000 | 01126 a2200217 4500 | ||
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008 | 230220b |||||||| |||| 00| 0 eng d | ||
020 | _a9781077254541 (PB) | ||
041 | _aeng | ||
080 |
_a517.51 _bCUM |
||
100 | _aCummings,Jay | ||
245 |
_aReal Analysis _b A Long-Form Mathematics Textbook |
||
250 | _aSecond | ||
260 |
_bLongFormMath.com _c2019 _aSacramento |
||
300 | _aviii,431 p | ||
505 | _aThe reals Cardinality Sequences Series The topology of R Continuity Differentiation Integration Sequences and series of functions | ||
520 | _aRather than the typical definition-theorem-proof-repeat style, this text includes much more commentary, motivation and explanation. The proofs are not terse, and aim for understanding over economy. Furthermore, dozens of proofs are preceded by 'scratch work' or a proof sketch to give students a big-picture view and an explanation of how they would come up with it on their own. Examples often drive the narrative and challenge the intuition of the reader. | ||
650 | _aMathematical analysis | ||
650 | _aSet Theory | ||
690 | _aMathematics | ||
942 | _cBK | ||
999 |
_c59370 _d59370 |