Mathematics — The Music of ReasonSpringer Science & Business Media, 20 juli 1998 - 287 sidor This book is of interest for students of mathematics or of neighboring subjects like physics, engineering, computer science, and also for people who have at least school level mathematics and have kept some interest in it. Also good for younger readers just reaching their final school year of mathematics. |
Innehåll
II | 7 |
III | 8 |
IV | 12 |
V | 14 |
VI | 19 |
VII | 21 |
IX | 25 |
X | 26 |
LVII | 149 |
LVIII | 150 |
LIX | 152 |
LX | 161 |
LXII | 163 |
LXIII | 167 |
LXIV | 168 |
LXV | 169 |
XI | 28 |
XII | 29 |
XIII | 31 |
XIV | 33 |
XV | 35 |
XVI | 37 |
XVII | 41 |
XVIII | 45 |
XIX | 49 |
XX | 51 |
XXI | 56 |
XXII | 64 |
XXIII | 65 |
XXIV | 68 |
XXV | 70 |
XXVI | 72 |
XXVII | 77 |
XXIX | 78 |
XXX | 79 |
XXXI | 80 |
XXXII | 82 |
XXXIII | 86 |
XXXIV | 91 |
XXXV | 93 |
XXXVI | 95 |
XXXVII | 98 |
XXXVIII | 103 |
XXXIX | 105 |
XL | 108 |
XLI | 111 |
XLII | 113 |
XLIII | 118 |
XLIV | 119 |
XLV | 120 |
XLVI | 121 |
XLVII | 124 |
XLVIII | 128 |
XLIX | 129 |
L | 133 |
LI | 134 |
LII | 136 |
LIII | 139 |
LIV | 141 |
LV | 142 |
LVI | 146 |
LXVI | 170 |
LXVII | 172 |
LXVIII | 174 |
LXIX | 176 |
LXX | 179 |
LXXI | 181 |
LXXII | 183 |
LXXIII | 184 |
LXXIV | 187 |
LXXV | 190 |
LXXVI | 191 |
LXXVII | 192 |
LXXVIII | 195 |
LXXIX | 199 |
LXXX | 200 |
LXXXI | 203 |
LXXXII | 204 |
LXXXIII | 207 |
LXXXIV | 208 |
LXXXV | 213 |
LXXXVI | 215 |
LXXXVII | 216 |
LXXXVIII | 218 |
LXXXIX | 220 |
XC | 222 |
XCI | 224 |
XCII | 226 |
XCIII | 228 |
XCIV | 229 |
XCV | 230 |
XCVI | 233 |
XCVII | 234 |
XCVIII | 235 |
XCIX | 239 |
C | 241 |
CI | 245 |
CII | 246 |
CIV | 247 |
CV | 248 |
CVI | 250 |
CVII | 253 |
CVIII | 255 |
281 | |
282 | |
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algebraic algebraic geometry algebraic topology analysis angles Appendix arbitrary areas of mathematics arithmetic Axiom of Choice axioms Bezout's identity bijection calculation called Cantor Cauchy Chapter circle classes classical coefficients commutative complex numbers concept congruence considered curve Dedekind defined definition denoted Diophantus divisor element equation equipotent Euclid Euclidean Euclidean geometry Euler example exists fact Fermat field Figure formula functions Galois Gauss Gaussian integers geometry greatest common divisor Greeks Hilbert idea infinite set intuition isomorphism known length mathe mathematical objects mathematicians method metric space multiplication natural numbers nested intervals nineteenth century non-Euclidean notation obtained permutations plane polynomial possible prime numbers problems proof properties proved quadratic forms rational numbers real numbers relation satisfies segment sequence solution space square structure subgroup subset theorem topology triangle variables vector
Populära avsnitt
Sida v - Il est vrai que M. Fourier avait l'opinion que le but principal des Mathématiques était l'utilité publique et l'explication des phénomènes naturels; mais un philosophe comme lui aurait dû savoir que le but unique de la Science, c'est l'honneur de l'esprit humain, et que sous ce titre une question de nombres vaut autant qu'une question du système du monde.
Sida v - Algebraical Researches, Containing a Disquisition on Newton's Rule for the Discovery of Imaginary Roots, and an Allied Rule Applicable to a Particular Class of Equations, Together with a Complete Invariantive Determination of the Character of the Roots of the General Equation of the Fifth Degree, &c," Philosophical Transactions of the Royal Society of London 154 (1864): 579666, and Math.
Hänvisningar till den här boken
Oxford Users' Guide to Mathematics Eberhard Zeidler,W. Hackbusch,Hans Rudolf Schwarz Ingen förhandsgranskning - 2004 |
Proofs and Fundamentals: A First Course in Abstract Mathematics Ethan D. Bloch Ingen förhandsgranskning - 2000 |