# In laymans terms, what does the Python string format “g” actually mean?

Facebook and Stack Exchange are now working together to support the Facebook developer community. Facebook engineers participate here along with the best Facebook developers in the world. If you have a technical question about Facebook, this is the best place to ask.

I feel a bit silly for asking what I'm sure is a rather basic question, but I've been learning Python and I'm having difficulty understanding what exactly the "g" and "G" string formats actually do.

The documentation has this to say:

Floating point format. Uses lowercase exponential format if exponent is less than -4 or not less than precision, decimal format otherwise.

I'm sure this is supposed to make sense, but I'm just not getting it. Can someone provide a clearer explanation for this format, and possibly provide some examples of when and how it should be used, vs. just using "e" or "f".

Thanks

-
Have you tried outputting a bunch of sample numbers in decimal and formatted with `%g`? This would probably give you a good idea... – André Caron Nov 26 '11 at 22:32
A historical note: while Python borrows these format codes from C's `printf`, the basic idea for them and the specific codes ("F", "E", and "G") were first used in various FORTRAN implementations in the late 1950's and 60's. – Ned Deily Nov 26 '11 at 23:00

These examples are probably illustrative:

``````>>> numbers = [100, 10, 1, 0.1, 0.01, 0.001, 0.0001, 0.00001]
>>> for number in numbers:
...     print "%%e=%e, %%f=%f, %%g=%g" % (number, number, number)
...
%e=1.000000e+02, %f=100.000000, %g=100
%e=1.000000e+01, %f=10.000000, %g=10
%e=1.000000e+00, %f=1.000000, %g=1
%e=1.000000e-01, %f=0.100000, %g=0.1
%e=1.000000e-02, %f=0.010000, %g=0.01
%e=1.000000e-03, %f=0.001000, %g=0.001
%e=1.000000e-04, %f=0.000100, %g=0.0001
%e=1.000000e-05, %f=0.000010, %g=1e-05
>>> for number in numbers:
...     print "%%0.2e=%0.2e, %%0.2f=%0.2f, %%0.2g=%0.2g" % (number, number, number)
...
%0.2e=1.00e+02, %0.2f=100.00, %0.2g=1e+02
%0.2e=1.00e+01, %0.2f=10.00, %0.2g=10
%0.2e=1.00e+00, %0.2f=1.00, %0.2g=1
%0.2e=1.00e-01, %0.2f=0.10, %0.2g=0.1
%0.2e=1.00e-02, %0.2f=0.01, %0.2g=0.01
%0.2e=1.00e-03, %0.2f=0.00, %0.2g=0.001
%0.2e=1.00e-04, %0.2f=0.00, %0.2g=0.0001
%0.2e=1.00e-05, %0.2f=0.00, %0.2g=1e-05
``````

One of the nice things about Python is that it is easy to test something out in the interpreter when you don't understand exactly what it means.

-
 After reading your comment a bit more, I played around and reread the explanation above. So, '%g' will display as an exponent if the number is either larger than `10**(precision)` (where precision is 6 by default, but can be changed using `.n` in the format) or smaller than `10**-4`? If that's the case, then I was just being really dense when I read the explanation in the docs, though I'll admit I think my explanation is a bit clearer. :) – user1015937 Nov 26 '11 at 23:02

g and G are similar to the output you would get on a calculator display if the output is very large or very small you will get a response in scientific notation. For example 0.000001 gives "1e-06" with g and "1E-06" with G. However numbers that are not too small or too large are displayed simply as decimals 1000 gives "1000"

e always gives the result in exponential format 1000 gives 1.000000e+03

f always gives the result in decimal format, however it does not do the rounding off that g and G do 1000 gives "1000.000000"

-