sqrt(3) is calculated in double precision in Matlab. So you have 15 digits as standard already.
Big integer and Precision
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Hi,
I am trying to work on some problems which deal with really large integers (much larger than intmax('uint64')). How do I deal with such integers in MATLAB? I got some stuffs online based on 'vpa'. Is there any alternative to symbolic toolbox and vpa? Using an easy example, say I am trying to calculate the value of 2^2317. How is it possible to do it?
And how do I increase the precision of calculation? Say, I am trying to calculate sqrt(3) upto 15 digits precision. How can I do it?
Thanks :-)
3 Commenti
Image Analyst
il 12 Lug 2014
Modificato: Image Analyst
il 12 Lug 2014
Is there some link that gives the answer for how many digits you can expect for single or double precision? [edit] http://www.mathworks.com/help/matlab/matlab_prog/floating-point-numbers.html seems to indicate that the number of places depends on the number you're considering, but it's accurate through about 14 decimal places (7.1e-15 so the 15th place can be inaccurate by as much as 7) for doubles and through 6 places (+/- 4.7684e-07, the 7th place varies by around +/-4) for singles.
Star Strider
il 12 Lug 2014
Modificato: Star Strider
il 12 Lug 2014
eps:
- eps(X) = 2^(E-23) if isa(X,'single')
- eps(X) = 2^(E-52) if isa(X,'double')
Also: flintmax.
Risposte (3)
Star Strider
il 12 Lug 2014
Modificato: Star Strider
il 12 Lug 2014
The vpa function in the Symbolic Math Toolbox is probably your only option. You can adjust the precision with the digits function.
From the documentation:
- ‘ digits lets you specify any number of significant decimal digits from 1 to 2^29 + 1. ’
1 Commento
Image Analyst
il 12 Lug 2014
Wow, 536,870,913 digits of precision. I never would have guessed that you could get that much precision. And I thought 20 or 30 would have been a lot.
James Tursa
il 12 Lug 2014
Modificato: James Tursa
il 12 Lug 2014
In addition to the Symbolic Toolbox, for extended precision integer and floating point arithmetic, you can use these FEX submissions by John D'Errico:
0 Commenti
Christopher Creutzig
il 1 Set 2014
Modificato: Christopher Creutzig
il 1 Set 2014
You can compute with exact integers and rationals using the symbolic toolbox, just make sure they are not cut off by computing in doubles first:
>> sym(2)^2317
ans =
30654903508108357077958654144825937585978808922337901521692741170911447076693116235513237095579066485773937279334784139954181575840986269850991750398202331213943274278112396793424683275528507127617356737974156212114985333650793917021532655353073330339869206521452698460733186617040160262848093715277704279290680230304150547684590960276420040187406068172642162633162861058913834479146788713758308941909711983231722076836272997428595743463045969399361824711110350992834115834375631290260030543671026084690659491964528746134305444576187523233231429766154483330868291973263704666586462246580637588991629908758131771642269031718471782924220000298094429698919484347691856871276393621193756312248959107072
>> (sqrt(sym(2))+1/sym(7))^23
ans =
(2^(1/2) + 1/7)^23
>> expand((sqrt(sym(2))+1/sym(7))^23)
ans =
(36964502873561444765593*2^(1/2))/3909821048582988049 + 359084438788642488468527/27368747340080916343
0 Commenti
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