Results for 'Mathematics, general'

966 found
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  1.  54
    Mathematical Generality, Letter-Labels, and All That.F. Acerbi - 2020 - Phronesis 65 (1):27-75.
    This article focusses on the generality of the entities involved in a geometric proof of the kind found in ancient Greek treatises: it shows that the standard modern translation of Greek mathematical propositions falsifies crucial syntactical elements, and employs an incorrect conception of the denotative letters in a Greek geometric proof; epigraphic evidence is adduced to show that these denotative letters are ‘letter-labels’. On this basis, the article explores the consequences of seeing that a Greek mathematical proposition is fully (...), and the ontological commitments underlying the stylistic practice. (shrink)
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  2. Contextualizing concepts using a mathematical generalization of the quantum formalism.Liane Gabora & Diederik Aerts - 2002 - Journal of Experimental and Theoretical Artificial Intelligence 14 (4):327-358.
    We outline the rationale and preliminary results of using the State Context Property (SCOP) formalism, originally developed as a generalization of quantum mechanics, to describe the contextual manner in which concepts are evoked, used, and combined to generate meaning. The quantum formalism was developed to cope with problems arising in the description of (1) the measurement process, and (2) the generation of new states with new properties when particles become entangled. Similar problems arising with concepts motivated the formal treatment introduced (...)
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  3. Mathematics and Explanatory Generality: Nothing but Cognitive Salience.Juha Saatsi & Robert Knowles - 2021 - Erkenntnis 86 (5):1119-1137.
    We demonstrate how real progress can be made in the debate surrounding the enhanced indispensability argument. Drawing on a counterfactual theory of explanation, well-motivated independently of the debate, we provide a novel analysis of ‘explanatory generality’ and how mathematics is involved in its procurement. On our analysis, mathematics’ sole explanatory contribution to the procurement of explanatory generality is to make counterfactual information about physical dependencies easier to grasp and reason with for creatures like us. This gives precise content to key (...)
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  4.  2
    Nelson algebras, residuated lattices and rough sets: A survey.Lut School of Engineering Science Jouni Järvinen Sándor Radeleczki Umberto Rivieccio A. SOftware Engineering, Finlandb Institute Of Mathematics Lahti, Uned Hungaryc Departamento de Lógica E. Historia Y. Filosofía de la Ciencia & Spain Madrid - 2024 - Journal of Applied Non-Classical Logics 34 (2):368-428.
    Over the past 50 years, Nelson algebras have been extensively studied by distinguished scholars as the algebraic counterpart of Nelson's constructive logic with strong negation. Despite these studies, a comprehensive survey of the topic is currently lacking, and the theory of Nelson algebras remains largely unknown to most logicians. This paper aims to fill this gap by focussing on the essential developments in the field over the past two decades. Additionally, we explore generalisations of Nelson algebras, such as N4-lattices which (...)
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  5. Mathematics and Explanatory Generality.Alan Baker - 2017 - Philosophia Mathematica 25 (2):194-209.
    According to one popular nominalist picture, even when mathematics features indispensably in scientific explanations, this mathematics plays only a purely representational role: physical facts are represented, and these exclusively carry the explanatory load. I think that this view is mistaken, and that there are cases where mathematics itself plays an explanatory role. I distinguish two kinds of explanatory generality: scope generality and topic generality. Using the well-known periodical-cicada example, and also a new case study involving bicycle gears, I argue that (...)
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  6.  12
    The Oxford Handbook of Generality in Mathematics and the Sciences.Karine Chemla, Renaud Chorlay & David Rabouin (eds.) - 2016 - New York, NY, USA: Oxford University Press UK.
    Generality is a key value in scientific discourses and practices. Throughout history, it has received a variety of meanings and of uses. This collection of original essays aims to inquire into this diversity. Through case studies taken from the history of mathematics, physics and the life sciences, the book provides evidence of different ways of understanding the general in various contexts. It aims at showing how individuals have valued generality and how they have worked with specific types of " (...)" entities, procedures, and arguments. (shrink)
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  7.  53
    Generalized equivalence: A pattern of mathematical expression.T. A. McKee - 1985 - Studia Logica 44 (3):285 - 289.
    A simple propositional operator is introduced which generalizes pairwise equivalence and occurs widely in mathematics. Attention is focused on a replacement theorem for this notion of generalized equivalence and its use in producing further generalized equivalences.
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  8.  46
    Mathematical, Philosophical and Semantic Considerations on Infinity : General Concepts.José-Luis Usó-Doménech, Josué Antonio Nescolarde Selva & Mónica Belmonte Requena - 2016 - Foundations of Science 21 (4):615-630.
