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Mathematica 8.0.1

Any one could explain what would be the logic behind this result

In[24]:= Round[10.75, .1]

Out[24]= 10.8

In[29]:= Round[2.75, .1]

Out[29]= 2.8000000000000003

I have expected the second result above to be 2.8?


I was trying to do the above for formatting purposes only to make the number fit in the space. I ended up doing the following to get the result I want:

In[41]:= NumberForm[2.75,2]
Out[41]   2.8

I wish Mathematica has printf() like formatting function. I find formatting numbers in Mathematica for exact field width and form a little awkward compared to using printf() formatting rules.

EDIT 2: I tried $MaxExtraPrecision=1000 on some number I was trying for format/round, but it did not work, that is why I posted this question. Here it is

In[42]:= $MaxExtraPrecision=1000;

Out[43]= 2035.8000000000002

In[46]:= $MaxExtraPrecision=50;

Out[47]= 2.8000000000000003


I found this way, to format a number to one decimal point only. Use Numberform, but first need to find what n-digit precision to use by counting the number of digits to the left of the decimal point, then adding 1.

In[56]:= x=2035.7520395261859;

Out[57]//NumberForm= 2035.8


The above (Edit 3) did not work for numbers such as

a=2.67301785 10^7

After some trials, I found Accounting Form to do what I want. AccountingForm gets rid of the 10^n form which NumberForm did not:

In[76]:= x=2035.7520395261859;

Out[77]//AccountingForm= 2035.8

In[78]:= x=2.67301785 10^7;

Out[79]//AccountingForm= 26730178.5

For formatting numerical values, the best language I found was Fortran, followed COBOL and also by those languages that use or support printf() standard formatting. With Mathematica, one can do such formatting I am sure, but it sure seems too complicated to me. I never understood why Mathematics does not have Printf[].

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up vote 3 down vote accepted

Number/AccountingForm can take a list in the second argument, the second item of which is how many digits after the decimal place to show:

In[61]:= x=2035.7520395261859;

In[62]:= AccountingForm[x,{Infinity,3}]

Out[62]//AccountingForm= 2035.752

Perhaps this is useful.

share|improve this answer

Not all decimal (base 10) numbers with a finite number of digits are representable in binary (base 2) with a finite number of digits. E.g. 0.1 is not representable in binary, just like 1/3 ~= 0.33333... is not representable in decimal. Mathematica (and other software) will only use a limited number of decimal digits when showing the number to hide this effect. However, occasionally it might happen that enough decimal digits are shown that the mismatch becomes visible.


This command will show you what happens when you find the closes binary representation of 0.1 using 20 binary digits, then convert it back to decimal:

RealDigits[FromDigits[RealDigits[1/10, 2, 20], 2], 10]
share|improve this answer
+1, excellent answer. – Mikaveli Jun 13 '11 at 13:27

The number is stored in base 2, rather than base 10 (decimal). It's impossible to represent 2.8 in base 2, so it uses the closest value: 2.8000000000000003

share|improve this answer
The closest value in really is just 2.8. Consider: a = N[FromDigits[RealDigits[2.8, 2], 2], 30]; b = N[FromDigits[RealDigits[Round[2.75, .1], 2], 2], 30]; {14/5 - a, b - 14/5} gives {1.7763568394003*10^-16, 2.6645352591004*10^-16}. – Alexey Popkov Jun 16 '11 at 22:13

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