| Mathematics - 1801 - 446 pages
...of the leading terms of the series, and place their indices over them, beginning with a cypher. 2. "Add together the most convenient indices, to make an index less by i than the number expressing the place of the term sought. 3. Multiply the terms of the geometrical... | |
| Nicolas Pike - Algebra - 1808 - 470 pages
...few of the leading terms of the series, as before., and place their indices aver them. L. MA •2. Add together the most convenient indices to make an index, less by 1, than the number expressing the place of the term sought. 3. Multiply the terms of the geometrical... | |
| Daniel Adams - Arithmetic - 1810 - 190 pages
...with their indices over ihurii. II. ЛЛ 1 together the moat convenient indices, to moke an index lass by one than the number of the term sought. III. Multiply together the piteare belonging to those indice*, and their product, multiplied by tbc/rsi term, will be the term... | |
| Samuel Webber - Arithmetic - 1812 - 260 pages
...of the leading terms of the series, and, place their indices over them, beginning with a cypher. 2. Add together the most convenient indices to make an index less by 1 than the number, expressing the place of the term sought. / . 3. Multiply the terms of the geometrical... | |
| Nathan Daboll - Arithmetic - 1817 - 252 pages
...of the leading terms of the series, and begin the indices with a cypher : Thus, 0, 1, 2, 3, &c. 2. Add together the most convenient indices to make an index less by 1 than the number expressing the place of the term sought. 3. Multiply the terms of the geometrical... | |
| Zadock Thompson - Arithmetic - 1826 - 176 pages
...of the leading terms of the series, and place their indices over them, beginning with a cipher, and add together the most convenient indices to make an index less by 1 than the number, expressing the place of the term sought. 2. Multiply the terms of the series belonging... | |
| Daniel Adams - Arithmetic - 1828 - 286 pages
...before. Heuce, When the first term, ratio, and number of terms, are given, to find the last term, — I.' Write down a few leading powers of the ratio with...to make an index less by one than the number of the f°rm sought. III. Multiply together the powers belonging to those indiess, and their product, multiplied... | |
| Daniel Adams - Arithmetic - 1828 - 266 pages
...before. Heuce, When the first term, ratio, and number of terms, are given, to find the last term, — I. Write down a few leading powers of the ratio with...Add together the most convenient indices, to make anindex less by one than the number of the term sought. 2. If the first term be 5, and the ratio 3,... | |
| William Kinne - 1829 - 246 pages
...indices stands over the second term; and 2 in the indices over the third term, &c, ; and, in this Q2 2. Add together the most convenient indices to make an index, less by 1 , than the number expressing the place of the term sought. 3. Multiply the terms of the geometrical... | |
| Daniel Adams - Arithmetic - 1830 - 294 pages
...before. Hence, When the first term, ratio, and number of terms, are given, to find the last term, — I. Write down a few leading powers of the ratio with...together the powers belonging to those indices, and their product, multiplied by the first term, will be the term sought. 2. If the first term be 5, and... | |
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