    In the Reality we know, we cannot say if something is infinite whether we are doing Physics, Biology, Sociology or Economics. This means we have to be careful using this concept. Infinite structures do not exist in the physical world as far as we know. So what do mathematicians mean when they assert the existence of ω? There is no universally accepted philosophy of mathematics but the most common belief is that mathematics touches on another worldly absolute truth. Many mathematicians (...)
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  9.  47
    Generality, mathematical elegance, and evolution of numerical/object identity.Felice L. Bedford - 2001 - Behavioral and Brain Sciences 24 (4):654-655.
    Object identity, the apprehension that two glimpses refer to the same object, is offered as an example of combining generality, mathematics, and evolution. We argue that it applies to glimpses in time (apparent motion), modality (ventriloquism), and space (Gestalt grouping); that it has a mathematically elegant solution of nested geometries (Euclidean, Similarity, Affine, Projective, Topology); and that it is evolutionarily sound despite our Euclidean world. [Shepard].
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  10.  26
    Abduction, Generalization, and Abstraction in Mathematical Problem Solving.Vic Cifarelli - 1998 - Semiotics:97-113.
  11.  29
    Generality above Abstraction: The General Expressed in Terms of the Paradigmatic in Mathematics in Ancient China.Karine Chemla - 2003 - Science in Context 16 (3).
  12.  6
    Generalization and the Impossible: Issues in the search for generalized mathematics around 1900.Paul Ziche - 2014 - In Generalization and the Impossible: Issues in the search for generalized mathematics around 1900. pp. 209-228.
  13. Why proofs by mathematical induction are generally not explanatory.Marc Lange - 2009 - Analysis 69 (2):203-211.
    Philosophers who regard some mathematical proofs as explaining why theorems hold, and others as merely proving that they do hold, disagree sharply about the explanatory value of proofs by mathematical induction. I offer an argument that aims to resolve this conflict of intuitions without making any controversial presuppositions about what mathematical explanations would be.
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  14.  12
    Reverse mathematics: proofs from the inside out.John Stillwell - 2018 - Princeton: Princeton University Press.
    This book presents reverse mathematics to a general mathematical audience for the first time. Reverse mathematics is a new field that answers some old questions. In the two thousand years that mathematicians have been deriving theorems from axioms, it has often been asked: which axioms are needed to prove a given theorem? Only in the last two hundred years have some of these questions been answered, and only in the last forty years has a systematic approach been developed. In (...)
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  15.  70
    Husserl’s relevance for the philosophy and foundations of mathematics.Guillermo E. Rosado Haddock - 1997 - Axiomathes 8 (1):125-142.
  16.  23
    Proof, Generality and the Prescription of Mathematical Action: A Nanohistorical Approach to Communication.Karine Chemla - 2015 - Centaurus 57 (4):278-300.
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  17.  18
    Editorial Preface: Thought Experiments in Mathematics.Evandro Agazzi & Marco Buzzoni - 2023 - Global Philosophy 33 (1):1-5.
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  18.  59
    On the Tension Between Physics and Mathematics.Miklós Rédei - 2020 - Journal for General Philosophy of Science / Zeitschrift für Allgemeine Wissenschaftstheorie 51 (3):411-425.
    Because of the complex interdependence of physics and mathematics their relation is not free of tensions. The paper looks at how the tension has been perceived and articulated by some physicists, mathematicians and mathematical physicists. Some sources of the tension are identified and it is claimed that the tension is both natural and fruitful for both physics and mathematics. An attempt is made to explain why mathematical precision is typically not welcome in physics.
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  19.  40
    The ingénieur savant, 1800–1830 A Neglected Figure in the History of French Mathematics and Science.I. Grattan-Guinness - 1993 - Science in Context 6 (2):405-433.
    The ArgumentThis paper deals with the achievements of those French mathematicians active in the period 1800–1830 who oriented their work specifically around the needs of engineering and technology. In addition to a review of their achievements, the principal organizations and institutions are noted, as is their importance as sources of employment and influence.The argument is centered on the word ‘neglected“ in the title. A case is made that a mass of work was produced which made considerable impact at the time (...)
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  20.  19
    REVIEWS-Phenomenology, logic, and the philosophy of mathematics.R. Tieszen & Kai Hauser - 2007 - Bulletin of Symbolic Logic 13 (3):365-367.
