==Índice==
[[Archivo:Lakoff&Núñez WMCF tapa.jpg|220px|right]]
* Contents. vii‑.
* Acknowledgments. ix‑.
* Preface. xi‑.
* Introduction. pp. 1‑.
* Part I. The Embodiment of Basis Arithmetic. 13‑.
** 1. The Brain's Innate Arithmetic. ‑.
** 2. A Brief Introduction to the Cognitive Science of the Embodied Mind. 27‑.
** 3. Embodied Arithmetic: The Grounding Metaphors. 50‑.
** 4. Where Do the Laws of Arithmetic Come From? 77‑.
* Part II. Algebra, Logic and Sets. 105‑.
** 5. Essence and Algebra. 107‑.
** 6. Boole's Metaphor: Classes and Symbolic Logic. 121‑.
** 7. Sets and Hypersets. 140‑.
* Part III. The Embodiment of Infinity. 153‑.
** 8. The Basic Metaphor of Infinity. 155‑.
** 9. Real Numbers and Limits. 181‑.
** 10. Transfinite Numbers. 208‑.
** 11. Infinitesimals. 223‑.
* Part IV. Banning Space and Motion: The Discretization Program that Shaped Modern Mathematics. 257‑.
** 12. Points and the Continuum. 259‑.
** 13. Continuity for Numbers: The Triumph of Dedekind's Metaphors. 292‑.
** 14. Calculus Without Space or Motion: Weierstrass's Metaphorical Masterpiece. 306‑.
* Le trou normand: A Classic Paradox of Infinity. 325‑.
* Part V. Implications for the Philosophy of Mathematics. 335‑.
** 15. The Theory of Embodied Mathematics. 337‑.
** 16. The Philosophy of Embodied Mathematics. 364‑.
* Part VI. e<sup>πi</sup>+1=1=0: A Case Study of the Cognitive Structure of Classical Mathematics. 381‑.
** Case Study 1. Analytic Geometry and Trigonometry. 383‑.
** Case Study 2. What is ''e''? 399‑.
** Case Study 3. What is ''i''? 420‑.
** Case Study 4. e<sup>πi</sup>+1=1=0 —How the Fundamental Ideas of Classical Mathematics Fit Together. 433‑.
* References. 453‑.
* Index. 473‑.
==Sobre los autores==
George Lakoff es un lingüista. Rafael Núñez un psicólogo.
==El libro en la editorial==
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