Elements of Algebra: On the Basis of M. Bourdon, Embracing Sturm's and Horner's Theorems, and Practical ExamplesA. S. Barnes & Company, 1857 - 400 páginas |
Dentro del libro
Resultados 1-5 de 100
Página 5
... Reduction of Fractions . 68-69 To Reduce a Fraction to its Simplest Form .. 68 - I . To Reduce a Mixed Quantity to a Fraction ... 68 - II . To Reduce a Fraction to an entire or Mixed Quantity .. 68 - IIL To Reduce Fractions to a Common ...
... Reduction of Fractions . 68-69 To Reduce a Fraction to its Simplest Form .. 68 - I . To Reduce a Mixed Quantity to a Fraction ... 68 - II . To Reduce a Fraction to an entire or Mixed Quantity .. 68 - IIL To Reduce Fractions to a Common ...
Página 22
... reduce the similar terms of any poly . nomial . Hence , for the reduction of a polynomial containing sets of similar terms , to its simplest form , we have the following RULE . 1. Add together the co - efficients of all the additive ...
... reduce the similar terms of any poly . nomial . Hence , for the reduction of a polynomial containing sets of similar terms , to its simplest form , we have the following RULE . 1. Add together the co - efficients of all the additive ...
Página 23
... Reduce the polynomial 4a2b -8a2b simplest form . 2. Reduce the polynomial Tabc2 to its simplest form . - 3. Reduce the polynomial 24cb3 to its simplest form . ---- -9a2b + 11a2b to its Ans . - 2a2b . - abc2 - Tabc2 -- - Sabc2 + 6abc2 ...
... Reduce the polynomial 4a2b -8a2b simplest form . 2. Reduce the polynomial Tabc2 to its simplest form . - 3. Reduce the polynomial 24cb3 to its simplest form . ---- -9a2b + 11a2b to its Ans . - 2a2b . - abc2 - Tabc2 -- - Sabc2 + 6abc2 ...
Página 26
... reduced to a simpler form . 33. If some of the quantities to be added have similar terms , we connect the quantities by the sign of addition as before , and then reduce the resulting polynomial to its simplest form , by the rule already ...
... reduced to a simpler form . 33. If some of the quantities to be added have similar terms , we connect the quantities by the sign of addition as before , and then reduce the resulting polynomial to its simplest form , by the rule already ...
Página 27
... Reduce the similar terms , and annex to the results those terms which cannot be reduced , giving to each term its respective sign . EXAMPLES . 1. Add together the polynomials , 3a2 - 2b2-4ab , 5a2 — b2 + 2ab and 3ab 3c2 The term 3a2 ...
... Reduce the similar terms , and annex to the results those terms which cannot be reduced , giving to each term its respective sign . EXAMPLES . 1. Add together the polynomials , 3a2 - 2b2-4ab , 5a2 — b2 + 2ab and 3ab 3c2 The term 3a2 ...
Contenido
13 | |
15 | |
26 | |
35 | |
41 | |
49 | |
55 | |
61 | |
70 | |
78 | |
96 | |
103 | |
110 | |
117 | |
125 | |
133 | |
143 | |
155 | |
162 | |
205 | |
211 | |
289 | |
302 | |
312 | |
326 | |
335 | |
342 | |
349 | |
355 | |
362 | |
371 | |
379 | |
392 | |
Otras ediciones - Ver todas
Términos y frases comunes
algebraic expression algebraic quantities approximating fraction arithmetical arithmetical progression becomes called co-efficient common difference contrary signs cube root deduce denote the number derived polynomial Divide dividend entire number equal exactly divisible example exponent extract the square figures Find the factors find the values following RULE formula fractional unit given equation given number gives greater number greatest common divisor hence indicated inequality irreducible fraction last term leading letter least common multiple logarithm mixed quantity monomial multiplicand and multiplier nth power nth root number of terms obtain operation perfect square positive roots preceding problem proposed equation quotient radical sign real roots Reduce the polynomial remainder required to find result second degree second member second term simplest form square root substituted subtract suppose taken third transformed equation unknown quantity whence whole number X₁
Pasajes populares
Página 121 - Multiply the divisor, thus augmented, by the last figure of the root, and subtract the product from the dividend, and to the remainder bring down the next period for a new dividend.
Página 174 - For, we can find the value of one of the unknown quantities in terms of the other and known quantities...
Página 286 - The logarithm of a number is the exponent of the power to which it is necessary to raise a fixed number, in order to produce the first number.
Página 39 - That is, the square of the sum of two quantities is equal to the square of the first, plus twice the product of the first by the second, plus the square of the second.
Página 10 - Logic is a portion of the art of thinking; language is evidently, and by the admission of all philosophers, one of the principal instruments or helps of thought; and any imperfection in the instrument or in the mode of employing it is confessedly liable, still more than in almost any other art, to confuse and impede the process and destroy all ground of confidence in the result.
Página 200 - RULE. I. Separate the given number into periods of three figures each, beginning at the right hand ; the left hand period will often contain less than three places of figures.
Página 100 - If A and B together can perform a piece of work in 8 days, A and c together in 9 days, and B and c in 10 days, how many days will it take each person to perform the same work alone.
Página 35 - We have, then, for the multiplication of polynomials, the following RULE. Multiply all the terms of the multiplicand by each term of the multiplier in succession, aff'ccting the product of any two terms with the sign plus, when tlieir signs are alike, and with the sign minus, when their signs
Página 41 - Divide the coefficient of the dividend by the coefficient of the divisor.
Página 200 - The cube of a number is equal to the cube of the tens, plus three times the product of the square of the tens by the units, plus three times the product of the tens by the square of the units, plus the cube of the units.