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Dieter · (This post was last modified: 01-31-2019 09:46 PM by Dieter.)

(01-31-2019 09:42 AM)Albert Chan Wrote: Typo fixed. Thanks.

The second "Enter" at the beginning is still missing. Without it the code will not work.

(01-31-2019 09:42 AM)Albert Chan Wrote: A (quite) accurate ln1+x function, or "how close can you get" part II thread had the same formula.
Was there a part I ?

Yes, but that was about Bernoulli numbers:
http://www.hpmuseum.org/forum/thread-870.html

But I also posted a similar method for the e^x–1 function:
http://www.hpmuseum.org/forum/thread-5508.html

(01-31-2019 09:42 AM)Albert Chan Wrote: My rpn.exe confirmed +correction way much better, and avoided divide-by-0 test.

Quote:>rpn
1.23456789e-3 s
1+ log s1 ? # log1p value
0.001233806437707756434884160067124232513609
r 1+ =-10 s2 ? log s3 ? # 1+X, LN(1+X) value
1.001234568
0.001233806547572121411586143127131058379588

- ?10 # correction wanted
-1.09864365E-10

r2 1- r $ - r2 / ?10 # correction = -(X+1-1-X)/(X+1)
-1.09864365E-10

r3 r x r2 1- / r3 - ?10 # correction = log1p(X) * X / (1+X-1) - log1p(X)
-1.099321546E-10

Please excuse me, Albert, but this is one more case where I see a lot of numbers and cryptic code, but I don't understand anything. Who may understand the meaning of "r 1+ =-10 s2 ? log s3 ? # 1+X, LN(1+X) value" ?

Dieter