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  • Functions
    Functions

    How to teach kids coding ideas even if you don't know how to code yourself.In the age of computers, smartphones and digital media, coding is going to be one of the most helpful skills the next generation needs to learn for their future jobs.It's such a focus that schools are starting to introduce it into their curriculum.Younger and younger people are learning how to code20 years ago, coding was taught only at university.Now, high school students are learning it.In the next decade, even elementary school kids will be learning the basics.What is this book?Functions by Dougy Lee is the second book of a series designed to smoothly segue your child into understanding coding concepts - the stuff that university students wrestle with.With simple language and colorful illustrations, this book makes what feel like very difficult topics easy enough that even kids can learn.Functions introduces a variety of fundamental concepts about programming functions that would lay the foundational building blocks for early growth into computer science.We explore key ideas about the topic of functions:The black box model of functions.,What are the components of a function?,What does it mean when you provide different inputs into a function?,How do you know if two functions are the same?,It is a great gift for kids who aspire to make their own websites, build robots or even make games.Have a bit of fun during reading time with your child. Go through with them something that's different to the ordinary baby books of colors and animals.

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  • Characteristic Functions, Scattering Functions and Transfer Functions : The Moshe Livsic Memorial Volume
    Characteristic Functions, Scattering Functions and Transfer Functions : The Moshe Livsic Memorial Volume

    Daniel Alpay and Victor Vinnikov During the period July 9 to July 13, 2007,a conference called Characteristic fu- tions and transfer functions in operator theory and system theory: a conference dedicated to PaulFuhrmann onhis 70thanniversary and to the memory ofMoshe Livsiconhis90thanniversarywasheldattheDepartmentofMathematicsofBen- GurionUniversityoftheNegev.Thenotionsoftransferfunctionandcharacteristic functions proved to be fundamental in the last ?fty years in operator theory and in system theory.This conference was envisaged to pay tribute to our colleagues PaulFuhrmannandMosheLivsicwhoplayedacentralroleindevelopingthese- tions.Sadly, Moshe Livsic passedawayon the 30thof March,2007(11th of Nissan 5767), so the conference was dedicated to his memory.It is a pleasure to thank all the participants, who contributed to a very exciting and fruitful conference, and especially those who submitted papers to the present volume.The volume contains a selection of thirteen research papers dedicated to the memory of Moshe Livsic.The topics addressed can be divided into the following categories: Classical operator theory and its applications: This pertains to the paper Diff- ential-di?erence equations in entire functions by G. Belitskii and V. Tkachenko, the paper Bi-Isometries and Commutant Lifting by H.Bercovici, R.G. Douglas. and C. Foias and the paper Convexity of ranges and connectedness of level sets of quadratic forms by I.Feldman, N. Krupnik and A. Markus. Ergodictheoryandstochasticprocesses: We have the papersTheone-sidedergodic Hilbert transform of normal contractions by G.Cohen and M. Lin, and Integral Equations in the Theory of Levy Processes by L.Sakhnovich. Geometryofsmoothmappings:This iscoveredbythepaper ofY.Yomdinentitled ?-Spread of sets in metric spaces and critical values of smooth functions.

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  • Elementary Functions
    Elementary Functions

    This textbook focuses on the study of different kinds of elementary functions ubiquitous both in high school Algebra and Calculus.To analyze the functions ranging from polynomial to trigonometric ones, it uses rudimentary techniques available to high school students, and at the same time follows the mathematical rigor appropriate for university level courses. Contrary to other books of Pre-Calculus, this textbook emphasizes the study of elementary functions with rigor appropriate for university level courses in mathematics, although the exposition is confined to the pre-limit topics and techniques.This makes the book useful, on the one hand, as an introduction to mathematical reasoning and methods of proofs in mathematical analysis, and on the other hand, as a preparatory course on the properties of different kinds of elementary functions. The textbook is aimed at university freshmen and high-school students interested in learning strict mathematical reasoning and in preparing a solid base for subsequent study of elementary functions at advanced level of Calculus and Analysis.The required prerequisites correspond to the level of the high school Algebra.All the preliminary concepts and results related to the elementary functions are covered in the initial part of the text.This makes the textbook suitable for both classroom use and self-study.

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  • Mathematical Functions
    Mathematical Functions

    What is a mathematical function? Why are they so important? How does plotting the graph of a function help us understand it? And where do gradients, differentials and calculus fit in?In this unique little book, packed with equations and their graphs, mathematics teacher Oliver Linton reveals the secrets of polynomial functions, polar functions, inverse functions, complex functions, vector functions and many more.Lines will never look the same again!

