 | Adrien Marie Legendre - Geometry - 1863 - 464 pages
...10 = 1 log .1 = — 1 log 100 = 2 log .01 = — 2 log 1000 = 3 log .001 = — 3 &C., &G. &C., &G. If a number lies between 1 and 10, its logarithm lies...decimal ; and so on : hence, we have the following EULE. The characteristic of the logarithm of a whole number is positive, and numerically 1 less than... | |
 | Isaac Todhunter - Plane trigonometry - 1866 - 216 pages
...60. We know from Arithmetic that 10°=1, l0^l0, 10f=100, 103=1000,... Now from this we infer that if a number lies between 1 and 10, its logarithm lies between 0 and 1 ; if a number lies between 10 and 100, its logarithm lies between 1 and 2 ; if a number lies between... | |
 | Adrien Marie Legendre - Geometry - 1871 - 490 pages
...10 = 1 log .1 = — 1 log 100 = 2 log .01 = — 2 log 1000 = 3 log .001 = — 3 &c., &c. &c., &c. If a number lies between 1 and 10, its logarithm lies...its logarithm is equal to 2 plus a decimal ; and so 011 : hence, we have the following KULE. TJ1e characteristic of the logarithm of an entire number is... | |
 | Charles Davies - Geometry - 1872 - 466 pages
...10 = 1 log .1 = — 1 log 100 = 2 log .01 = — 2 log 1000 = 3 log .001 = — 3 &e., &c. Ac., &c. If a number lies between 1 and 10, its logarithm lies...a decimal; and so on: hence, we have the following BULB. The characteristic of the logarithm of an entire number M positive, and numerically 1 less than... | |
 | Adrien Marie Legendre - Geometry - 1874 - 498 pages
...ifcc., we may form the following TABLE. log .1 = — 1 log .01 = — 2 log .001 = — 3 1&C., &C. If a number lies between 1 and 10, its logarithm lies...decimal ; and so on : hence, we have the following BtJLE. The character1stic of the logarithm of an entire number is positive, and numerically 1 less... | |
 | William Findlay Shunk - Railroad engineering - 1880 - 362 pages
...positive, and numerically 1 less than the number of places of figures in the given number. Thus, if a number lies between 1 and 10, its logarithm lies...plus a decimal. If a number lies between 10 and 100, ils logarithm is equal to 1 phis a decimal ; and so on. 3. The characteristic of the logarithm of a... | |
 | Charles Davies, Adrien Marie Legendre - Geometry - 1885 - 538 pages
...0 log 10 = 1 log .1 = - 1 log 100 = 2 log .01 = - 2 log 1000 = 3 log .001 = -3 &c., &c. &c., &c. If a number lies between 1 and 10, its logarithm lies...decimal ; and so on ; hence, we have the following RULE. — Tlte characteristic of the logarithm of an entire number is positive, and numerically 1 less... | |
 | William Findlay Shunk - Railroad engineering - 1886 - 376 pages
...positive, and numerically 1 less than the number of places of figures in -the given number. Thus, if a number lies between 1 and 10, its logarithm lies between 0 and 1; that is, it is equal to 0 plun a decimal. If a number lies between 10 and 100, its logarithm is equal to 1 ¡ilus a decimal ;... | |
 | William Findlay Shunk - Railroad engineering - 1890 - 360 pages
...positive, and numerically 1 less than the number of places of figures in the given number. Thus, if a number lies between 1 and 10, its logarithm lies between 0 and 1 ; that is, it is equal to 0 phis a decimal. If a number lies between 10 and 100, its logarithm is equal to 1 plus a decimal ; and... | |
 | William Findlay Shunk - Railroad engineering - 1890 - 372 pages
...positive, and numerieally 1 less than the number of plaees of figures in the given number. Thus, if a number lies between 1 and 10, its logarithm lies between 0 and 1 ; that is, it is e1lual to 0 plus a deeimal. 1f a number lies between 10 and 100, its logarithm is equal to 1 plus a... | |
| |