HP Forums / HP Software Libraries / General Software Library v / (50g) Normal Distribution

Post Reply 
(50g) Normal Distribution
12-03-2018, 10:18 PM (This post was last modified: 12-03-2018 10:21 PM by Dieter.)
Post: #5
Dieter Offline
Senior Member
 		Posts: 2,397
Joined: Dec 2013
RE: (50g) Normal Distribution
(12-03-2018 09:53 PM)Albert Chan Wrote:  Is it simpler just do this ? P(x) = Q(-x)

Yes, sure. Sometimes you don't realize the obvious. #-)
In this case there even is no noticeable difference in the accuracy of the result.

I can't believe I didn't post this myself since I always use this in Excel spreadsheets with my own Q(x) code. #-)

Dieter
Find all posts by this user
Quote this message in a reply
Post Reply 


Messages In This Thread
(50g) Normal Distribution - John Keith - 12-03-2018, 04:20 PM
RE: (50g) Normal Distribution - Dieter - 12-03-2018, 07:05 PM
RE: (50g) Normal Distribution - John Keith - 12-03-2018, 08:45 PM
RE: (50g) Normal Distribution - Dieter - 12-03-2018 10:18 PM
RE: (50g) Normal Distribution - John Keith - 12-03-2018, 10:59 PM
RE: (50g) Normal Distribution - John Keith - 12-04-2018, 08:54 PM
RE: (50g) Normal Distribution - Dieter - 12-04-2018, 09:48 PM
RE: (50g) Normal Distribution - Dieter - 12-05-2018, 08:49 PM
RE: (50g) Normal Distribution - John Keith - 12-06-2018, 02:58 PM
RE: (50g) Normal Distribution - Dieter - 12-06-2018, 11:08 PM
RE: (50g) Normal Distribution - John Keith - 12-07-2018, 11:21 PM
RE: (50g) Normal Distribution - Dieter - 12-06-2018, 10:54 PM
RE: (50g) Normal Distribution - John Keith - 12-08-2018, 07:13 PM
RE: (50g) Normal Distribution - Dieter - 12-08-2018, 09:18 PM
RE: (50g) Normal Distribution - John Keith - 12-08-2018, 09:28 PM
RE: (50g) Normal Distribution - John Keith - 01-26-2019, 10:01 PM
RE: (50g) Normal Distribution - pier4r - 01-26-2019, 10:12 PM



User(s) browsing this thread: 1 Guest(s)

Contact Us | The Museum of HP Calculators | Return to Top | Return to Content | Lite (Archive) Mode | RSS Syndication