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  • Functions and Graphs
    Functions and Graphs


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  • Explorations in Complex Functions
    Explorations in Complex Functions

    This textbook explores a selection of topics in complex analysis.From core material in the mainstream of complex analysis itself, to tools that are widely used in other areas of mathematics, this versatile compilation offers a selection of many different paths.Readers interested in complex analysis will appreciate the unique combination of topics and connections collected in this book. Beginning with a review of the main tools of complex analysis, harmonic analysis, and functional analysis, the authors go on to present multiple different, self-contained avenues to proceed.Chapters on linear fractional transformations, harmonic functions, and elliptic functions offer pathways to hyperbolic geometry, automorphic functions, and an intuitive introduction to the Schwarzian derivative.The gamma, beta, and zeta functions lead into L-functions, while a chapter on entire functions opens pathways to the Riemann hypothesis and Nevanlinna theory.Cauchy transforms give riseto Hilbert and Fourier transforms, with an emphasis on the connection to complex analysis.Valuable additional topics include Riemann surfaces, steepest descent, tauberian theorems, and the Wiener–Hopf method. Showcasing an array of accessible excursions, Explorations in Complex Functions is an ideal companion for graduate students and researchers in analysis and number theory.Instructors will appreciate the many options for constructing a second course in complex analysis that builds on a first course prerequisite; exercises complement the results throughout.

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  • Calculus : Early Transcendental Functions
    Calculus : Early Transcendental Functions

    Designed for the three-semester engineering calculus course, CALCULUS: EARLY TRANSCENDENTAL FUNCTIONS, Sixth Edition, continues to offer instructors and students innovative teaching and learning resources.The Larson team always has two main objectives for text revisions: to develop precise, readable materials for students that clearly define and demonstrate concepts and rules of calculus; and to design comprehensive teaching resources for instructors that employ proven pedagogical techniques and save time.The Larson/Edwards Calculus program offers a solution to address the needs of any calculus course and any level of calculus student.Every edition from the first to the sixth of CALCULUS: EARLY TRANSCENDENTAL FUNCTIONS has made the mastery of traditional calculus skills a priority, while embracing the best features of new technology and, when appropriate, calculus reform ideas.

    Price: 91.99 £ | Shipping*: 0.00 £
  • Elliptic curves and functions
    Elliptic curves and functions


    Price: 27.35 £ | Shipping*: 0.00 £

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  • Which functions are not rational functions?

    Functions that are not rational functions include trigonometric functions (such as sine, cosine, and tangent), exponential functions (such as \(e^x\)), logarithmic functions (such as \(\log(x)\)), and radical functions (such as \(\sqrt{x}\)). These functions involve operations like trigonometric ratios, exponentiation, logarithms, and roots, which cannot be expressed as a ratio of two polynomials.

  • What are power functions and root functions?

    Power functions are functions in the form of f(x) = x^n, where n is a constant exponent. These functions exhibit a characteristic shape depending on whether n is even or odd. Root functions, on the other hand, are functions in the form of f(x) = √x or f(x) = x^(1/n), where n is the index of the root. Root functions are the inverse operations of power functions, as they "undo" the effect of the corresponding power function. Both power and root functions are important in mathematics and have various applications in science and engineering.

  • What are inverse functions of power functions?

    The inverse functions of power functions are typically radical functions. For example, the inverse of a square function (f(x) = x^2) would be a square root function (f^(-1)(x) = √x). In general, the inverse of a power function with exponent n (f(x) = x^n) would be a radical function with index 1/n (f^(-1)(x) = x^(1/n)). These inverse functions undo the original power function, resulting in the input and output values being switched.

  • What are inverse functions of exponential functions?

    Inverse functions of exponential functions are logarithmic functions. They are the functions that "undo" the effects of exponential functions. For example, if the exponential function is f(x) = a^x, then its inverse logarithmic function is g(x) = log_a(x), where a is the base of the exponential function. In other words, if f(x) takes x to the power of a, then g(x) takes a to the power of x.

  • Do you like hiking in the mountains?

    As an AI, I do not have personal preferences or physical capabilities to engage in activities like hiking. However, I can provide information and tips on hiking in the mountains if you are interested.

  • What are polynomial functions and what are power functions?

    Polynomial functions are functions that can be expressed as a sum of terms, each of which is a constant multiplied by a variable raised to a non-negative integer power. For example, f(x) = 3x^2 - 2x + 5 is a polynomial function. Power functions are a specific type of polynomial function where the variable is raised to a constant power. They can be written in the form f(x) = ax^n, where a is a constant and n is a non-negative integer. For example, f(x) = 2x^3 is a power function. Both polynomial and power functions are important in mathematics and have various applications in science and engineering.

  • 'Parabolas or Functions?'

    Parabolas are a specific type of function that can be represented by the equation y = ax^2 + bx + c. Functions, on the other hand, can take many different forms and can represent a wide variety of relationships between variables. While parabolas are a type of function, not all functions are parabolas. Therefore, the choice between parabolas and functions depends on the specific relationship being modeled and the form that best represents that relationship.

  • How do parameter variations and power functions look in functions?

    Parameter variations in functions can be represented by changing the coefficients or constants in the function equation. For example, in a linear function y = mx + b, varying the values of m and b will change the slope and y-intercept of the function. Power functions, on the other hand, have the form y = ax^n, where a is the coefficient and n is the exponent. Varying the values of a and n will change the steepness and curvature of the power function. Overall, parameter variations and power functions can be visually represented as changes in the shape, slope, and position of the function graph.

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