note
Department: Science and Technology
Author: MAT208
school: University of Ilorin
course code: MAT208
Topics : real number system, function, convergence test, root test, sum series
Go to bookFoundations of Mathematics Algebra, Geometry, Trigonometry and Calculus
Department: Science and Technology
Author: Philip Brown
school: Edo University
course code: MTH111
Topics : algebra, numbers, fractions, inequalities, cartesian plane, vector algebra, linear equations, trigonometry, trigonometric rations, trigonometric graphs, Pythagorean Identities, functions, Exponential Functions, Absolute Value Function, rational functions, root functions, Piecewise Defined Functions, limits, continuity, Horizontal Asymptotes, differential calculus, Derivative Functions, Tangent Line Problems, chain rule, Euclidean Geometry, Spherical Trigonometry
Go to bookPure Mathematics for Advanced Level ,2nd edition
Department: Science and Technology
Author: BD Bunday, Mulholland
school: Federal University of Agriculture, Abeokuta
course code: MTS105
Topics : Finite sequences, finite series, complex numbers, binomial theorem, quadratic function, quadratic equation, Trigonometric equations, Trigonometric functions, solution of triangles, differential calculus, differentiation, differentiation techniques, logarithmic functions, exponential functions, intefration, integral calculus, differential equations, co-ordinate geometry, straight line, parabola, ellipse, hyperbola, numerical methods, vectors
Go to bookMathematical methods 1
Department: Science and Technology
Author: O'kriso
school: Federal University of Technology, Owerri
course code: MTH201
Topics : Mathematical methods, domain, range, limits, continuity, partial derivatives, chain rule, gradient, jacobian, implicit differentiation, normal derivative, total differentiation, exact equations, laplace equation, harmonic functions, arbitrary functions, extreme value problems, infinite sequence, infinite series, convergence, divergence, Cauchy ratio test
Go to bookComplex Analysis, 3rd edition
Department: Science and Technology
Author: Joseph Bak, Donald Newman
school: University of Ilorin
course code: MAT210, MAT326, MAT329, MAT434
Topics : complex numbers, complex variable, analytic functions, line integrals, entire functions, analytic functions, simply connected domains, residue theorem, Contour Integral Techniques, conformal mapping, Riemann mapping theorem, maximum-modulus theorem, harmonic functions, analytic continuation, gamma functions, zeta functions
Go to bookThe green book of algebra
Department: Science and Technology
Author: SA Ilori, DOA Ajayi
school: University of Ibadan
course code: MAT111
Topics : Polynomials, rational functions, linear equations, simultaenous equation, quadratic equations, remainder theorem, factor theorem, inequalities, domain range, partial fractions, curve sketching, mathematical induction, permutations, combinations, binomial theorem, sequence, series, telescoping series, limits, sums to infinity, complex numbers, Aragand diagram, De Moivre's theorem, matrices, determinants, rank of a matrix, Cramer's rule, sets, vennn diagram, binary operations, real number systems
Go to bookSchaum's Outline of Advanced Calculus, 3rd Edition
Department: Science and Technology
Author: Wrede dan Murray, Murray Spiegel
school: University of Ilorin
course code: MAT201
Topics : number, sequence, function, limit, continuity, derivative, integral, partial derivative, vector, multiple integral, line integral, surface integral, infinite series, improper integral, Fourier series, Gamma function, Beta Function, complex variable
Go to bookDiscrete mathematics and its applications ,8th edition
Department: Science and Technology
Author: Kenneth Rosen
school: University of Ibadan
course code: CSC242
Topics : Discrete mathematics, logic, sets, functions, sequences, matrices, algorithms, Number theory, cryptography, induction, recursion, counting, discrete probability, advanced counting techniques, counting techniques, Linear Recurrence Relations, modelling computation, Finite-State Machines, relations, graphs, trees, boolean algebra, modelling computation, Boolean Functions, Logic Gates, Minimization of Circuits.Tree Traversal, Spanning Trees, Minimum Spanning Trees, Graph Models, Graph Terminology, Graph Isomorphism, Connectivity, Euler path, Hamilton Path, Shortest-Path Problems, Planar Graphs, Graph Coloring, Representing Relations, Equivalence Relations, Probability Theory, Bayes Theorem, variance, Pigeonhole Principle, permutation combination, binomial coefficient, Recursive Algorithms, Program Correctness, Divisibility, Modular Arithmetic, Integer Representations, Set Operations, Cardinality of Sets
