Normal Probability Function
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03-28-2022, 07:31 PM
(This post was last modified: 03-28-2022 07:39 PM by CMarangon.)
Post: #1
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Normal Probability Function
Hello!
I want to make a program to find P(x) and Q(x) for Normal Probability Function. I found formulas for P(x) and Q(x) as shown in the picture below. However they are hard integrals and it seems that HP50 does not solve them. I am looking for some kind of expanded formulas like Taylor Polynomial. Even Wolframalfa and Symbolab seem to be unable to help. Can you help me? Carlos - Brazil Time Zone: GMT -3 http://area48.com |
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03-28-2022, 09:11 PM
Post: #2
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RE: Normal Probability Function
Not sure, but the 50g's built-in UTPN function seems to be a generalized version of P(x) in your table. The section of the 50g AUR about UTPN can be seen here: https://holyjoe.net/hp/UTPN.jpg
The 50g also has the NDIST(m,v,x) function which might be of some use to you. It returns the normal probability distribution (bell curve) at x based on the mean m and variance v. Just guessing here... if not applicable, please ignore this reply. <0|ɸ|0> -Joe- |
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03-29-2022, 02:53 AM
(This post was last modified: 03-30-2022 03:26 PM by CMarangon.)
Post: #3
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RE: Normal Probability Function
(03-28-2022 09:11 PM)Joe Horn Wrote: Not sure, but the 50g's built-in UTPN function seems to be a generalized version of P(x) in your table. The section of the 50g AUR about UTPN can be seen here: https://holyjoe.net/hp/UTPN.jpg Hi Joe! I will take a look at UTPN and NDIST. I was making a webpage for it.{ http://www.areaseg.com/gauss I got these formulas from my Casio FX-5000F. They work! This is the corrected formula. Thanks to Mike and Trojdor for help. Ancient erros are in green. Carlos - Brazil Time Zone: GMT -3 http://area48.com |
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03-29-2022, 09:51 AM
(This post was last modified: 03-29-2022 10:21 AM by Mike T..)
Post: #4
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RE: Normal Probability Function
This may be of some use https://www.sasview.org/docs/_downloads/.../sas_erf.c
For a translation into Visual BASIC take a look at the source code for the HP32E here https://www.hpmuseum.org/cgi-sys/cgiwrap...i?read=867 (specifically modStastics.bas) Mike T. HP21, HP25, HP32E, HP33C, HP34C, HP10C, HP11C, HP12C, HP32S, HP22S |
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03-29-2022, 12:00 PM
Post: #5
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RE: Normal Probability Function
These functions are very difficult to compute accurately over their entire domain. The WP 34S uses the incomplete gamma function to work them out:
Lower Tail = 0.5*(1 + gammap(0.5*x^2, 0.5)) Upper Tail = 0.5*gammaq(0.5*x^2, 0.5) This belies the difficulty computing gammap and gammaq accurately. The common approach is to break the domain into two pieces and compute the function using a series in one part and a continued fraction for the other. See e.g. section 6.5 in Abramowitz and Stegun. This fails for large arguments from memory and more recent approaches break the domain into more pieces. All this relies on being able to compute the (standard) gamma function accurately which is another problematic one -- albeit nowhere near as nasty as the imcomplete gamma function. If you do implement the incomplte gamma function, you also get Poisson and χ² distributions for free. Pauli |
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03-29-2022, 12:39 PM
Post: #6
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RE: Normal Probability Function
(03-29-2022 02:53 AM)CMarangon Wrote: I got these formulas from my Casio FX-5000F. Yes ... but not well. It seems formula converted from https://www.johndcook.com/blog/cpp_erf/ For upper tail area, to be more accurate, we use erfc(x) = 1 - erf(x) ERFC(x) := horner([1.061405429,-1.453152027,1.421413741,-0.284496736,0.254829592,0], 1/(1+0.3275911*x)) * exp(-x*x) P(x) := ERFC(x/sqrt(2))/2 However, formula is sensitive with constants, slight rounding may mess up everything. With above setup, max absolute error about 7e-8 With Casio setup, max absolute error goes up to 83e-8 Worse case, at x = 0.32: ERFC P(x) = 0.37448 42341 Casio P(x) = 0.37448 49931 True P(x) = 0.37448 41653 Error Ratio = (41653-49931) / (41653-42341) = -8278/-688 ≈ 12. |
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03-29-2022, 03:05 PM
Post: #7
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RE: Normal Probability Function
(03-29-2022 12:00 PM)Paul Dale Wrote: Upper Tail = 0.5*gammaq(0.5*x^2, 0.5) Correction, factor off by 1/√(pi) Γ(1/2, x²) = √(pi) * erfc(x) // Abramowitz and Stegun, 6.5.17 P(x) = erfc(x/√2)/2 = Γ(1/2, x²/2) / (2*√(pi)) >>> from mpmath import * >>> P1 = lambda x: erfc(x/sqrt(2))/2 >>> P2 = lambda x: gammainc(1/2,x*x/2) / (2*sqrt(pi)) >>> z = 1 >>> print P1(z), P2(z) # confirm P1 = P2 0.158655253931457 0.158655253931457 Quote:The common approach is to break the domain into two pieces and compute the function For Xcas implementation of erf, see https://www.hpmuseum.org/forum/thread-15...#pid135589 |
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03-29-2022, 07:06 PM
Post: #8
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RE: Normal Probability Function
I love it when someone references "Big Red". 8^)
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03-29-2022, 08:30 PM
Post: #9
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RE: Normal Probability Function
Hello everybody!
