How do I change the number display from scientific notation to the full number in digits?
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How to make MATLAB output the full number in digits, and not using scientific notation?
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Oleg Komarov
2024년 11월 14일 0:00
편집: MathWorks Support Team
2024년 11월 14일 6:11
format long or sprintf('%16.f',2332456943534324)
댓글 수: 9
James Upton
2019년 7월 16일
편집: James Upton
2019년 7월 16일
no matter what number format I display, it still does not show me the full number that was present on the excel file?
Walter Roberson
2020년 4월 21일
I believe that those are places where the number stored is not the closest representable number to what the value would round to.
추가 답변 (6개)
Image Analyst
2011년 8월 7일
편집: MathWorks Support Team
2018년 11월 8일
To display the maximum number of digits in a variable without using scientific notation, set the output display format to "longG":
format longG
After you set the display format, variables display in decimal notation:
m = rand(1,3)/1000
m =
0.000546881519204984 0.000957506835434298 0.00096488853519927
To avoid displaying scientific notation for variables that exceed 2^50 use "sprintf". For example, this code displays the number 2332456943534324 in decimal notation:
sprintf('%16.f',2332456943534324)
ans =
'2332456943534324'
For more information, see the "format" documentation:
댓글 수: 2
Walter Roberson
2011년 8월 7일
format long g
helps. However, integers that exceed 2^53 will be represented in scientific notation with "format long g". To get the full digits of those, you need to use sprintf() or fprintf()
Image Analyst
2011년 8월 7일
Yes it can help. Sometimes some sneak through even with that (if there would be more than three 0's to the right of the decimal point), like this which I tried:
m =
Columns 1 through 4
0.000538342435260057 0.000996134716626886 7.81755287531837e-005 0.000442678269775446
Columns 5 through 8
0.000106652770180584 0.000961898080855054 4.63422413406744e-006 0.000774910464711502
Kaveh Vejdani
2018년 2월 19일
I don't understand why you have accepted the wrong answers. What you're looking for is: format short g
Cheers, Kaveh
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Kaveh Vejdani
2018년 2월 19일
For any formatting, one can find a special case (an absurdly huge number or an infinitesimally small one) to make it fail. For "practical" purposes, long g and short g will do the job perfectly.
Walter Roberson
2018년 2월 19일
>> format short g
>> pi
ans =
3.1416
This is not "full number in digits"
>> 1000000
ans =
1e+06
this is not even close to being an "absurdly huge number"
format short g gives you at most 5 significant figures.
format long g gives you at most 15 significant figures. It turns out that is not enough in practice to be unique. There are 24 distinct representable values in unique(pi-37*eps:eps:pi+9*eps), all of which display as 3.14159265358979 under format long g. If the goal is to output enough digits to be able to transfer the values exactly in text form, then format long g is not sufficient.
People get caught by this all the time!
format long g
T = 0.3 - 0.2
T == 0.1
T - 0.1
T =
0.1
ans =
logical
0
ans =
-2.77555756156289e-17
People have difficulty understanding why a value that shows up as 0.1 does not compare as equal to 0.1: the limits of format long g have real effects.
Mark Bower
2017년 10월 20일
편집: Mark Bower
2017년 10월 20일
A nice, consistent solution is to use "num2str()". The same call works for both display from the command line:
> val = 1234567890
val =
1.234567890000000e+09
> num2str(val)
ans =
1234567890
and also within print statements:
> sprintf(num2str(val))
ans =
1234567890
It also works for floating point numbers:
> val = 123456.789
val =
1.234567890000000e+05
> sprintf(num2str(val))
ans =
123456.789
>
댓글 수: 2
Walter Roberson
2018년 2월 19일
>> num2str(pi*10^5)
ans =
'314159.2654'
This is not "full decimal places"
Using num2str() inside sprintf() is redundant.
Stephen23
2018년 2월 20일
편집: Stephen23
2018년 2월 20일
sprintf(num2str(val))
The sprintf is totally superfluous, it does nothing useful at all here, just slows down the code. In any case, using a proper sprintf format string would be quicker than calling num2str, and provide more control over the number of digits, so why not do that?
Walter Roberson
2018년 2월 19일
For MS Windows and Linux, to get full number of digits and not in exponential form, you need to either use the Symbolic toolbox or you need to use a tool such as https://www.mathworks.com/matlabcentral/fileexchange/22239-num2strexact--exact-version-of-num2str- from the File Exchange. This is crucial for MS Windows, which does a rather poor job of converting exact values; Linux does a better job but still has inaccuracies after a while.
On Mac (OS-X, MacOS), the built in conversion is exact, and you can choose to sprintf() with a '%.1074f' format. For example,
>> sprintf('%.1074f', eps(realmin))
ans =
'0.000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000004940656458412465441765687928682213723650598026143247644255856825006755072702087518652998363616359923797965646954457177309266567103559397963987747960107818781263007131903114045278458171678489821036887186360569987307230500063874091535649843873124733972731696151400317153853980741262385655911710266585566867681870395603106249319452715914924553293054565444011274801297099995419319894090804165633245247571478690147267801593552386115501348035264934720193790268107107491703332226844753335720832431936092382893458368060106011506169809753078342277318329247904982524730776375927247874656084778203734469699533647017972677717585125660551199131504891101451037862738167250955837389733598993664809941164205702637090279242767544565229087538682506419718265533447265625'
For larger values you might want to trim out trailing zeros from the converted string
val = pi*1E-200;
regexprep( sprintf('%.1074f', val), '0+$', '', 'lineanchors')
ans =
'0.00000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000003141592653589793111936498419027683964072757959391149845317813416927695644722162706379483043156554579881967829022575831926635177847590589777088086173081089243142930507159490615800591052996089483276727788901006686618108987452642387169053033459820326372299902201815389727889699071056417123601253516892437642498120285079407325647552658339885701180059456745257476645670329996938769926310811984167666114826593537757304481509915842491117931968666219637406979734598283259283758102504979792257699955371208488941192626953125'
댓글 수: 0
Huw S
2017년 1월 31일
If you don't need to know all the decimal points, then do your equation inside round.
saves all the other bother of exponentials.
댓글 수: 1
Walter Roberson
2017년 1월 31일
Unfortunately not the case:
>> format short
>> round(2^54)
ans =
1.8014e+16
>> format long g
>> round(2^54)
ans =
1.8014398509482e+16
>> uint64(2^54)
ans =
uint64
18014398509481984
Christos Boutsikas
2020년 4월 21일
You can also use Variable-precision arithmetic via command vpa.
vpa(x) %if x is the output number you are interesting in
댓글 수: 1
Walter Roberson
2020년 4월 21일
This is what Steven and I were referring to when we discussed Symbolic Toolbox.
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