Good question. :)
>> 1 - 7*( sym(8/7) - 1 )
ans =
0
For double numbers, look at the format command and its arguments.
Notice the roundoffs for the well-known cases. What is printed with format long does not show the least significant bits (LSB). When an answer is subtracted, from the expression, then you can get a sense of the LSB.
>> format long
>> 1/3
ans =
0.333333333333333
>> 0.333333333333333 - 1/3
ans =
-3.330669073875470e-16
>> 2/3
ans =
0.666666666666667
>> 0.666666666666667 - 2/3
ans =
3.330669073875470e-16
Here is my ad hoc, non-formal explanation. Look at some formating within Matlab:
>> format short
>> 7*(8/7 - 1)
ans =
1.0000
>> format long
>> 7*(8/7 - 1)
ans =
1.000000000000000
>> format longe
>> 7*(8/7 - 1)
ans =
9.999999999999996e-01
>> 1 - 9.999999999999996e-01
ans =
4.440892098500626e-16
Does this give you an idea of the hidden LSB's with format long?
When you subtract 1 from the above expression, then the hidden bits get exposed. You have discovered a serious problem when working with numbers on computers. There are methods that take these small errors into consideration so that the computations do not compound into huge errors when tens of thousands of computations are performed.
