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ln and e^x on the 16C?
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03-23-2016, 12:25 AM
Post: #4
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RE: ln and e^x on the 16C?
Hi Dave,
Here's a crude algo I developed for 4 -bangers with memory. It might be a start. Natural log ln(v) 0.6 to 1.65, 6 digits, 39 keystrokes y = -(v - 1)/(v + 1) = -((v + 1) - 2)/(v + 1) ln(v) = ((((5y^2/7) - 1)^(-1) X 42 - 8)y^2 / 75 - 2)y for v < 0.6 multiply by e n times until in range; subtract n at end for v > 1.65 divide by e n times until in range; add n at end Exponential e^v -1 to +1, 7 digits, 36 keystrokes e^v = ((((v^2 + 42)/98)^(-1) X v + v - 20)v/40 + 1)^(-1) X v + 1 |
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| Messages In This Thread |
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ln and e^x on the 16C? - Dave Britten - 03-22-2016, 05:44 PM
RE: ln and e^x on the 16C? - Jake Schwartz - 03-22-2016, 10:07 PM
RE: ln and e^x on the 16C? - Dave Britten - 03-22-2016, 11:51 PM
RE: ln and e^x on the 16C? - Gene - 01-29-2018, 04:00 AM
RE: ln and e^x on the 16C? - Dave Britten - 01-29-2018, 03:27 PM
RE: ln and e^x on the 16C? - Bob Patton - 03-23-2016 12:25 AM
RE: ln and e^x on the 16C? - Gerson W. Barbosa - 03-23-2016, 01:38 AM
RE: ln and e^x on the 16C? - Tugdual - 03-26-2016, 06:31 AM
RE: ln and e^x on the 16C? - Didier Lachieze - 03-26-2016, 08:41 AM
RE: ln and e^x on the 16C? - Dave Britten - 03-26-2016, 11:52 AM
RE: ln and e^x on the 16C? - Tugdual - 03-27-2016, 04:31 PM
RE: ln and e^x on the 16C? - Gerson W. Barbosa - 01-28-2018, 08:52 PM
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