## An Elementary Treatise on Algebra: To which are Added Exponential Equations and Logarithms |

### No interior do livro

Resultados 1-5 de 5

Página 145

To find any power of a

; a + bx + cx2 + d 23 +224 + & c . , in which the successive coefficients are

denoted ...

To find any power of a

**polynomial**. Solution . Suppose the terms of the given**polynomial**to be arranged according to the powers of any letter , as x , as follows; a + bx + cx2 + d 23 +224 + & c . , in which the successive coefficients are

denoted ...

Página 146

The first term of the power is the same power of the first term a of the given

first term taken with reference to a . To obtain any other coefficient from the

preceding ...

The first term of the power is the same power of the first term a of the given

**polynomial**. The coefficient of x in the second term is b times the derivative of thefirst term taken with reference to a . To obtain any other coefficient from the

preceding ...

Página 150

To which are Added Exponential Equations and Logarithms Benjamin Peirce.

Root of a

+60 a2 b c3 + 60 a 63 c2 + 6b5c + 15 a ? c4 + 60 a b2c3 + 15 b4 c2 + 30 ab c4 +

...

To which are Added Exponential Equations and Logarithms Benjamin Peirce.

Root of a

**Polynomial**. 60 a2 b3c76ab5 + 20 ao c3 + 90 a2 b2 c2 + 30 a b4c + 66+60 a2 b c3 + 60 a 63 c2 + 6b5c + 15 a ? c4 + 60 a b2c3 + 15 b4 c2 + 30 ab c4 +

...

Página 151

Root of a

Rn - 1 and if , in P - R and n Rn - 1 , only the first term is retained , the first term of

the quotient is the first term of R ' ; and a new portion of the root is thus found ...

Root of a

**Polynomial**. or P - R " = n R TM -1 R ' + & c . and Р · Rn = R ' + & c . nRn - 1 and if , in P - R and n Rn - 1 , only the first term is retained , the first term of

the quotient is the first term of R ' ; and a new portion of the root is thus found ...

Página 153

To which are Added Exponential Equations and Logarithms Benjamin Peirce.

Root of a

63 — 2441 a4 b7c - 25 a4 b ? — 68,69 al b6c + 18 ab +245 65c - 31 + 13729 a ...

To which are Added Exponential Equations and Logarithms Benjamin Peirce.

Root of a

**Polynomial**. 6. Find the 5th root of 16807 a10 65 12205 a8 64 + uzu a663 — 2441 a4 b7c - 25 a4 b ? — 68,69 al b6c + 18 ab +245 65c - 31 + 13729 a ...

### Opinião das pessoas - Escrever uma crítica

Não foram encontradas quaisquer críticas nos locais habituais.

### Outras edições - Ver tudo

An Elementary Treatise on Algebra: To which are Added Exponential Equations ... Benjamin Peirce Visualização integral - 1842 |

An Elementary Treatise on Algebra: To which are Added Exponential Equations ... Benjamin Peirce Visualização integral - 1860 |

An Elementary Treatise on Algebra: To which are Added Exponential Equations ... Benjamin Peirce Visualização integral - 1858 |

### Palavras e frases frequentes

affected approximate values arithmetical becomes body called coefficient consequently contained continued fraction continued product Corollary corresponding decimal denominator denote derivative difference Divide dividend division Elimination equal roots equation 23 EXAMPLES exponent expression Extract factor figure Find Find the greatest Find the square Find the sum follows fourth fraction Free function gallons given equation gives greater greatest common divisor Hence imaginary increased infinite integral known last term least less letter limit logarithm means method monomials multiplied negative number of real number of terms obtained places polynomial positive Problem progression Proof proportion putting quotient ratio real roots reduced remainder result reverse row of signs Solution Solve the equation square root substitution subtracted successive suppressed Theorem third true unity unknown quantity variable whence wine

### Passagens conhecidas

Página 46 - In any proportion the terms are in proportion by Composition and Division ; that is, the sum of the first two terms is to their difference, as the sum of the last two terms is to their difference.

Página 190 - One hundred stones being placed on the ground in a straight line, at the distance of 2 yards from each other, how far will a person travel who shall bring them one by one to a basket, placed at 2 yards from the first stone ? Ans.

Página 266 - The logarithm of the quotient is equal to the logarithm of the dividend, diminished by the logarithm of the divisor.

Página 61 - A term may be transposed from one member of an equation to the other by changing its sign.

Página 184 - I = the last term, r = the common difference, n = the number of terms, S = the sum of all 'the terms.

Página 53 - There is a number consisting of two digits, the second of which is greater than the first, and if the number be divided by the sum of its digits, the quotient is 4...

Página 30 - The 2d line of col. 1 is the 1st line multiplied by 7 in order to render its first term divisible by the first term of the new divisor ; the remainder of the division is the 4th line of col.

Página 125 - Subtract the square of the root from the first period, and to the remainder bring down the second period for a dividend. III. Double the root already found and place it on the left for a divisor.

Página 230 - Rule. 324. An equation of any degree whatever cannot have a greater number of positive roots than there are variations in the signs of Us terms, nor a greater number of negative roots than there are permanences of these signs.

Página 45 - Likewise, the sum of the antecedents is to their difference, as the sum of the consequents is to their difference. Ratio of Sum of two first Terms to that of two last. Moreover, in finding...