Oxford, : Oxford University Press, 2012

1-283-71345-4

0-19-163736-X

1 online resource (289 p.)

510.711

Mathematics - Study and teaching (Higher)

Mathematics - Vocational guidance

Electronic books.

Inglese

Description based upon print version of record.

Cover; Contents; Symbols; Introduction; Part 1 Mathematics; 1 Calculation Procedures; 1.1 Calculation at school and at university; 1.2 Decisions about and within procedures; 1.3 Learning from few (or no) examples; 1.4 Generating your own exercises; 1.5 Writing out calculations; 1.6 Checking for errors; 1.7 Mathematics is not just procedures; 2 Abstract Objects; 2.1 Numbers as abstract objects; 2.2 Functions as abstract objects; 2.3 What kind of object is that, really?; 2.4 Objects as the results of procedures; 2.5 Hierarchical organization of objects; 2.6 Turning processes into objects

2.7 New objects: relations and binary operations2.8 New objects: symmetries; 3 Definitions; 3.1 Axioms, definitions and theorems; 3.2 What are axioms?; 3.3 What are definitions?; 3.4 What are theorems?; 3.5 Understanding definitions: even numbers; 3.6 Understanding definitions: increasing functions; 3.7 Understanding definitions: commutativity; 3.8 Understanding definitions: open sets; 3.9 Understanding definitions: limits; 3.10 Definitions and intuition; 4 Theorems; 4.1 Theorems and logical necessity; 4.2 A simple theorem about integers; 4.3 A theorem about functions and derivatives

4.4 A theorem with less familiar objects4.5 Logical language: 'if '; 4.6 Logical language: everyday uses of 'if '; 4.7 Logical language: quantifiers; 4.8 Logical language: multiple quantifiers; 4.9 Theorem

rephrasing; 4.10 Understanding: logical form and meaning; 5 Proof; 5.1 Proofs in school mathematics; 5.2 Proving that a definition is satisfied; 5.3 Proving general statements; 5.4 Proving general theorems using definitions; 5.5 Definitions and other representations; 5.6 Proofs, logical deductions and objects; 5.7 Proving obvious things

5.8 Believing counterintuitive things: the harmonic series5.9 Believing counterintuitive things: Earth and rope; 5.10 Will my whole degree be proofs?; 6 Proof Types and Tricks; 6.1 General proving strategies; 6.2 Direct proof; 6.3 Proof by contradiction; 6.4 Proof by induction; 6.5 Uniqueness proofs; 6.6 Adding and subtracting the same thing; 6.7 Trying things out; 6.8 'I would never have thought of that'; 7 Reading Mathematics; 7.1 Independent reading; 7.2 Reading your lecture notes; 7.3 Reading for understanding; 7.4 Reading for synthesis; 7.5 Using summaries for revision

7.6 Reading for memory7.7 Using diagrams for memory; 7.8 Reading proofs for memory; 8 Writing Mathematics; 8.1 Recognizing good writing; 8.2 Why should a student write well?; 8.3 Writing a clear argument; 8.4 Using notation correctly; 8.5 Arrows and brackets; 8.6 Exceptions and mistakes; 8.7 Separating out the task of writing; Part 2 Study Skills; 9 Lectures; 9.1 What are lectures like?; 9.2 What are lecturers like?; 9.3 Making lectures work for you; 9.4 Tackling common problems; 9.5 Learning in lectures; 9.6 Courtesy in lectures; 9.7 Feedback on lectures; 10 Other People

10.1 Lecturers as teachers

Every year, thousands of students go to university to study mathematics (single honours or combined with another subject). Many of these students are extremely intelligent and hardworking, but even the best will, at some point, struggle with the demands of making the transition to advanced mathematics. Some have difficulty adjusting to independent study and to learning from lectures. Other struggles, however, are more fundamental: the mathematics shifts in focus from calculation toproof, so students are expected to interact with it in different ways. These changes need not be mysterious - math

Paris, : Presses Sorbonne Nouvelle, 2018

2-87854-828-0

1 online resource (232 p.)

CheminaudJulie

KauffmannMichel

MerlioGilbert

PietraLaurent

PoirierNicolas

RiderJacques Le

StiegGerald

TurinGaspard

VatanFlorence

VoeltzelNicolas

WintermeyerRolf

WittmannJean-Michel

Originality

Subject (Philosophy)

Individuality - Philosophy

Francese

Qu'elle soit une valeur, un mythe, une idéologie moderne ou la garante d'un nouveau réalisme libre de toute idéologie, la singularité est toujours un parti-pris. Ainsi la singularité du Robinson de Defoe fait-elle oublier l'invraisemblance psychologique flagrante de sa performance solitaire et forge-t-elle le rêve démiurgique moderne de l'individu auto-suffisant et autonome. Le parti pris peut être nominaliste - car le nominalisme (Occam, Mauthner, Stirner, Nietzsche…) ne connaît d'objets que particuliers -, subjectiviste

(Rousseau, Goethe…), esthétique (Huysmans, Wilde, Barrès…), nationaliste (Barrès encore…) ou prendre la forme d'une stigmatisation assimilant génie et folie, exception et idiotie…  Les Figures de la singularité explorent l'aspect nominaliste jusque dans ses variantes « quelconques » (Clément Rosset, G. Agamben) et la philosophie du sujet de l'époque idéaliste jusque dans ses conséquences solipsistes (Fichte). Elles s'intéressent à la singularité biographique et narrative de l'époque moderne et à la diversité de ses incarnations : artistes créateurs d'eux-mêmes, rebelles, dissidents… Comme aurait dit Nietzsche, c'est un thème pour chacun et personne, au croisement de la philosophie, de la littérature et de l'imaginaire collectif.