To multiply a polynomial by a monomial, multiply each term of the polynomial by the monomial and add the partial products: (6a — 3ft) x 3c = 18uc -96c. New School Algebra - Page 56by George Albert Wentworth - 1898 - 407 pagesFull view - About this book
| Charles Davies, William Guy Peck - Electronic book - 1855 - 592 pages
...ailected with the sign — . Multiplicand — Zoic*/ Multiplier tc'hf Product - Sai'c6/'. 2. To mulli/ily **a polynomial by a monomial. Multiply each term of the polynomial by the monomial, and connect the** results by their respective signs ; the final result will be the product. Multiplicand 8ab — ex*... | |
| Charles Davies, William Guy Peck - Mathematics - 1855 - 628 pages
...Multiplicand — Zalic'f Multiplier 4с3/;/ъ Product - 8a4ac«/V 2. To multiply a polynomial l>ya **monomial. Multiply each term of the polynomial by the monomial, and connect the** results by their respective signs; the final result will be the product. Multiplicand Bab — ex* +... | |
| Charles Davies, William Guy Peck - Mathematics - 1857 - 608 pages
...signs, is affected with the sign — . Multiplicand — Zoic'/ Multiplier 4e'A/6 Product - 8a4>c«/6. 2. **To multiply a polynomial by a monomial. Multiply each...of the polynomial by the monomial, and connect the** results by their respective signs ; the final result will be the product. Multiplicand 8o4 — ex*... | |
| Paul Allen Towne - Algebra - 1865 - 314 pages
...2xey6z6. 13. Find the product of 7a'6»cz, 5at2c3 and — Ja363c. 14. Find the product of 3a'byzc and 6O. **To multiply a polynomial by a monomial: Multiply each term of the** multiplicand by the multiplier, according to 59. EXAMPLES. 6. Multiply a;2 -(- «y -{- y2 by a;2. J«.«.... | |
| William Guy Peck - Algebra - 1875 - 348 pages
...that quantity; hence, we have the following rule for multiplying a polynomial by a monomial: RULE. **Multiply each term of the polynomial by the monomial, and connect the** results by their proper signs, EXAMPLES. 1. Multiply 3a35 — 2xy + z by 2ax. Ans. Qa3bx — 4ax*y... | |
| James Morford Taylor - Algebra - 1889 - 340 pages
...this result write the product of the literal factors, observing the law of exponents (§ 38). (ii.) **To multiply a polynomial by a monomial, multiply each term of the polynomial by the monomial, and** add the results (§ 41). In applying the law of signs, each term must be considered as having the sign... | |
| James Morford Taylor - Algebra - 1889 - 340 pages
...this result write the product of the literal factors, observing the law of exponents (§ 38). (ii.) **To multiply a polynomial by a monomial, multiply each term of the polynomial by** tlie monomial, and add the results (§ 41). In applying the law of signs, each term must be considered... | |
| George W. Lilley - Algebra - 1892 - 424 pages
...obtained by multiplying each term of the multiplicand separately by the multiplier. Heiice, in general, **To Multiply a Polynomial by a Monomial Multiply each term of the** multiplicand by the multiplier, aiul add tlie results. Exercise 15. Multiply : 1. bc + ac-ab by abc;... | |
| Wallace Clarke Boyden - Algebra - 1894 - 188 pages
...and one of the numbers is x, what is the other number ? 13. ILLUS. 1. а - 6 + с x OPERA TIONS. 55 **To multiply a. polynomial by a monomial, multiply each term of the polynomial by** tlie monomial, and add tlie results. ILLUS. 2. .e4 + 2x2 + 3x ,•5^-2ж +1 - Uж4 - 4af - liar о... | |
| William Kent - Engineering - 1895 - 1214 pages
...exponent equal to the sum of the powers: o« xo* = a'; ti-61 x aft = a'b*; - Tab x 2ac = — 14 a-ftc. **To multiply a polynomial by a monomial, multiply each term of the polynomial by the monomial and** add the partial product«: (6a — 36) x 8c = I8nr Tu multiply two polynomials, multiply each term... | |
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