Multiply each term of the multiplicand by each term of the multiplier, and add the products together. 2. 3. 0+6 c?b+cd 0+6 ab+cd* a?+ab aW+abcd ab+b2 +a1bcd?+c*ds a2+2a6+6 Elementary Algebra - Page 239by John Henry Tanner - 1904 - 364 pagesFull view - About this book
| Bourdon (M., Louis Pierre Marie) - Algebra - 1831 - 446 pages
...order to multiply together two polynomials composed entirely of additive terms, multiply successively each term of the multiplicand by each term of the multiplier, and add together all the products. If the terms are affected with coefficients and exponents, observe the... | |
| Charles Davies - Algebra - 1835 - 378 pages
...order to multiply together two polynomials composed entirely of additive terms, multiply successively each term of the multiplicand by each term of the multiplier, and add together all the products. If the terms are affected with co-efficients and exponents,observo the... | |
| Algebra - 1838 - 372 pages
...order to multiply together two polynomials composed entirely of additive terms, multiply successively each term of the multiplicand by each term of the multiplier, and add together all the products. If the terms are affected with co-efficients and exponents, observe... | |
| Charles Davies - Algebra - 1839 - 272 pages
...order to multiply together two polynomials composed entirely of additive terms : Multiply successively each term of the multiplicand by each term of the multiplier, and add together all the products. EXAMPLES. 1. Multiply ..... 3a2+ by ..... , 2o +56 The product, after... | |
| Charles Davies - Algebra - 1842 - 368 pages
...order to multiply together two polynomials com posed entirely of additive terms, multiply successively each term of the multiplicand by each term of the multiplier, and add together all the products. If the terms are affected with co-efficients and exponents, observe... | |
| Charles Davies - Algebra - 1842 - 284 pages
...order to multiply together two polynomials composed entirely of additive terms : Multiply successively each term of the multiplicand by each term of the multiplier, and add together all the products. EXAMPLES. 1. Multiply ..... 3a2+ 4a6+62 by ...... 2a + 5b _ 6a3+ 8cPb+2abz... | |
| Elias Loomis - Algebra - 1846 - 376 pages
...sign minus: (55.) The following rule then comprehends the whole doctrine of multiplication. Multiply each term of the multiplicand, by each term of the multiplier, and add together all the partial products, observing that like signs require + in the product, and unlike... | |
| Elias Loomis - Algebra - 1846 - 380 pages
...sign minus: (55.) The following rule then comprehends the whole doctrine of multiplication. Multiply each term of the multiplicand, by each term of the multiplier, and add together all tht partial products, observing that like signs require + in the product, and unlike... | |
| Joseph Ray - Algebra - 1848 - 252 pages
...each are positive, we have the following RULE, FOR MULTIPLYING ONE POLYNOMIAL BY ANOTHER. Multiply each term of the multiplicand by each term of the multiplier, and add the products together. 2. 3. a+ba?b+cd a+b ab+ciF a'+ab aV+abcd ab+b* a'+2ab+bi a'b'+a'bcd'+abcd+c1^... | |
| Stephen Chase - Algebra - 1849 - 348 pages
...See §67. Hence, we have, for the multiplication of polynomials, the following RULE. § 71. Multiply each term of the multiplicand by each term of the multiplier, and add the products. See Geom. §178. Cor. III. a.) This is precisely the method employed in Arithmetic.... | |
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