Gamma function using Spouge Approximation
|
04-07-2015, 09:43 PM
(This post was last modified: 04-30-2015 09:40 PM by bshoring.)
Post: #6
|
|||
|
|||
RE: Gamma function using Spouge Approximation
So far I am finding this program yields correct results for any positive number up to 55. For negative numbers (non-integer) I have gotten correct results on all the ones I have tried so far.
I have also modified the program somewhat to work on my HP-38C as well as the iOS emulator for HP-25 (GO-25 SciRPN) which has a capacity of 99 program steps. The latter was more of a challenge as the HP-25 has no factorial or ISZ functions so those have to be re-created using additional program steps. Regards, Bob |
|||
« Next Oldest | Next Newest »
|
Messages In This Thread |
Gamma function using Spouge Approximation - Namir - 12-18-2013, 06:00 AM
RE: Gamma function using Spouge Approximation - Willy R. Kunz - 06-08-2014, 03:45 PM
RE: Gamma function using Spouge Approximation - Namir - 06-13-2014, 12:35 PM
RE: Gamma function using Spouge Approximation - Willy R. Kunz - 06-13-2014, 09:57 PM
RE: Gamma function using Spouge Approximation - bshoring - 03-21-2015, 03:26 AM
RE: Gamma function using Spouge Approximation - bshoring - 04-07-2015 09:43 PM
|
User(s) browsing this thread: 1 Guest(s)