    Offering a collection of fifteen essays that deal with issues at the intersection of phenomenology, logic, and the philosophy of mathematics, this 2005 book is divided into three parts. Part I contains a general essay on Husserl's conception of science and logic, an essay of mathematics and transcendental phenomenology, and an essay on phenomenology and modern pure geometry. Part II is focused on Kurt Godel's interest in phenomenology. It explores Godel's ideas and also some work of Quine, Penelope Maddy (...)
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  21.  22
    On the Epistemological Relevance of Social Power and Justice in Mathematics.Eugenie Hunsicker & Colin Jakob Rittberg - 2022 - Axiomathes 32 (3):1147-1168.
    In this paper we argue that questions about which mathematical ideas mathematicians are exposed to and choose to pay attention to are epistemologically relevant and entangled with power dynamics and social justice concerns. There is a considerable body of literature that discusses the dissemination and uptake of ideas as social justice issues. We argue that these insights are also relevant for the epistemology of mathematics. We make this visible by a journalistic exploration of relevant cases and embed our insights into (...)
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  22.  12
    General mathematical physics and schemas, application to the theory of particles.J. L. Destouches - 1965 - Dialectica 19 (3‐4):345-348.
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  23. The risk concept in medicine — statistical and epidemiological aspects: A case report for applied mathematics in cardiology.Thomas Kenner & Karl P. Pfeiffer - 1986 - Theoretical Medicine and Bioethics 7 (3).
    In this study the theory of risk factors is discussed. The risk-concept is essential in cardiology and is, furthermore, important not only in medicine in general, but also and particularly in ecology. Since environmental risk factors endanger our health, ecological risks have to be taken as medical problems. If a factor or a set of factors is a necessary but not a sufficient condition for a disease we speak of a risk factor or of risk factors. Statistical analysis of (...)
     
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  24. Leibniz on mathematics and the actually infinite division of matter.Samuel Levey - 1998 - Philosophical Review 107 (1):49-96.
    Mathematician and philosopher Hermann Weyl had our subject dead to rights.
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  25. Kant on the method of mathematics.Emily Carson - 1999 - Journal of the History of Philosophy 37 (4):629-652.
    In lieu of an abstract, here is a brief excerpt of the content:Kant on the Method of MathematicsEmily Carson1. INTRODUCTIONThis paper will touch on three very general but closely related questions about Kant’s philosophy. First, on the role of mathematics as a paradigm of knowledge in the development of Kant’s Critical philosophy; second, on the nature of Kant’s opposition to his Leibnizean predecessors and its role in the development of the Critical philosophy; and finally, on the specific role of (...)
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  26.  40
    Hilary Putnam’s Contributions to Mathematics, Logic, and the Philosophy Thereof.Geoffrey Hellman - 2017 - The Harvard Review of Philosophy 24:117-119.
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  27.  47
    Non-Newtonian Mathematics Instead of Non-Newtonian Physics: Dark Matter and Dark Energy from a Mismatch of Arithmetics.Marek Czachor - 2020 - Foundations of Science 26 (1):75-95.
    Newtonian physics is based on Newtonian calculus applied to Newtonian dynamics. New paradigms such as ‘modified Newtonian dynamics’ change the dynamics, but do not alter the calculus. However, calculus is dependent on arithmetic, that is the ways we add and multiply numbers. For example, in special relativity we add and subtract velocities by means of addition β1⊕β2=tanh+tanh-1)\documentclass[12pt]{minimal} \usepackage{amsmath} \usepackage{wasysym} \usepackage{amsfonts} \usepackage{amssymb} \usepackage{amsbsy} \usepackage{mathrsfs} \usepackage{upgreek} \setlength{\oddsidemargin}{-69pt} \begin{document}$$\beta _1\oplus \beta _2=\tanh \big +\tanh ^{-1}\big )$$\end{document}, although multiplication β1⊙β2=tanh·tanh-1)\documentclass[12pt]{minimal} \usepackage{amsmath} \usepackage{wasysym} \usepackage{amsfonts} \usepackage{amssymb} \usepackage{amsbsy} (...)
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  28.  53
    On the proof-theoretic strength of monotone induction in explicit mathematics.Thomas Glaß, Michael Rathjen & Andreas Schlüter - 1997 - Annals of Pure and Applied Logic 85 (1):1-46.
    We characterize the proof-theoretic strength of systems of explicit mathematics with a general principle asserting the existence of least fixed points for monotone inductive definitions, in terms of certain systems of analysis and set theory. In the case of analysis, these are systems which contain the Σ12-axiom of choice and Π12-comprehension for formulas without set parameters. In the case of set theory, these are systems containing the Kripke-Platek axioms for a recursively inaccessible universe together with the existence of a (...)