I made this program for HP50. It works and is shorter than the one I made using the formula from Casio FX-5000F Soon I will send it to HPCALC. Carlos - Brazil Time Zone: GMT -3 http://area48.com |
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03-29-2022, 08:41 PM
Post: #10
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RE: Normal Probability Function
(03-29-2022 09:51 AM)Mike T. Wrote: This may be of some use https://www.sasview.org/docs/_downloads/.../sas_erf.c Hello! I will use it in my PHP page to calculate G(x), P(x) and Q(x):-) It has more numbers that the one I have got from my Casio calc.:-) This is the page I made, unfortunbately HP50 functions like NDIST and others do not work in PHP http://www.areaseg.com/gauss I will also share the webpage code, in few days. Soon I ill translate it to English, but, for now, even in Potuguese, I believe that you all can understand. Carlos - Brazil Time Zone: GMT -3 http://area48.com |
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03-29-2022, 09:01 PM
Post: #11
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RE: Normal Probability Function
Carlos - Brazil Time Zone: GMT -3 http://area48.com |
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03-30-2022, 02:15 AM
Post: #12
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RE: Normal Probability Function
As soon as any of these kinds of formulæ involve a 1 - term, you need to reconsider your choices. Accuracy will be lost when term approaches unity.
Pauli |
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03-30-2022, 08:02 AM
(This post was last modified: 03-30-2022 08:21 AM by trojdor.)
Post: #13
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RE: Normal Probability Function
The primary formula listed has it's roots in Abramowitz and Stegun's
Handbook of Mathematical Functions, Tenth Printing p.932 Probability Functions 26.2.17 A modified version of this CDF approximation is used in many function libraries with good results. (I use a similar modified approximation in my CDF programs for the HP-35s.) However, your listing shows several typos in the constants, and that will adversely affect accuracy: Denominator of f(t); 0.2316419 <--- your listing missing the final 9 For P(x), the constants are; b1= 0.319381530 b2=-0.356563782 b3= 1.781477937 <--- your listing missing the extra 7 in the middle b4=-1.821255978 b5= 1.330274429 <--- your listing has typo ... 3 as next to last digit should be 2 Additionally, modern CDF function libraries tend to replace the Sqrt(2*PI) in P(x) denominator with a pre-calculated constant, 2.50662827463, for speed / efficiency. mike ENTER > = |
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03-30-2022, 11:40 AM
(This post was last modified: 03-30-2022 03:25 PM by CMarangon.)
Post: #14
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RE: Normal Probability Function
Hi Mike and trojdor!
I will fix these mumbers. Thank you! Carlos - Brazil Time Zone: GMT -3 http://area48.com |
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03-30-2022, 01:38 PM
(This post was last modified: 03-30-2022 02:19 PM by Albert Chan.)
Post: #15
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RE: Normal Probability Function
(03-30-2022 08:02 AM)trojdor Wrote: Additionally, modern CDF function libraries tend to replace the Sqrt(2*PI) in P(x) denominator with a pre-calculated constant, 2.50662827463, for speed / efficiency. It may be better to remove factor altogether, using P(x) = erfc(x/√(2))/2 Below formula practically matched erfc (A&S 7.1.26) based P(x) formula. In other words, same max abs error of 7e-8. P(x) := exp(-x*x/2) * horner([0.53070271,-0.72657601,0.71070687,-0.14224837,0.1274148,0.], 1/(1+0.23164189*x)) Note: equation constants only required 8 digits precision I discovered this using numpy to move "/2" into the coefs. >>> a = [1.061405429,-1.453152027,1.421413741,-0.284496736,0.254829592,0] >>> numpy.array(a) / 2 array([ 0.53070271, -0.72657601, 0.71070687, -0.14224837, 0.1274148 , 0. ]) Turns out, 8 digits is enough to get practically the same error plots. |
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03-30-2022, 03:29 PM
(This post was last modified: 03-30-2022 03:41 PM by CMarangon.)
Post: #16
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RE: Normal Probability Function
Corrected Equation
You told it was wrong and I am not stubborn :-) Now it has only accuracy errors, because of formula itself. Thanks to Joe, Mike and "trojdor"! Corrections are in green: Carlos - Brazil Time Zone: GMT -3 http://area48.com |
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03-30-2022, 07:26 PM
Post: #17
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RE: Normal Probability Function
Hi all, From de HP-25 Applications Programs, here:
Handbook of Mathematical Functions With Formulas, Graphs,... Edited by: Milton Abramowitz and Irene A. Stegun National Bureau of Standards, 1968 / Dec. 1972 (Available on Internet) Normal Distribution: Item 26.2.17 - page: 932 Inverse Normal integral: Item 26.2.23 - page 933 D-D |
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