| William James Milne - Algebra - 1894 - 216 pages
...signs determined which connect the terms ? 65. PRINCIPLE. TJie product, of two binomial quantities having a common term is equal to the square of the common term, the algebraic sum of the other two multiplied by the common term, and the algebraic product of the... | |
| William James Milne - Algebra - 1894 - 214 pages
...the signs determined which connect the terms ? 65. PKINCIPLE. The product of two binomial quantities having a common term is equal to the square of the common term, the algebraic sum of the other t!co multiplied by the common term, and the algebraic product of the... | |
| William J. Milne - Algebra - 1899 - 172 pages
...the signs determined which connect the terms ? 65. PRINCIPLE. The product of two binomial quantities having a common term is equal to the square of the common term, the algebraic sum of the other two multiplied by the common term, and the algebraic product of the... | |
| George Washington Hull - Algebra - 1904 - 172 pages
...+ 2ft)(4a-2ft). 17. (2aft + 3 c)(2 aft-3 c). 9. (3x — 5y)(3x + 5y). 18. (4mи— 3 PRINCIPLE IV. The product of two binomials having a common term is equal to the square of the common term, the algebraic sum of the unlike terms multiplied by the common term, and the algebraic product of the... | |
| Arthur Schultze - Algebra - 1905 - 674 pages
...7 ö)(4 а - 5 &) = IG o2 + 28 «о - 20 (Л- 35 о2. 64. Tlie product of two binomials which have a common term is equal to the square of the common term, plus the sum of the two unequal terms multiplied by the common term, plus the product of the two unequal terms.... | |
| John Charles Stone, James Franklin Millis - Algebra - 1905 - 776 pages
...becomes я? + (a + b)x + ab. Hence, That is, the product of two binomials having a common term equals the square of the common term, plus the product of the common term and the sum of the otlwr terms, plus the product of the other terms. EXAMPLE 1. (x+2)(x+S)= Check. When... | |
| Arthur Schultze - 1905 - 396 pages
...a + 7 Ь)(4 a - 5 Ь) = 16 a2 + 28 ab - 20 a6- 35 Ь*. 64. The product of two binomials which have a common term is equal to the square of the common term, plus the sum of the two unequal terms multiplied by the common term, plus the product of the two unequal terms.... | |
| Arthur Schultze - Algebra - 1905 - 468 pages
...5 &) = 16 а2 + 28 ab - 20 ab- 35 &2. J 64. The. product of two -polynomials which have a common I term is equal to the square of the common term, plus the sum of the two unequal terms multiplied by the common term, plus the V product of the two unequal terms.... | |
| Arthur Schultze - Algebra - 1906 - 584 pages
...(4 а + 7 6) (4 а - 5 6) = 16 a2 + 28 ab - 20 ab- 35 b2 64. The product of two binomials which have a common term is equal to the square of the common term, plus the sum of the two unequal terms multiplied by the common term, plus the product of the two unequal terms.... | |
| William James Milne - Algebra - 1908 - 480 pages
...having a common term, x. Multiplying x + a by x + b, x + a x + b я?-\-ах bx + ab 117. PRINCIPLE. — The product of two binomials having a common term is equal to the sum of the square of the common term, the product of the sum of the unlike terms and the common term,... | |
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