Sequences Books
Sequences Series and Binomial Theorem
Author: MTS FUNAAB
School: Federal University of Agriculture, Abeokuta
Department: Science and Technology
Course Code: MTS101
Topics: Sequences, Series, Binomial Theorem, Geometric Progression, Arithmetic sequence, Arithmetic series
Sequences, series and binomial exapnsion
Author: Ilojide
School: Federal University of Agriculture, Abeokuta
Department: Science and Technology
Course Code: MTS105
Topics: sequence, arithmetic progression, arithmetic series, arithmetic mean, geometric progression, geometric series, sum to infinity, geometric mean, binomial expansion, binomial theorem
MTS105 Lecture (Sequences and Series)
Author: MTS FUNAAB
School: Federal University of Agriculture, Abeokuta
Department: Agriculture and Veterinary Medicine
Course Code: MTS105
Topics: Sequence, series, Arithmetic progression, Geometric progression, Arithmetic mean, Geometric mean, Arithmetic series, Geometric series, Binomial Theorem, binomial series
Author: JD O'Connor
School: University of Ibadan
Department: Arts and Humanities
Course Code: ENG202
Topics: basic sounds, sounds, sound-groups, words, speech organs, vocal cords, palate, teeth, tongue, lips, English consonant, friction consonant, stop consonant, nasal consonant, lateral consonant, gliding consonant, consonant sequences, English vowels, simple vowels, diphthongs, vowel sequences, fluency, word groups, word stress, stress syllables, fluency, intonation, English Pronunciation
Foundations of Mathematical Analysis
Author: CE Chidume, Chukwudi Chidume
School: Federal University of Technology, Owerri
Department: Science and Technology
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
Introduction to Real Analysis, 4th Edition
Author: Robert Bartle, Donald Sherbert
School: Nnamdi Azikiwe University
Department: Science and Technology
Course Code: MAT251
Topics: 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
Pure Mathematics for Advanced Level ,2nd edition
Author: BD Bunday, Mulholland
School: Federal University of Agriculture, Abeokuta
Department: Science and Technology
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
University calculus early transcendentals, 4th edition
Author: Joel Hass, Christopher Heil, Przemyslaw Bogacki, Maurice Weir, George Thomas
School: Federal University of Agriculture, Abeokuta
Department: Science and Technology
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
Author: Anthony Croft, Robert Davison, martin Hargreaves, James flint
School: Federal University of Technology, Owerri
Department: Engineering
Course Code: ENG307, ENG308
Topics: engineering functions, trigonometric functions, coordinate systems, discrete mathematics, sequences, series, vectors, matrix algebra, complex numbers, differentiation, integration, numerical integration, taylor polynomials, taylor series, maclaurin series, Laplace transform, z transform, Fourier series, Fourier transform, vector calculus, line integrals, multiple integrals, probability, statistics
Engineering Mathematics ,8th edition
Author: Dexter Booth, Ken Stroud
School: Federal University of Technology, Owerri
Department: Engineering
Course Code: ENG307, ENG308
Topics: Engineering Mathematics, Algebra, power, logarithms, polynomials, linear equations, polynomial equations, binomials, binomial expansions, sigma notation, factorials, combinations, partial fractions, trigonometry, Trigonometric identities, Trigonometric functions, exponential functions, differentiation, Newton–Raphson iterative method, integration, complex numbers, hyperbolic functions, determinants, matrices, eigenvalues, eigenvectors, Cayley–Hamilton theorem, vector, vector representation, sequences, infinite series, curves, curve fitting, Asymptotes, Systematic curve sketching, Correlation, partial differentiation, reduction formulas, approximate integration, integration application polar coordinate systems, multiple integrals, first-order differential equations, homogenous equations, Laplace transform, probability, Conditional probability, Probability distributions, Continuous probability distributions
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