Binomial Theorem and Logarithms: For the Use of the Midshipmen at the Naval School, PhiladelphiaPerkins & Purves, 1843 - 92 páginas |
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Página 10
... shown in the next chapter . 3 The power or root of a compound quantity is expressed with the aid of the vinculum or parenthesis . Thus , the 4th power of a + b is expressed ( a + b ) * ; the 3d root of x2 + y3 + z3 , √x2 + y2 + z3 , or ...
... shown in the next chapter . 3 The power or root of a compound quantity is expressed with the aid of the vinculum or parenthesis . Thus , the 4th power of a + b is expressed ( a + b ) * ; the 3d root of x2 + y3 + z3 , √x2 + y2 + z3 , or ...
Página 11
... shown in the last article , since evolution is the inverse of involution . In general the nth root mn of amn is an or am . 10. The involution and evolution of the product or quotient of powers are effected in the same manner . The 4th ...
... shown in the last article , since evolution is the inverse of involution . In general the nth root mn of amn is an or am . 10. The involution and evolution of the product or quotient of powers are effected in the same manner . The 4th ...
Página 20
... shown in precisely the same manner , that C = C ' , D = D ' , E = E ' , & c . 29. It follows from this , that if we have an equation of the form A — A ' + ( B — B ' ) x + ( C — C ' ) x2 + ( D — D ' ) x3 + & c . = 0 , which is true for ...
... shown in precisely the same manner , that C = C ' , D = D ' , E = E ' , & c . 29. It follows from this , that if we have an equation of the form A — A ' + ( B — B ' ) x + ( C — C ' ) x2 + ( D — D ' ) x3 + & c . = 0 , which is true for ...
Página 21
... shown to exist between this series and another of the same form , the above principle gives us as many equations as there are coefficients , from which the values of the coefficients are then determined by elimina- tion . These remarks ...
... shown to exist between this series and another of the same form , the above principle gives us as many equations as there are coefficients , from which the values of the coefficients are then determined by elimina- tion . These remarks ...
Página 22
... shown to be m , therefore we have ст -xm = mxm - 1 ; X -X so that our proposition is true when m is a positive integer . To extend it to the other cases , FIRST , let m be a negative integer , or let m = n . Then we have xmym x- " y ...
... shown to be m , therefore we have ст -xm = mxm - 1 ; X -X so that our proposition is true when m is a positive integer . To extend it to the other cases , FIRST , let m be a negative integer , or let m = n . Then we have xmym x- " y ...
Outras edições - Ver tudo
Binomial Theorem and Logarithms: For the Use of the Midshipmen At the Naval ... William Chauvenet Pré-visualização limitada - 2024 |
Binomial Theorem and Logarithms: For the Use of the Midshipmen At the Naval ... William Chauvenet Pré-visualização limitada - 2024 |
Binomial Theorem and Logarithms: For the Use of the Midshipmen at the Naval ... William Chauvenet Pré-visualização indisponível - 2017 |
Palavras e frases frequentes
2n³ 3n³ 3d power 3d root 4th power 4th root Algebra anti-logarithms approximate ax=b binomial theorem Briggs calculation CHAPTER common logarithms compute convenient convergent cube root decimal fraction decimal point denominator example exponential equation express the value find log find the square find the value finite number formula becomes fractional exponents given logarithm given number Hence Hutton indefinitely small infinite series integral exponents involution and evolution log.b loga m+1)th term manner method modulus multiply naperian logarithm Newton number is equal number of terms obtain places of decimals positive integer power of a+b power or root powers and roots prime numbers quantity reciprocal rithms root of a³ significant figure square root succeeding terms system of logarithms system whose base uneven unit's place unity values substituted whence
Passagens conhecidas
Página 50 - The logarithm of any power of a number is equal to the logarithm of the number multiplied by the exponent of the power.
Página 49 - The logarithm of the product of two or more numbers is equal to the sum of the logarithms of those numbers.
Página 61 - The fourth term is found by multiplying the second and third terms together and dividing by the first § 14O.
Página 50 - The logarithm of the quotient of two numbers is equal to the logarithm of the dividend minus the logarithm of the divisor.
Página 19 - Cxz+, etc.=A'+B'x+C'z2 + , etc., must be satisfied for each and every value given to x, then the coefficients of the like powers of x in the two members are equal each to each.
Página 74 - The logarithm of a number in any system is equal to the Naperian logarithm of that number multiplied by the modulus of the system.
Página 49 - Corollary. When the base is less than unity, it follows, from art. 3, that the logarithms of all numbers greater than unity are negative, while those of all numbers less than unity are positive. But when, as is almost always...
Página 55 - ... place, the characteristic being positive when this figure is to the left of the units' place, negative when it is to the right of the units' place, and zero when it is in the units
Página 27 - I have no doubt that he made the difcovery himfelf, without any light from Briggs, and that he thought it was new for all powers in general, as it was indeed for roots and quantities with fractional and irrational exponents.
Página 50 - Bee that to divide one number by another, we subtract the log. of the divisor from the log. of the dividend, and the remainder is the log.