To this result annex all the letters of the dividend, giving to each an exponent equal to the excess of its exponent in the dividend above that in the divisor. Elements of Algebra - Page 21by Bourdon (M., Louis Pierre Marie) - 1831 - 304 pagesFull view - About this book
| Charles Davies - Algebra - 1835 - 378 pages
...quotient, after the co-efficient, all the tellers common to tlie dividend and divisor, and affect each with an exponent equal to the excess of its exponent in the dividend over that in the divisor. III. Annex to these, those letters of the dividend, with their respective... | |
| Charles Davies - Algebra - 1839 - 264 pages
...quotient, after the coefficient, all the letters common to the dividend and divisor, and affect each with an exponent equal to the excess of its exponent in the dividend over that in the divisor. III. Annex to these, those letters of the dividend, with their respective... | |
| Charles Davies - Algebra - 1842 - 368 pages
...quotient, after the co-efficient, all the letters common to the dividend and divisor, and affect each with an exponent equal to the excess of its exponent in the dividend over that in the divisor. III. Annex to these, those letters of the dividend, with their respective... | |
| Charles Davies - Algebra - 1842 - 284 pages
...quotient, after the coefficient, all the letters common to the dividend and divisor, and affect each with an exponent equal to the excess of its exponent in the dividend over that in the divisor. III. Annex to these, those letters of the dividend, with their respective... | |
| Charles Davies - Algebra - 1845 - 382 pages
...co-efficient. II. Write after this co-efficient, all the letters of the dividend, and affect each with an exponent equal to the excess of its exponent in the dividend over that in the divisor. From this rule we find, _____ . __ 1. Divide I6x2 by 80;. 2. Divide 15a2xy3... | |
| Charles Davies - Algebra - 1848 - 300 pages
...coefficient. II. Write after this coefficient, all the letters of the dividend, and affect each with an exponent equal to the excess of its exponent in the dividend over that in the divisor. From these rules we find 48<zWW IGOefVcf — -- 12ai2c 1. Divide 2. Divide... | |
| Charles Davies, William Guy Peck - Electronic book - 1855 - 592 pages
...of the quotient ; after this, write all the letters which enter the dividend and divisor, giving to each an exponent equal to the excess of its exponent in the dividend over that in the divisor; the result is the quotient letter, is not exactly divisible by the term of... | |
| Elias Loomis - Algebra - 1868 - 386 pages
...divisor, for a new coefficient. 2. To this result annex all the letters of the dividend, giving to each an exponent equal to the excess of its exponent in the dividend above that in the divisor. 3. If the dividend and divisor have like signs, prefix the plus sign to the quotient; but if they have... | |
| Elias Loomis - Algebra - 1873 - 396 pages
...divisor, for a new coefficient. 2. To this result annex all the letters of the dividend, giving to each an exponent equal to the excess of its exponent in the dividend above that in the divisor. 3. If the dividend and divisor have like signs, prefix the plus sign to the quotient; but if they have... | |
| Horatio Nelson Robinson - Algebra - 1875 - 340 pages
...for the coefficient of the quotient. II. Write the letters of the dividend in the quotient, giving to each an exponent equal to the excess of its exponent in the dividend over that in the divisor, and suppress all letters whose exponents become zero. III. If the signs of... | |
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