[R] : Ramanujan and the accuracy of floating point computations - using Rmpfr in R
Nordlund, Dan (DSHS/RDA)
NordlDJ at dshs.wa.gov
Fri Jul 3 02:48:25 CEST 2015
Ravi,
Take a look at the following link.
https://code.google.com/p/r-bc/
I followed the instructions to get a Windows version of the 'nix utility program , bc (a high precision calculator), and the source for an R to bc interface. After installing them, I executed
exp(sqrt(bc(163))*4*atan(bc(1)))
in R and got this result
"262537412640768743.9999999999992500725971981856888793538563373369908627075374103782106479101186073116295306145602054347"
I don't know if this is helpful, but ...
Dan
Daniel Nordlund, PhD
Research and Data Analysis Division
Services & Enterprise Support Administration
Washington State Department of Social and Health Services
-----Original Message-----
From: R-help [mailto:r-help-bounces at r-project.org] On Behalf Of Jeff Newmiller
Sent: Thursday, July 02, 2015 4:13 PM
To: Richard M. Heiberger; Ravi Varadhan
Cc: r-help
Subject: Re: [R] : Ramanujan and the accuracy of floating point computations - using Rmpfr in R
But not 120 bits of pi... just 120 bits of the double precision version of pi.
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Sent from my phone. Please excuse my brevity.
On July 2, 2015 3:51:55 PM PDT, "Richard M. Heiberger" <rmh at temple.edu> wrote:
>precedence does matter in this example. the square root was taken of a
>doubleprecision (53 bit) number. my revision takes the square root of
>a 120 bit number.
>
>> sqrt(mpfr(pi, 120))
>1 'mpfr' number of precision 120 bits
>[1] 1.7724538509055159927515191031392484397
>> mpfr(sqrt(pi), 120)
>1 'mpfr' number of precision 120 bits
>[1] 1.772453850905515881919427556567825377
>> print(sqrt(pi), digits=20)
>[1] 1.7724538509055158819
>>
>
>Sent from my iPhone
>
>> On Jul 3, 2015, at 00:38, Ravi Varadhan <ravi.varadhan at jhu.edu>
>wrote:
>>
>> Hi Rich,
>>
>> The Wolfram answer is correct.
>> http://mathworld.wolfram.com/RamanujanConstant.html
>>
>> There is no code for Wolfram alpha. You just go to their web engine
>and plug in the expression and it will give you the answer.
>> http://www.wolframalpha.com/
>>
>> I am not sure that the precedence matters in Rmpfr. Even if it does,
>the answer you get is still wrong as you showed.
>>
>> Thanks,
>> Ravi
>>
>> -----Original Message-----
>> From: Richard M. Heiberger [mailto:rmh at temple.edu]
>> Sent: Thursday, July 02, 2015 6:30 PM
>> To: Aditya Singh
>> Cc: Ravi Varadhan; r-help
>> Subject: Re: [R] : Ramanujan and the accuracy of floating point
>computations - using Rmpfr in R
>>
>> There is a precedence error in your R attempt. You need to convert
>> 163 to 120 bits first, before taking
>> its square root.
>>
>>> exp(sqrt(mpfr(163, 120)) * mpfr(pi, 120))
>> 1 'mpfr' number of precision 120 bits
>> [1] 262537412640768333.51635812597335712954
>>
>> ## just the last four characters to the left of the decimal point.
>>> tmp <- c(baseR=8256, Wolfram=8744, Rmpfr=8333, wrongRmpfr=7837)
>>> tmp-tmp[2]
>> baseR Wolfram Rmpfr wrongRmpfr
>> -488 0 -411 -907
>>
>> You didn't give the Wolfram alpha code you used. There is no way of
>verifying the correct value from your email.
>> Please check that you didn't have a similar precedence error in that
>code.
>>
>> Rich
>>
>>
>>> On Thu, Jul 2, 2015 at 2:02 PM, Aditya Singh via R-help
><r-help at r-project.org> wrote:
>>>
>>> Ravi
>>>
>>> I am a chemical engineer by training. Is there not something like
>law of corresponding states in numerical analysis?
>>>
>>> Aditya
>>>
>>>
>>>
>>> ------------------------------
>>>> On Thu 2 Jul, 2015 7:28 AM PDT Ravi Varadhan wrote:
>>>>
>>>> Hi,
>>>>
>>>> Ramanujan supposedly discovered that the number, 163, has this
>interesting property that exp(sqrt(163)*pi), which is obviously a
>transcendental number, is real close to an integer (close to 10^(-12)).
>>>>
>>>> If I compute this using the Wolfram alpha engine, I get:
>>>> 262537412640768743.99999999999925007259719818568887935385...
>>>>
>>>> When I do this in R 3.1.1 (64-bit windows), I get:
>>>> 262537412640768256.0000
>>>>
>>>> The absolute error between the exact and R's value is 488, with a
>relative error of about 1.9x10^(-15).
>>>>
>>>> In order to replicate Wolfram Alpha, I tried doing this in "Rmfpr"
>but I am unable to get accurate results:
>>>>
>>>> library(Rmpfr)
>>>>
>>>>
>>>>> exp(sqrt(163) * mpfr(pi, 120))
>>>>
>>>> 1 'mpfr' number of precision 120 bits
>>>>
>>>> [1] 262537412640767837.08771354274620169031
>>>>
>>>> The above answer is not only inaccurate, but it is actually worse
>than the answer using the usual double precision. Any thoughts as to
>what I am doing wrong?
>>>>
>>>> Thank you,
>>>> Ravi
>>>>
>>>>
>>>>
>>>> [[alternative HTML version deleted]]
>>>>
>>>> ______________________________________________
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>>>
>>> ______________________________________________
>>> R-help at r-project.org mailing list -- To UNSUBSCRIBE and more, see
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>>> PLEASE do read the posting guide
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>>> and provide commented, minimal, self-contained, reproducible code.
>
>______________________________________________
>R-help at r-project.org mailing list -- To UNSUBSCRIBE and more, see
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>PLEASE do read the posting guide
>http://www.R-project.org/posting-guide.html
>and provide commented, minimal, self-contained, reproducible code.
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