Go to bookrelated Past Questions
Sets, binary operation, partial fractions, mathematical induction
Department: Science and Technology
Year Of exam: 2020
school: University of Benin
course code: MTH110
Topics : Sets, binary operation, partial fractions, mathematical induction, real numbers, remainder theorem, factor theorem, polynomial, mapping, complex number, Argand diagram, trigonometric function, sequence, series, recurrency, D'Alembert ratio test, permutation, combination
Go to past question36 Mammalian forms and functions MSSN
Department: Science and Technology
Year Of exam: 2019
school: University of Ilorin
course code: ZLY106
Topics : Mammalian forms, Mammalian functions
Go to past question40 Introductory Animal diversity practice question Librarian committee series
Department: Science and Technology
Year Of exam: 2019
school: University of Ilorin
course code: ZLY103
Topics : Animal diversity, Phylum, taxon
Go to past questionReal analysis 2-2011,2015,2016
Department: Science and Technology
Year Of exam: 2016
school: University of Ilorin
course code: MAT307
Topics : RIemann integral, Weierstrass convergence criterion, partition
Go to past questionPlant Diversity (Forms and Functions) Continuous assessment and exam
Department: Science and Technology
Year Of exam: 2017
school: University of Ilorin
course code: PLB108
Topics : spermatophyte, genera, plant, angiosperm, gymnosperm, flower, seed, root, algae, lichen, fungi, mushroom, basidiospore, Abiogenesis, Bacteria, Virus
Go to past question108 General physics 1 questions
Department: Science and Technology
Year Of exam: 2019
school: Nnamdi Azikiwe University
course code: PHY101
Topics : fundamental quantities, force, gravitation, displacement, gravitational potential energy, planetary motion, moment of inertia
Go to past questionElementary mathematics 2 for NAU students by MR ohms 2005-2019
Department: Science and Technology
Year Of exam: 2019
school: Nnamdi Azikiwe University
course code: MAT102
Topics : Set, limit, logarithm, differentiation, gradient, integration, domain, range
Go to past questionMAT112 Practice questions for UNILORITES
Department: Science and Technology
Year Of exam: 2013
school: University of Ilorin
course code: MAT112
Topics : Functions, continuity, Limits of Functions, Differentiation, Maxima, minima, Point of inflexion, Taylors series, Maclaurin series
Go to past questionTutorial workbook for MTS101 & MTS102
Department: Science and Technology
Year Of exam: 2019
school: Federal University of Agriculture, Abeokuta
course code: MTS101, MTS102
Topics : Set theory, real numbers, complex numbers, rational functions, partial fraction, binomial expansion, sequence, series, matrices, Trigonometry, Differentiation, integration
Go to past questionAbstract algebra 2 test & exam-2017-2019
Department: Science and Technology
Year Of exam: 2019
school: University of Ilorin
course code: MAT306
Topics : group, coset, ring, isomorphic series, normal series
Go to past questionDATA PROCESSING
Department: Science and Technology
Year Of exam: 2019
school: Federal University of Technology, Owerri
course code: GPH411
Topics : waveform, graphical representation, aliasing, Fourier series, Fourier transform
Go to past questionMATHEMATICAL METHODS 1-2018&2019
Department: Science and Technology
Year Of exam: 2019
school: Federal University of Technology, Owerri
course code: MTH201
Topics : domain, range, derivative, function, limit, continuity
Go to past questionPhysical Chemistry 1
Department: Science and Technology
Year Of exam: 2007
school: University of Ibadan
course code: CHE156
Topics : Internal energy, heat of formation, solubility, mean dissociation, mean free path, ideal gas, Lyman series, hybridization, binding energy
Go to past questionAlgebra and trigonometry & Introductory physiology MOCK CAT
Department: Science and Technology
Year Of exam: 2018
school: Federal University of Agriculture, Abeokuta
course code: MTS105, BIO103, BIO101
Topics : surd, remainder theorem, partial fraction, series, geometric mean, plant, leaf, homeostasis, environment, photosynthesis
Go to past questionAlgebra with marking guide
Department: Science and Technology
Year Of exam: 2016
school: Federal University of Agriculture, Abeokuta
course code: MTS101
Topics : set theory, binary operation, surd, real numbers
Go to past question