 In the multiplication of whole numbers, place the multiplier under the multiplicand, and multiply each term of the multiplicand by each term of the multiplier, writing the right-hand figure of each product obtained under the term of the multiplier which...  Elements of Algebra - Page 49by William Smyth - 1833 - 280 pagesFull view - About this book
 | George Edward Atwood - 1900 - 276 pages
...a polynomial. RULE. — Arrange the multiplicand and multiplier with reference to the same letter. Multiply each term of the multiplicand by each term of the multiplier, and add the partial products. EXAMPLES. 2- 3a263+ 2o64 +26* b3 — 6a464+ - 8a464+ a —b +2 c +x -3... | |
 | International Correspondence Schools - Coal mines and mining - 1900 - 314 pages
...Ans. (14) In the multiplication of whole numbers, place the multiplier under the multiplicand, and multiply each term of the multiplicand by each term of the multiplier, writing the right-hand figure of each product obtained under the term of the multiplier which produces... | |
 | International Correspondence Schools - 1900 - 282 pages
...thick. Л (46) In the multiplication of whole numbers, place the multiplier under the multiplicand, and multiply each term of the multiplicand by each term of the multiplier, writing the right-hand figure of each product obtained under the term of the multiplier which produces... | |
 | James Morford Taylor - Algebra - 1900 - 504 pages
...22. 2\3ab-4:a(c-2b')l. 23. 7ac-2{2c(a-3&)-3(5c-2Z»)a|. 79. To multiply one polynomial by another, Multiply each term of the multiplicand by each term of the multiplier, and add the resulting products. Proof. Let x + y + z be the multiplicand, and a + b the multiplier... | |
 | George Egbert Fisher, Isaac Joachim Schwatt - Algebra - 1900 - 484 pages
...3x7-3x5. This example illustrates the following method of multiplying a multinomial by a multinomial : Multiply each term of the multiplicand by each term of the multiplier, and add algebraically the resulting products. In general, (a + 6) (c + d - в) — a (c + d - e) +... | |
 | International Correspondence Schools - Correspondence schools and courses - 1901 - 302 pages
...thick. 2 (46) In the multiplication of whole numbers, place the multiplier under the multiplicand, and multiply each term of the multiplicand by each term of the multiplier, writing the right-hand figure of each product obtained under the term of the multiplier which produces... | |
 | William Frederick Durand - Marine engineering - 1901 - 738 pages
...the following : Rule — Set down the two quantities, with terms of the same order under each other. Multiply each term of the multiplicand by each term of the multiplier. The order of any such product will be determined by adding the indices of the two terms used. If the... | |
 | George Egbert Fisher - 1901 - 622 pages
...3x7-3x5. This example illustrates the following method of multiplying a multinomial by a multinomial : Multiply each term of the multiplicand by each term of the multiplier, and add algebraically the resulting products. In general, (a + *)(c + </- e) = a(c + d- e) + b(c +... | |
 | George Egbert Fisher, Isaac Joachim Schwatt - Algebra - 1901 - 646 pages
...preceding article is derived the following principle for multiplying a multinomial by a multinomial : Multiply each term of the multiplicand by each term of the multiplier, and add algebraically the resulting products. Ex. 1. Multiply -3a + 2b by 2a-3b. We have (-3a + 26)(2a... | |
 | Boring - 1901 - 552 pages
...Ans. (12) In the multiplication of whole numbers, place the multiplier under the multiplicand, and multiply each term of the multiplicand by each term of the multiplier, writing 5. Vol. I.—3>. the right-hand figure of each product obtained under the term of the multiplier... | |
| |
