 | Jeremiah Day - Logarithms - 1815 - 172 pages
...by 3, and the quotient will be 2.65012. We have then this rule, 49. Add to the index, if necessary, such a negative number as will make it exactly divisible...positive number to the decimal part of the logarithm. 1. Required the 5th root of 0.009642 Power 0.009642 jog. 3^98417 or T +.2.9841 7 Root 0.3952 L59683... | |
 | Jeremiah Day - Measurement - 1815 - 388 pages
...by 3, and the quotient will be 2.65012. We have then this rule, 49. Add to the index, if necessary, such a negative number as will make it exactly divisible...positive number to the decimal part of the logarithm. 1. Required the 5th root of 0.009642 Power 0.009642 log. &98417 or "5+2.98417 Root 0.3952 1759683 2.... | |
 | Jeremiah Day - Geometry - 1824 - 440 pages
...by 3, and the quotient will be ¥^65012. We have then this rule, 49. Add to the index, if necessary, such a negative number as will make it exactly divisible...by the divisor, and prefix an equal positive number lo the decimal part of the logarithm. 1. Required the 5th root of 0.00%42 Power 0.009642 loio 3798417... | |
 | Jeremiah Day - Measurement - 1831 - 520 pages
...by 3, and the quotient will be 2.65012. We have then this rule, 49. Add to the index, if necessary, such a negative number as will make it exactly divisible...positive number to the decimal part of the logarithm. 1. Required the 5th root of 0.009642. Power 0.009642 log. 3.98417 or 5+2.98419 Root 0.3952 1.59683... | |
 | Jeremiah Day - Geometry - 1838 - 416 pages
...by 3, and the quotient will be 2.65012. We have then this rule, 49. Add to the index, if necessary, such a negative number as will make it exactly divisible...positive number to the decimal part of the logarithm. 1. Required the 5th root of 0.009642. Power 0.009642 log. _ "3.98417 or 5+2.98417 Root 0.3952 1.59683... | |
 | Jeremiah Day - Geometry - 1839 - 434 pages
...by 3, and the quotient will be 2.65012. We have then this rule, 49. Add to the index, if necessary, such a negative number as will make it exactly divisible...positive number to the decimal part of the logarithm. 1. Required the 5th root of 0.009642. Power 0.009642 log. ~3-.98417 or 5+2.98417 Root 0.3952 ' T.59683... | |
 | Jeremiah Day - Logarithms - 1848 - 354 pages
...by 3, and the quotient will be 2.05012. We have then this rule, 49. Add to the index, if necessary, such a negative number as will make it exactly divisible...positive number to the decimal part of the logarithm. 1. Required the 5th root of 0.009042 Power 0.009042 log. 3.98417 or ~5+2.984l7 Root 0.3952 T.59083... | |
 | Jeremiah Day - Geometry - 1851 - 418 pages
...by 3, and the quotient will be 2.65012. We have then this rule, 49. Add to the index, if necessary, such a negative number as will make it exactly divisible...positive number to the decimal part of the logarithm. 1. Required the 5th root of 0.009642. Power 0.009642 log. "3".98417 or 5+2.98417 Root 0.3952 T.59683... | |
 | Elias Loomis - Trigonometry - 1855 - 192 pages
...we may increase the characteristic by any number which will make it exactly divisible, provided we prefix an equal positive number to the decimal part of the logarithm. Ex. 3. Required the seventh root of 0.005846. The logarithm of 0.005846 is 3.766859, which may be written... | |
 | Jeremiah Day - Logarithms - 1855 - 344 pages
...will be 2.65012. We have then this rule, 49. Add to the index., if necessary, such a negative numb&r* as will make it exactly divisible by the divisor, and prefix an egnal positive number to the decimal part of the logarithm* 1. Required the 5th root of 0.009642 Power... | |
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We have then this rule, 49. Add to the index, if necessary, such a negative number as will make it exactly divisible by the divisor, and prefix an equal positive number to the decimal part of the logarithm. 1. Required the 5th root of 0.009642. 
