Products related to Mathematics:
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Thinking about Mathematics : The Philosophy of Mathematics
This unique text by Stewart Shapiro looks at a range of philosophical issues and positions concerning mathematics in four comprehensive sections.The first describes questions and issues about mathematics that have motivated philosophers almost since the beginning of intellectual history.Part II is an historical survey, discussing the role of mathematics in such thinkers as Plato, Aristotle, Kant, and Mill.The third section covers the three major positions, and battle lines, throughout the twentieth century: that mathematics is logic (logicism), that the essence of mathematics is the rule-governed manipulation of characters (formalism), and a revisionist philosophy that focuses on the mental activity of mathematics (intuitionism).Finally, Part IV looks at contemporary positions and work which brings the reader up-to-date on the discipline.Thinking about Mathematics is accessible to those with little background in either mathematics or philosophy.It is aimed at students and professionals in mathematics who have little contact with academic philosophy and at philosophy students and other philosophers who forgot much of their mathematics.
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Discrete Mathematics
Biggs' Discrete Mathematics has been a best-selling textbook since the first and revised editions were published in 1986 and 1990, respectively.This second edition has been developed in response to undergraduate course changes and changes in students' needs.New to this edition are chapters on statements and proof, logical framework, and natural numbers and the integers, in addition to updated chapters from the previous edition.The new chapters are presented at a level suitable for mathematics and computer science students seeking a first approach to this broad and highly relevant topic.Each chapter contains newly developed tailored exercises, and miscellaneous exercises are presented throughout, providing the student with over 1000 individual tailored exercises.This edition is accompanied by a website www.oup.com/mathematics/discretemath containing hints and solutions to all exercises presented in the text, providing an invaluable resource for students and lecturers alike.The book is carefully structured, coherent and comprehensive, and is the ideal text for students seeking a clear introduction to discrete mathematics, graph theory, combinatorics, number theory, coding theory and abstract algebra.
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Vedic Mathematics
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Basic Mathematics
This is a text in basic mathematics with multiple uses for either high school or college level courses.Readers will get a firm foundation in basic principles of mathematics which are necessary to know in order to go ahead in calculus, linear algebra or other topics.The subject matter is clearly covered and the author develops concepts so the reader can see how one subject matter can relate and grow into another.
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What is the relationship between differentiation and integration in mathematics?
Differentiation and integration are two fundamental operations in calculus that are closely related. Differentiation is the process of finding the rate at which a function is changing at a given point, while integration is the process of finding the accumulation of a function over a given interval. The relationship between the two operations is described by the Fundamental Theorem of Calculus, which states that differentiation and integration are inverse operations of each other. In other words, differentiation "undoes" integration, and integration "undoes" differentiation.
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How does integration work in mathematics?
Integration in mathematics is a process of finding the integral of a function. It involves finding the area under a curve or the accumulation of quantities over a given interval. Integration is the reverse process of differentiation, and it helps in solving problems related to finding areas, volumes, and other physical quantities. By using integration, we can calculate the total change or total amount of a quantity over a given range.
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What are integration rules in mathematics?
Integration rules in mathematics are a set of formulas and techniques used to find the integral of a function. These rules include the power rule, which states that the integral of x^n is (1/(n+1))x^(n+1), and the constant multiple rule, which allows constants to be factored out of the integral. Other important integration rules include the sum and difference rules, the substitution rule, and the integration by parts rule. These rules are essential for solving definite and indefinite integrals and are fundamental in calculus.
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How does partial integration work in mathematics?
Partial integration, also known as integration by parts, is a technique used in calculus to evaluate the integral of a product of two functions. It is based on the product rule for differentiation and involves choosing one function to differentiate and the other to integrate. By applying the formula for partial integration, the original integral can be transformed into a simpler form that is easier to evaluate. This technique is particularly useful for integrating functions that are the product of two different types of functions, such as polynomials and exponentials.
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Construction Mathematics
Construction Mathematics is an introductory level mathematics text, written specifically for students of construction and related disciplines. Learn by tackling exercises based on real-life construction maths.Examples include: costing calculations, labour costs, cost of materials and setting out of building components. Suitable for beginners and easy to follow throughout. Learn the essential basic theory along with the practical necessities. The second edition of this popular textbook is fully updated to match new curricula, and expanded to include even more learning exercises.End of chapter exercises cover a range of theoretical as well as practical problems commonly found in construction practice, and three detailed assignments based on practical tasks give students the opportunity to apply all the knowledge they have gained. Construction Mathematics addresses all the mathematical requirements of Level 2 construction NVQs from City & Guilds/CITB and Edexcel courses, including the BTEC First Diploma in Construction.Additional coverage of the core unit Mathematics in Construction and the Built Environment from BTEC National Construction, Civil Engineering and Building Services courses makes this an essential revision aid for students who do not have Level 2 mathematics experience before commencing their BTEC National studies.This is also the ideal primer for any reader who wishes to refresh their mathematics knowledge before going into a construction HNC or BSc.
