| Silvestre François Lacroix - Algebra - 1818 - 422 pages
...performed by multiplying successively, according to the rides given for simple quantities (21 — 26), all the terms of the multiplicand by each term of the multiplier, and by observing that each particular product must have the same sign, as the corresponding part of... | |
| Warren Colburn - Algebra - 1825 - 400 pages
...examples and observations, we derive the following general rule for multiplying compound quantities. 1. Multiply all the terms of the multiplicand by each term of the multiplier, observing the same rules for the coefficients and letters as in simple quantities. 2. With respect to the signs... | |
| Adrien Marie Legendre - 1825 - 570 pages
...performed by multiplying successively according to the rules given for simple quantities (21 — 26), all the terms of the multiplicand by each term of the multiplier, and by observing that each particular product must have the same sign, as the corresponding part of... | |
| Warren Colburn - Algebra - 1829 - 284 pages
...examples and observations, we derive the following general rule for multiplying compound quantities. 1. Multiply all the terms of the multiplicand by each term of the multiplier, observing the same rules for the coefficients and letters at in simple quantities. 2. With respect to the signs... | |
| Warren Colburn - Algebra - 1830 - 290 pages
...examples and observations, we derive the following general rule for multiply ing compound quantities. 1. Multiply all the terms of the multiplicand by each term of the mvltiplier, observing the same rules for the coefficients and letters as in simple quantities. 2. With... | |
| Silas Totten - Algebra - 1836 - 320 pages
...Multiply 15a3c26.Ty by 9a3c63«/2. Prod. 135 a^c^xy3. MULTIPLICATION OF POLYNOMIALS. ii RULE. (11.) Multiply all the terms of the multiplicand by each term of the multiplier separately, observing that the product of any two terms which have like signs, that is, both +, or... | |
| Luther Ainsworth - Arithmetic - 1837 - 306 pages
...right hand of the former, as its proper index will direct, and so continue, till you have multiplied all the terms of the multiplicand by each term of the multiplier, separately, then add the several products together, as in compound addition, and their sum will be... | |
| Algebra - 1838 - 372 pages
...fixing the rules in the memory. Hence, for the multiplication of polynomials we have the following RULE. Multiply all the terms of the multiplicand by each term of the multiplier, observing that like signs give plus in the product, and unlike signs minus. Then reduce the polynomial result to its simplest... | |
| Charles Davies - Algebra - 1839 - 272 pages
...multiplied by — , gives — . Hence, for the multiplication of polynomials we have the following RULE. Multiply all the terms of the multiplicand by each term of the multiplier, observing that like signs give plus in the product, and unlike signs minus. Then reduce the polynomial result to its simplest... | |
| Thomas Sherwin - Algebra - 1841 - 320 pages
...the preceding explanations, we derive the folowing RULE FOR THE MULTIPLICATION OF POLTIfOMI ALS. 1. Multiply all the terms of the multiplicand by each term of the multiplier separately, according to the rule for the multiplied H'on of simple quantities. XI. MULTIPLICATION... | |
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