Elements of the Theory of Integers |
Contents
| 82 | |
| 85 | |
| 86 | |
| 88 | |
| 97 | |
| 98 | |
| 105 | |
| 114 | |
| 20 | |
| 24 | |
| 25 | |
| 27 | |
| 28 | |
| 31 | |
| 32 | |
| 34 | |
| 47 | |
| 50 | |
| 52 | |
| 56 | |
| 57 | |
| 58 | |
| 59 | |
| 61 | |
| 65 | |
| 66 | |
| 67 | |
| 69 | |
| 76 | |
| 77 | |
| 120 | |
| 122 | |
| 128 | |
| 131 | |
| 141 | |
| 145 | |
| 153 | |
| 161 | |
| 169 | |
| 173 | |
| 177 | |
| 182 | |
| 183 | |
| 188 | |
| 196 | |
| 201 | |
| 222 | |
| 230 | |
| 242 | |
| 249 | |
Other editions - View all
Common terms and phrases
a₁ a₂ ab₁ algebraic sum Axiom b₁ b₂ bers c₁ c₂ calld Chrystal commutativ law complex sum Definition direct theorem Distributiv divided by ẞ divisor elements Encyklopädie expression follows immediately formd given integer given number givs greater greatest common factor hav a series Hence Therfor hypothetical statement law for addition Law for Multiplication least common multiple left-handed lower approximate quotient Major Premis method of exhaustion minus sign natural series negativ integer number of objects numerical value odd integer operation opposit P₁ parentheses positiv factors primary numbers prime factor prime positiv integers proof represent respectivly reverse the steps right-handed Schubert series of integers series of numbers Similarly ẞ is positiv ẞ is zero ßò ẞr Stolz und Gmeiner subtraction syllogism symbol Tannery tegers theorem is proved univalent wher write the numbers zero integers α₂ φβ