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  29. Aristotle’s prohibition rule on kind-crossing and the definition of mathematics as a science of quantities.Paola Cantù - 2010 - Synthese 174 (2):225-235.
    The article evaluates the Domain Postulate of the Classical Model of Science and the related Aristotelian prohibition rule on kind-crossing as interpretative tools in the history of the development of mathematics into a general science of quantities. Special reference is made to Proclus’ commentary to Euclid’s first book of Elements , to the sixteenth century translations of Euclid’s work into Latin and to the works of Stevin, Wallis, Viète and Descartes. The prohibition rule on kind-crossing formulated by Aristotle in (...)
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  30.  29
    Concepts of general topology in constructive mathematics and in sheaves.R. J. Grayson - 1981 - Annals of Mathematical Logic 20 (1):1.
  31. Philosophical grammar: part I, The proposition, and its sense, part II, On logic and mathematics.Ludwig Wittgenstein - 1974 - Berkeley: University of California Press. Edited by Rush Rhees.
    i How can one talk about 'understanding' and 'not understanding' a proposition? Surely it is not a proposition until it's understood ? ...
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  32.  22
    Relational Quantum Mechanics and Intuitionistic Mathematics.Charles B. Crane - 2024 - Foundations of Physics 54 (3):1-12.
    We propose a model of physics that blends Rovelli’s relational quantum mechanics (RQM) interpretation with the language of finite information quantities (FIQs), defined by Gisin and Del Santo in the spirit of intuitionistic mathematics. We discuss deficiencies of using real numbers to model physical systems in general, and particularly under the RQM interpretation. With this motivation for an alternative mathematical language, we propose the use of FIQs to model the world under the RQM interpretation, wherein we view the propensities (...)
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  33.  55
    Space, time, and gravitation: an outline of the general relativity theory.Arthur Stanley Eddington - 1920 - Cambridge [Eng.]: University Press.
    The aim of this book is to give an account of Einstein's work without introducing anything very technical in the way of mathematics, physics, or philosophy.
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  34.  39
    A Case for Realism in Mathematics.Tom Keagy - 1994 - The Monist 77 (3):329-344.
    In an attempt to justify research efforts in various branches of science, scholars have tried to capture the essence of the relevant subject-matters in a definition, or at least have declared these subject-matters to exist. Otherwise the study of topics in the branches would be of questionable value, to say the least. For example, when dealing with numbers, their ontological status somehow has to be declared.
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  35. Ontology and mathematics.Charles Parsons - 1971 - Philosophical Review 80 (2):151-176.
  36.  25
    Jens Erik Fenstad.*Structures and Algorithms: Mathematics and the Nature of Knowledge.Julian C. Cole - 2023 - Philosophia Mathematica 31 (1):125-131.
    This book collects eight essays — written over multiple decades, for a general audience — that address Fenstad’s thoughts on the topics of what there is and how.
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  37. Kant’s Philosophy of Mathematics and the Greek Mathematical Tradition.Daniel Sutherland - 2004 - Philosophical Review 113 (2):157-201.
    The aggregate EIRP of an N-element antenna array is proportional to N 2. This observation illustrates an effective approach for providing deep space networks with very powerful uplinks. The increased aggregate EIRP can be employed in a number of ways, including improved emergency communications, reaching farther into deep space, increased uplink data rates, and the flexibility of simultaneously providing more than one uplink beam with the array. Furthermore, potential for cost savings also exists since the array can be formed using (...)
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  38. The Epistemological Subject(s) of Mathematics.Silvia De Toffoli - 2024 - In Bharath Sriraman (ed.), Handbook of the History and Philosophy of Mathematical Practice. Cham: Springer. pp. 2880-2904.
    Paying attention to the inner workings of mathematicians has led to a proliferation of new themes in the philosophy of mathematics. Several of these have to do with epistemology. Philosophers of mathematical practice, however, have not (yet) systematically engaged with general (analytic) epistemology. To be sure, there are some exceptions, but they are few and far between. In this chapter, I offer an explanation of why this might be the case and show how the situation could be remedied. I (...)
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  39.  28
    Charles Peirce: Meaning, Mathematics, and “Pragmatic Schemata”.Sandra B. Rosenthal - 1983 - Southern Journal of Philosophy 21 (4):575-583.
  40.  44
    Collected Papers of Charles Sanders Peirce: Vol. III, Exact LogicCollected Papers of Charles Sanders Peirce: Vol. IV, The Simplest Mathematics.H. G. Townsend - 1935 - Philosophical Review 44 (1):85.
