LogarithmsCharles W. Sever, 1882 - 43 páginas |
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... Examples 33-35 . Chapter III . , § 52 and Examples 35-40 , 43 , 44 . Chapter IV . , §§ 54-61 . Chapter V. , last part of § 68 . Chapter VI . , §§ 74 , 78-82 , 86 , 89 . LOGARITHMS . § 1. The logarithm of a number N.
... Examples 33-35 . Chapter III . , § 52 and Examples 35-40 , 43 , 44 . Chapter IV . , §§ 54-61 . Chapter V. , last part of § 68 . Chapter VI . , §§ 74 , 78-82 , 86 , 89 . LOGARITHMS . § 1. The logarithm of a number N.
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... example ; it is between 1000 [ 103 ] and 10000 [ 10 ] , therefore its logarithm is between 3 and 4 , i.e. its logarithm is 3+ a decimal . Take 0.000795 ; it is between 0.0001 [ 10-4 ] and 0.001 [ 10 - 3 ] , therefore its logarithm ...
... example ; it is between 1000 [ 103 ] and 10000 [ 10 ] , therefore its logarithm is between 3 and 4 , i.e. its logarithm is 3+ a decimal . Take 0.000795 ; it is between 0.0001 [ 10-4 ] and 0.001 [ 10 - 3 ] , therefore its logarithm ...
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... Examples : Find by the above rule the characteristics of the logarithms of the following numbers : - 3210 ( 1 ) 1689 ; 0-1 ( 4 ) 0.1689 ; 210 ( 2 ) 168.9 ; 0-1-2 ( 5 ) 0.0 1689 ; Answers . ( 1 ) 3 ; 0 ( 3 ) 1.689 ; 0-1-2-3-4 ( 6 ) 0.0 0 ...
... Examples : Find by the above rule the characteristics of the logarithms of the following numbers : - 3210 ( 1 ) 1689 ; 0-1 ( 4 ) 0.1689 ; 210 ( 2 ) 168.9 ; 0-1-2 ( 5 ) 0.0 1689 ; Answers . ( 1 ) 3 ; 0 ( 3 ) 1.689 ; 0-1-2-3-4 ( 6 ) 0.0 0 ...
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... example , for instance , if a num- ber is half - way between two numbers , its logarithm is half - way between the logarithms of these numbers — is only approxi- mately correct ; but , when the difference between the numbers is small ...
... example , for instance , if a num- ber is half - way between two numbers , its logarithm is half - way between the logarithms of these numbers — is only approxi- mately correct ; but , when the difference between the numbers is small ...
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... Examples : Find the logarithms of the following numbers : 1.834 19.98 0.01592 1.2899 54.97 1587.1 10.041 1000 9990 9999 0.09998 0.00000000010007 79930000 0.0001001 50090 0.6394 . Answers : 0.2634 1.3006 2.2019 0.1106 1.7402 3.2006 ...
... Examples : Find the logarithms of the following numbers : 1.834 19.98 0.01592 1.2899 54.97 1587.1 10.041 1000 9990 9999 0.09998 0.00000000010007 79930000 0.0001001 50090 0.6394 . Answers : 0.2634 1.3006 2.2019 0.1106 1.7402 3.2006 ...
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Términos y frases comunes
100 opposite 4-place table amount angle between 84 Answers arithm arithmetical complement column headed common logarithms cosecant cotangents of angles decimal point diff division of page Examples exponent find an angle find log sec find log sin Find the logarithms Find the numbers Find the values found with definiteness fourth place FRANCIS PEABODY MAGOUN full-faced type functions of angles given logarithm horizontal line inclusive integral power know from Trigonometry last two figures Let us find log arc 1'+e log cos log csc log ctn log log log sin log log,l=x logarithm is base logarithms of numbers mantissa method of interpolation number is equal number whose logarithm obtained place of decimals printed in full-faced secant significant figure sine and cosecant small table smaller type successive logarithms system of logarithms system the logarithm tabular log third division three figures tracting the latter trigono TRIGONOMETRIC FUNCTIONS true log
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Página 4 - The logarithm of any power of a number is equal to the logarithm of the number multiplied by the exponent of the power.
Página 4 - ... the logarithm of a fraction is equal to the logarithm of the numerator minus the logarithm of the denominator.
Página 7 - The integral part of a logarithm is called its characteristic, and the decimal part is called the mantissa.
Página 3 - The logarithm of the product of two or more numbers is equal to the sum of the logarithms of the numbers. For, let m and n be two numbers, and x and y their logarithms. Then, by the definition of a logarithm, m — ax, and n = a».
Página 1 - The exponent of the power to which a fixed number called the Base must be raised in order to produce a given number is called the Logarithm of the given number.
Página 2 - IV. The logarithm of a root of a number is found by dividing the logarithm of the number by the index of the root : log v/a = (log a)/b. This follows from the fact that if 10
Página 6 - Art. 66 we see that the logarithm of a number which is not an integral power of 10 is an integer plus a decimal.
Página 27 - ... cosines, &c., themselves. When logarithms were invented they were called artificial numbers, and the originals for which logarithms were computed, were accordingly called natural numbers. Thus, in speaking of a table of sines, to express that it is not the logarithms of the sines which are given, but...
Página 15 - For example, to obtain 1000, three tens must be multiplied together so that the logarithm of 1000 is 3. The logarithm of the reciprocal of a number is equal to the negative of the logarithm of the number.