Any one could explain what would be the logic behind this result
In:= Round[10.75, .1] Out= 10.8 In:= Round[2.75, .1] Out= 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:= NumberForm[2.75,2] Out 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:= $MaxExtraPrecision=1000; Round[2035.7520395261859,.1] Out= 2035.8000000000002 In:= $MaxExtraPrecision=50; Round[2.75,.1] Out= 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:= x=2035.7520395261859; NumberForm[x,IntegerLength[Round@x]+1] Out//NumberForm= 2035.8
The above (Edit 3) did not work for numbers such as
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:= x=2035.7520395261859; AccountingForm[x,IntegerLength[Round@x]+1] Out//AccountingForm= 2035.8 In:= x=2.67301785 10^7; AccountingForm[x,IntegerLength[Round@x]+1] Out//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.