  41. Aristotle’s argument from universal mathematics against the existence of platonic forms.Pieter Sjoerd Hasper - 2019 - Manuscrito 42 (4):544-581.
    In Metaphysics M.2, 1077a9-14, Aristotle appears to argue against the existence of Platonic Forms on the basis of there being certain universal mathematical proofs which are about things that are ‘beyond’ the ordinary objects of mathematics and that cannot be identified with any of these. It is a very effective argument against Platonism, because it provides a counter-example to the core Platonic idea that there are Forms in order to serve as the object of scientific knowledge: the universal of which (...)
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  42.  83
    Sir John Herschel on Hindu Mathematics.John Herschel - 1915 - The Monist 25 (2):297-300.
  43. The inevitability of logical strength: Strict reverse mathematics.Harvey Friedman - manuscript
    An extreme kind of logic skeptic claims that "the present formal systems used for the foundations of mathematics are artificially strong, thereby causing unnecessary headaches such as the Gödel incompleteness phenomena". The skeptic continues by claiming that "logician's systems always contain overly general assertions, and/or assertions about overly general notions, that are not used in any significant way in normal mathematics. For example, induction for all statements, or even all statements of certain restricted forms, is far too (...) - mathematicians only use induction for natural statements that actually arise. If logicians would tailor their formal systems to conform to the naturalness of normal mathematics, then various logical difficulties would disappear, and the story of the foundations of mathematics would look radically different than it does today. In particular, it should be possible to give a convincing model of actual mathematical practice that can be proved to be free of contradiction using methods that lie within what Hilbert had in mind in connection with his program”. Here we present some specific results in the direction of refuting this point of view, and introduce the Strict Reverse Mathematics (SRM) program. (shrink)
     
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  44.  25
    A Philosophy of Mathematics.S. C. Kleene - 1949 - Philosophical Review 58 (2):187.
  45. Thomists and Thomas Aquinas on the Foundation of Mathematics.Armand Maurer - 1993 - Review of Metaphysics 47 (1):43 - 61.
    SOME MODERN THOMISTS claiming to follow the lead of Thomas Aquinas, hold that the objects of the types of mathematics known in the thirteenth century, such as the arithmetic of whole numbers and Euclidean geometry, are real entities. In scholastic terms they are not beings of reason but real beings. In his once-popular scholastic manual, Elementa Philosophiae Aristotelico-Thomisticae, Joseph Gredt maintains that, according to Aristotle and Thomas Aquinas, the object of mathematics is real quantity, either discrete quantity in arithmetic or (...)
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  46.  67
    On Philosophy of Mathematics.Charles Parsons - 2010 - The Harvard Review of Philosophy 17 (1):137-150.
  47.  42
    Descartes’ Method and the Revival of Interest in Mathematics.A. J. Snow - 1923 - The Monist 33 (4):611-617.
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  48. Kant and the foundations of mathematics.Philip Kitcher - 1975 - Philosophical Review 84 (1):23-50.
    T HE heart of Kant's views on the nature of mathematics is his thesis that the judgments of pure mathematics are synthetic a priori. Kant usually offers this as one thesis, but it is fruitful to regard it as consisting of two separate claims, a meta- physical subthesis and an epistemological ..
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  49.  23
    Toward a General Theory of Fiction.James D. Parsons - 1983 - Philosophy and Literature 7 (1):92-94.
    In lieu of an abstract, here is a brief excerpt of the content:TOWARD A GENERAL THEORY OF FICTION by James D. Parsons When nelson Goodman writes, "All fiction is literal, literary falsehood," he seems to be disregarding at least one noteworthy tradition.1 The tradition I have in mind includes works by Jeremy Bendiam, Hans Vaihinger, Tobias Dantzig, Wallace Stevens, and a host ofother writers in many fields who have been laboring for more man two centuries to clear the ground (...)
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  50.  9
    Determining an Evidence Base for Particular Fields of Educational Practice: A Systematic Review of Meta-Analyses on Effective Mathematics and Science Teaching.Maximilian Knogler, Andreas Hetmanek & Tina Seidel - 2022 - Frontiers in Psychology 13.
    The call for evidence-based practice in education emphasizes the need for research to provide evidence for particular fields of educational practice. With this systematic literature review we summarize and analyze aggregated effectiveness information from 41 meta-analyses published between 2004 and 2019 to inform evidence-based practice in a particular field. In line with target specifications in education that are provided for a certain school subject and educational level, we developed and adopted a selection heuristic for filtering aggregated effect sizes specific to (...)
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