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Combinatorial Mathematics
This long-awaited textbook is the most comprehensive introduction to a broad swath of combinatorial and discrete mathematics.The text covers enumeration, graphs, sets, and methods, and it includes both classical results and more recent developments.Assuming no prior exposure to combinatorics, it explains the basic material for graduate-level students in mathematics and computer science.Optional more advanced material also makes it valuable as a research reference.Suitable for a one-year course or a one-semester introduction, this textbook prepares students to move on to more advanced material.It is organized to emphasize connections among the topics, and facilitate instruction, self-study, and research, with more than 2200 exercises (many accompanied by hints) at various levels of difficulty.Consistent notation and terminology are used throughout, allowing for a discussion of diverse topics in a unified language.The thorough bibliography, containing thousands of citations, makes this a valuable source for students and researchers alike.
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Engineering Mathematics
Engineering Mathematics is the unparalleled undergraduate textbook for students of electrical, electronic, communications and systems engineering. Tried and tested over many years, this widely used textbook is now in its 5th edition, having been fully updated and revised. This new edition includes an even greater emphasis on the application of mathematics within a range of engineering contexts. It features detailed explanation of why a technique is important to engineers. In addition, it provides essential guidance in how to use mathematics to solve engineering problems.This approach ensures a deep and practical understanding of the role of mathematics in modern engineering.
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Cambridge International AS & A Level Mathematics Pure Mathematics 1 Coursebook with Cambridge Online Mathematics (2 Years)
This series has been developed specifically for the Cambridge International AS & A Level Mathematics (9709) syllabus to be examined from 2020. The coursebook provides clear explanations and practice exercises to help students master maths skills.This edition comes with a subscription to the Pure Mathematics 1 Cambridge Online Mathematics component.With all of the materials found within the coursebook, including answers, Cambridge Online Mathematics offers students the facility to demonstrate their working, as well as opportunities for self-assessment, and allows teachers to set classroom and homework exercises to individual students or entire classes, with the ability to track progress.The online resource requires internet access. For more information on how to use Cambridge Online Mathematics, please see inside the front cover.
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How do differentiation and integration work in mathematics?
Differentiation and integration are two fundamental operations in calculus. Differentiation involves finding the rate of change of a function at a specific point, or the slope of the tangent line to the function's graph at that point. Integration, on the other hand, involves finding the accumulation of a quantity over a given interval, or the area under the curve of a function. In essence, differentiation and integration are inverse operations of each other, with differentiation finding the rate of change and integration finding the accumulation. Together, they form the basis of calculus and are used to solve a wide range of mathematical problems in various fields.
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What is a question regarding integration in mathematics?
One question regarding integration in mathematics could be: "How can we use integration to find the area under a curve or the total accumulated quantity of a changing quantity over a given interval?" This question relates to the fundamental concept of integration, which involves finding the accumulation of quantities over a continuous range and is a key tool in calculus for solving problems related to area, volume, and other physical quantities.
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What is the relationship to mathematics?
Mathematics is the study of numbers, shapes, and patterns, and it is used to solve problems and understand the world around us. It is a fundamental tool in many fields such as science, engineering, economics, and computer science. Mathematics provides a framework for logical reasoning, problem-solving, and critical thinking, and it is essential for understanding and analyzing data. Overall, mathematics plays a crucial role in our daily lives and in the advancement of human knowledge and technology.
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Can you give an introduction to the mathematics of integration?
Integration is a fundamental concept in calculus that involves finding the accumulation of quantities over a continuous interval. It is the reverse process of differentiation and is used to find the area under a curve, the volume of a solid, and the average value of a function, among other applications. The process of integration involves finding an antiderivative of a function, which is a function whose derivative is the original function. The definite integral represents the accumulation of the function over a specific interval, while the indefinite integral represents the family of antiderivatives of the function. Integration is a powerful tool in mathematics and is used in various fields such as physics, engineering, and economics.
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