Autore	Krantz Steven G (Steven George), <1951->
Pubbl/distr/stampa	[Washington, D.C.], : Mathematical Association of America, c2010
Descrizione fisica	1 online resource (396 p.)
Disciplina	510.9
Collana	AMS/MAA Textbooks MAA textbooks
Soggetto topico	Mathematics - History - Study and teaching (Higher) Mathematics Mathematics - Study and teaching (Higher) Mathematicians
ISBN	1-61444-605-9
Classificazione	31.01
Formato	Materiale a stampa
Livello bibliografico	Monografia
Lingua di pubblicazione	eng
Nota di contenuto	The ancient Greeks and the foundations of mathematics -- Zeno's paradox and the concept of limit -- The mystical mathematics of Hypatia -- The Islamic world and the development of algebra -- Cardano, Abel, Galois, and the solving of equations -- René Descartes and the idea of coordinates -- Pierre de Fermat and the invention of differential calculus -- The great Isaac Newton -- The complex numbers and the fundamental theorem of algebra -- Carl Friedrich Gauss: the prince of mathematics -- Sophie Germain and the attack on Fermat's last problem -- Cauchy and the foundations of analysis -- The prime numbers -- Dirichlet and how to count -- Bernhard Riemann and the geometry of surfaces -- Georg Cantor and the orders of infinity -- The number systems -- Henri Poincaré, child phenomenon -- Sonya Kovalevskaya and the mathematics of mechanics -- Emmy Noether and algebra -- Methods of proof -- Alan Turing and cryptography.
Record Nr.	UNINA-9910785723603321

Edizione	[1st ed.]
Pubbl/distr/stampa	Münster : , : WTM Verlag für wissenschaftliche Texte und Medien, , [2019]
Descrizione fisica	1 online resource (199 pages)
Disciplina	510.711
Collana	Schriften zur Hochschuldidaktik Mathematik
Soggetto topico	Mathematics - Study and teaching (Higher)
ISBN	3-95987-098-1
Formato	Materiale a stampa
Livello bibliografico	Monografia
Lingua di pubblicazione	ger
Nota di contenuto	Intro -- Inhalt -- Klinger, Marcel -- Schüler-Meyer, Alexander -- Wessel, Lena -- Vielfalt, die verbindet: Der Übergang Schule-Hochschule im Rahmen des Hanse-Kolloquiums zur Hochschuldidaktik der Mathematik 2018 in Essen -- Barzel, Bärbel -- Von der Herausforderung, die Hochschuleingangsphase in Mathematik konstruktiv zu gestalten - Strukturen und Aufgaben -- Rønning, Frode -- Interaktion, Aktivität und Sprachförderung beim Lernen von Hochschulmathematik - Beispiele aus einem Norwegischen Entwicklungsprojekt -- Sarikaya, Nimet -- Furlan, Peter -- Ein Vergleich von Unterstützungsmaßnahmen im ersten Studienjahr zwischen Fachhochschule und Universität -- Altieri, Mike -- Schellenbach, Michael -- Schirmer, Evelyn -- Opfermann, Christiane -- Kunze, Jan Erik -- Regnet, Julian -- Paluch, Dirk -- Unreal Engine 4 trifft H5P und PBL - Integration einer virtuellen Realität mit interaktiven Erklärvideos in ein digitales Fachkonzept zur Unterstützung problembasierten Lernens -- Bach, Volker -- Barbas, Helena -- Gasser, Ingenuin -- Konieczny, Franz -- Lohse, Alexander -- Seiler, Ruedi -- Formatives Assessment in Mathe-Kursen für Erstsemester: Digitalisierung eine Chance? -- Bauer, Thomas -- Design von Aufgaben für Peer Instruction zum Einsatz in Übungsgruppen zur Analysis -- Blum, Silvia -- Diskontinuität in der Linearen Algebra: Was bedeutet der höhere Standpunkt? - Konkretisierung einer Denkfigur und qualitative Untersuchungen zu verschiedenen Zeitpunkten in der LehrerInnenbiografie -- Feil, Lidia -- Strauer, Dorothea -- Zwingmann, Katharina -- Entwurf und Einsatz von Lösungsbeispielen mit Lücken und Selbsterklärungsaufforderungen in Mathematikveranstaltungen für Studierende der Pharmazie und der Biologie -- Fleischmann, Yael -- Kempen, Leander -- Mai, Tobias -- Biehler, Rolf. Die Online-Lernmaterialien von studiVEMINT: Einsatzszenarien im Blended Learning Format in mathematischen Vorkursen -- Lankeit, Elisa -- Biehler, Rolf -- Vorstellung einer Aufgabe zu den Zusammenhängen verschiedener Differenzierbarkeitsbegriffe im Mehrdimensionalen -- Moser-Fendel, Jeremias -- Wessel, Lena -- Klinger, Marcel -- Was bringen StudienanfängerInnen mit? - Konzeptualisierung des Vorwissens zu Algebra und Funktionen von Erstsemesterstudierenden in INT-Studiengängen -- Neuhaus, Silke -- Rach, Stefanie -- Situationales Interesse von Lehramtsstudierenden für hochschulmathematische Themen steigern -- Oldenburg, Reinhard -- Genetische Ideen in der Analysis I -- Stuhlmann, Ann Sophie -- Kooperative Beweisprozesse Mathematiklehramtsstudierender in der Studieneingangsphase -- Weygandt, Benedikt -- Skutella, Katharina -- Blick nach vorne, Blick zurück: Ein Lehrkonzept für Bachelor- und Masterstudierende zur Überbrückung beider Diskontinuitäten -- Wilzek, Wieland -- Interaktive dynamische Visualisierungen als Unterstützungsangebot im fachmathematischen Studium - Chancen und Gefahren der Anschauung.
Record Nr.	UNINA-9910794278903321

Pubbl/distr/stampa	[Washington, D.C.] : , : U.S. Government Accountability Office, , [2005]
Descrizione fisica	vi, 103 pages : digital, PDF file
Soggetto topico	Science - Study and teaching (Higher) Mathematics - Study and teaching (Higher) Engineering - Study and teaching (Higher) Technology - Study and teaching (Higher)
Formato	Materiale a stampa
Livello bibliografico	Monografia
Lingua di pubblicazione	eng
Altri titoli varianti	Higher education
Record Nr.	UNINA-9910694887403321

Autore	Alcock Lara
Pubbl/distr/stampa	Oxford, : Oxford University Press, 2012
Descrizione fisica	1 online resource (289 p.)
Disciplina	510.711
Soggetto topico	Mathematics - Study and teaching (Higher) Mathematics - Vocational guidance
Soggetto genere / forma	Electronic books.
ISBN	1-283-71345-4 0-19-163736-X
Formato	Materiale a stampa
Livello bibliografico	Monografia
Lingua di pubblicazione	eng
Nota di contenuto	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
Record Nr.	UNINA-9910462168003321

Pubbl/distr/stampa	[Cham, Switzerland] : , : Springer International Publishing AG, , 2015-
Descrizione fisica	1 online resource
Soggetto topico	Mathematics - Study and teaching (Higher)
Soggetto genere / forma	Periodicals. Zeitschrift
ISSN	2198-9753
Formato	Materiale a stampa
Livello bibliografico	Periodico
Lingua di pubblicazione	eng
Record Nr.	UNINA-9910481989203321