کد مقاله | کد نشریه | سال انتشار | مقاله انگلیسی | نسخه تمام متن |
---|---|---|---|---|
4642160 | 1341333 | 2008 | 8 صفحه PDF | دانلود رایگان |

In the letter to Daniel Bernoulli, Euler reports on his attempt to compute the common logarithm logxlogx by interpolation at the successive powers of 10. He notes that for x=9x=9 the procedure, though converging fast, yields an incorrect answer. The interpolation procedure is analyzed mathematically, and the discrepancy explained on the basis of modern function theory. It turns out that Euler's procedure converges to a q -analogue Sq(x)Sq(x) of the logarithm, where q=110. In the case of the logarithm logωx to base ω>1ω>1 (considered by Euler almost twenty years later), the limit of the analogous procedure (interpolating at the successive powers of ωω) is Sq(x)Sq(x) with q=1/ωq=1/ω. It is shown that by taking ω>1ω>1 sufficiently close to 1 and interpolating at sufficiently many points, the logarithm logxlogx can indeed be approximated arbitrarily closely, although, if x , 1
Journal: Journal of Computational and Applied Mathematics - Volume 219, Issue 2, 1 October 2008, Pages 408–415