...parts may be computed by the following Rule.— To the geometrical series 1. 10. 100. 1000. 10000. &c., apply the arithmetical series 0. 1. 2. 3. 4....the said geometrical means ; the last of which will be the logarithm of the proposed number. Example. To compute the Ldg. of 2 to eight Places of Decimals...

...logarithms. Find a geometrical mean between 1 and 10, 10 and 100, or any other two terms of the first series between which the proposed number lies. Between...mean in the same manner, and so on, till you arrive within the proposed limit of the number whose logarithm is sought. Find, also, as many arithmetical...

...following RULE. Find a geometrical mean between 1 and 10, 10 and 100, or any other two terms of the. first series between which the proposed number lies. Between...mean in the same manner' and so on, till you arrive wit/tin the. proposed limit of the number whose logarithm is sought. Find, also, as many arithmetical...

...100, or any other two adjacent terms of the series, betwixt which the number proposed lies. 3. Also, between the mean, thus found, and the nearest extreme,...find another geometrical mean in the same manner; * It may here be remarked, that although the common logarithms have superseded the use of hyperbolic...

...any other two adjacent terms of the series, between which the number proposed lies. In like manner between the mean thus found, and the nearest extreme, find another geometrical mean; and so on, till you arrive within the proposed limit of the number, whose number is sought. , Find...

...which the proposed number lies. Between the mean thus found and the nearest term of the first series, find another geometrical mean in the same manner, and so on, till you approach as near as is necessary to the number whose logarithm is sought. Find, also, as many arithmetical...

...wkich the proposed number lies. Between the mean thus found and tke nearest term of the first series, find another geometrical mean in the same manner, and so on, till you approach as near as is necessary to the number whose logarithm is sought. Find, also, as many arithmetical...

...which the proposed number lies. Between the mean thus found and the nearest term of the first series, find another geometrical mean in the same manner, and so on, till you approach as near as is necessary to the number whose logarithm is sought. Find, also, as many arithmetical...

...or between 10 and 100, or an other two adjacent terms of the series between which the proposed num r lies. Between the mean thus found and the nearest...the said geometrical means, the last of which will be the logarithm of the proposed number. EXAMPLE. — To compute the Log. of 2 to Eight Places of Decimals...