I'm trying to calculate the ratio of two log values a and b and then convert it back to non-log values. Since these are log values, the ratio c is:

from numpy import *
c = a - b
# convert to non-log value
val = exp(c)

consider this example:

a = -336929.42757
b = -334216.16795

since these are log values, the ratio is:

c = -2713.259620000026

Then I convert the ratio to non-log values and get 0:

val = exp(c)

How can I avoid this? What's the correct way to take the ratio of the two logs and convert back to non-log without having this behavior?

  • how do you calculate the values you assign to a and b?
    – shx2
    Apr 15, 2013 at 20:27
  • I do all the arithmetic in log values, so a and b are just the result of arithmetic on log values. I just take log(...) of things and add them/subtract them to end up with two values whose ratio I want to compare
    – user248237
    Apr 15, 2013 at 20:28
  • 1
    The final answer is ~4.429e-1179, which is far too small to be stored in a float object. Is that really the number you want?
    – DSM
    Apr 15, 2013 at 20:29
  • @DSM: no, I just care about the ratio and I want to see if it's greater than a certain cutoff value
    – user248237
    Apr 15, 2013 at 20:30
  • 1
    Let me try again. val == exp(c) == 4.4291364817936896e-1179. You can use a Decimal instance, or an mpf object, or something else, to store it if you really need it, but your ratio won't fit as is in a float.
    – DSM
    Apr 15, 2013 at 20:34

2 Answers 2


Well, the number you're expecting is too small to represent using float. E.g., in my system:

In : sys.float_info.min_exp
Out: -1021

Therefor, you're getting 0.0

If you only want to compare it to some cutoff value, you can still use the resulting 0. The "real" unrepresentable number is as good as 0 in your case.


The problem is clearly that exp(-2713.259620000026) not represented well by a float. But since you know the log of the number, you could do something like:

c10 = c/log(10.)


x = 10**c10

or, but separating the integer and fractional parts:

x = 4.29 x 10^(-1179)

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