Mathematical Thought From Ancient to Modern Times, Volume 1, 3. sējumsOxford University Press, 1990. gada 1. marts - 432 lappuses The major creations and developments in mathematics from the beginnings in Babylonia and Egypt through the first few decades of the twentieth century are presented with clarity and precision in this comprehensive historical study. |
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| 15 | |
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| 21 | |
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XV | 25 |
XVI | 27 |
XVII | 28 |
XIX | 34 |
XX | 37 |
XXI | 42 |
XXII | 48 |
XXIII | 51 |
XXIV | 56 |
XXV | 57 |
XXVI | 58 |
XXVII | 60 |
XXVIII | 68 |
XXIX | 73 |
XXX | 77 |
XXXI | 80 |
XXXII | 81 |
XXXIII | 86 |
XXXIV | 88 |
XXXV | 89 |
XXXVI | 101 |
XXXVII | 103 |
XXXVIII | 105 |
XXXIX | 116 |
XL | 117 |
XLI | 119 |
XLII | 126 |
XLIII | 131 |
XLIV | 135 |
XLV | 145 |
XLVI | 146 |
XLVII | 147 |
XLVIII | 154 |
XLIX | 160 |
L | 162 |
LI | 166 |
LII | 168 |
LIII | 171 |
LIV | 173 |
LV | 176 |
LVI | 177 |
LXV | 202 |
LXVI | 203 |
LXVII | 205 |
LXVIII | 206 |
LXIX | 209 |
LXX | 211 |
LXXI | 213 |
LXXII | 216 |
LXXIII | 218 |
LXXIV | 220 |
LXXV | 221 |
LXXVI | 223 |
LXXVII | 227 |
LXXVIII | 231 |
LXXIX | 234 |
LXXX | 236 |
LXXXI | 237 |
LXXXII | 240 |
LXXXIII | 247 |
LXXXIV | 250 |
LXXXV | 251 |
LXXXVI | 259 |
LXXXVII | 263 |
LXXXVIII | 270 |
LXXXIX | 274 |
XC | 278 |
XCI | 285 |
XCII | 286 |
XCIII | 288 |
XCIV | 295 |
XCV | 299 |
XCVI | 302 |
XCVIII | 303 |
XCIX | 304 |
C | 308 |
CI | 317 |
CII | 325 |
CIII | 327 |
CIV | 335 |
CV | 342 |
CVII | 344 |
CVIII | 356 |
CIX | 370 |
CX | 380 |
CXI | 381 |
CXII | 383 |
Citi izdevumi - Skatīt visu
Mathematical Thought From Ancient to Modern Times, Volume 1, 1. sējums Morris Kline Ierobežota priekšskatīšana - 1990 |
Mathematical Thought From Ancient to Modern Times, 1. sējums Morris Kline Priekšskatījums nav pieejams - 1990 |
Bieži izmantoti vārdi un frāzes
angle Apollonius Arabs Archimedes Aristotle arithmetic and algebra Arithmetica astronomy axioms axis Babylonians became bodies Book calculation called Cardan century Chap chord circle classical concept cone conic sections construction coordinate geometry cube curves deductive definition Desargues Descartes Descartes's diameter Diophantus Dover reprint earth Egyptian ellipse equal equation Euclid Euclid's Elements Eudoxus example fact Fermat Figure fractions Galileo given Greek mathematics Hence Hindus Hipparchus History of Mathematics hyperbola ideas infinite integral irrational numbers Kepler knowledge Leibniz length magnitudes mathe mathematicians matics mechanics method method of exhaustion motion nature negative numbers Newton notation numbers obtained Pappus parabola Pascal period philosophy physical plane Plato principles problems Proclus proof Proposition proved Ptolemy Pythagoreans quadratic quantities ratio rectangle roots says sides solve sphere spherical square straight line symbols tangent theorem theory of numbers triangle trigonometry University velocity Vieta volumes whole numbers wrote