| LDR | 00909cam a22002055 44500 | ||
| 001 | 010363688 | ||
| 003 | MiAaHDL | ||
| 005 | 39008056000000.0 | ||
| 006 | m d | ||
| 007 | cr bn ---auaua | ||
| 008 | 980918s1892 gw 000 0 ger d | ||
| 035 | ⊔ | ⊔ | ‡asdr-njp.9920843253506421 |
| 035 | ⊔ | ⊔ | ‡z(NjP)Voyager2084325 |
| 035 | ⊔ | ⊔ | ‡a(OCoLC)39894755 |
| 035 | ⊔ | ⊔ | ‡a(NjP)2084325-princetondb |
| 035 | ⊔ | ⊔ | ‡9CHW1170TS |
| 040 | ⊔ | ⊔ | ‡aPUL ‡beng ‡cPUL |
| 100 | 1 | ⊔ | ‡aGoldschmidt, Ludwig. |
| 245 | 0 | 0 | ‡aÜber den Satz Eulers: (1-x)(1-x²)(1-x³)...=[sum from zero to infinity](-1)n̳ x 3̳n̳²̳[̳p̳l̳u̳s̳o̳r̳m̳i̳n̳u̳s̳]̳n̳/2̳. |
| 260 | ⊔ | ⊔ | ‡a[Gotha] ‡c1892. |
| 300 | ⊔ | ⊔ | ‡a34 p. ‡c8vo. |
| 500 | ⊔ | ⊔ | ‡aOn t.-p., n̳ is superscript and 3̳n̳²̳[̳p̳l̳u̳s̳o̳r̳m̳i̳n̳u̳s̳]n̳ appears as the numerator of a fraction, 2̳ as the denominator. |
| 538 | ⊔ | ⊔ | ‡aMode of access: Internet. |
| CID | ⊔ | ⊔ | ‡a010363688 |
| DAT | 0 | ⊔ | ‡a20221218212540.0 ‡b39008056000000.0 |
| DAT | 1 | ⊔ | ‡a20240806140512.0 ‡b2024-08-07T05:08:19Z |
| DAT | 2 | ⊔ | ‡a2023-12-10T18:30:01Z |
| CAT | ⊔ | ⊔ | ‡aSDR-NJP ‡cnjp ‡dALMA ‡lprepare.pl-004-008 |
| FMT | ⊔ | ⊔ | ‡aBK |
| HOL | ⊔ | ⊔ | ‡0sdr-njp.9920843253506421 ‡anjp ‡bSDR ‡cNJP ‡f2084325 ‡pnjp.32101075302487 ‡sNJP ‡19920843253506421 |
| 974 | ⊔ | ⊔ | ‡bNJP ‡cNJP ‡d20240807 ‡sgoogle ‡unjp.32101075302487 ‡y1892 ‡rpd ‡qbib ‡tnon-US bib date1 < 1899 |