Most processors use IEEE 754 binary floating-point arithmetic. In this format, numbers are represented as a sign *s*, a fraction *f*, and an exponent *e*. The fraction is also called a significand.

The sign *s* is a bit 0 or 1 representing + or –, respectively.

In double precision, the significand *f* is a 53-bit binary numeral with a radix point after the first bit, such as 1.1010000100100110011100011011001100101010000000100011_{2}.

In double precision, the exponent *e* is an integer from –1022 to +1023.

The combined value represented by the sign, significand, and exponent is (-1)^{s}•2^{e}•*f*.

When you add two numbers, the processor figures out what exponent to use for the result. Then, given that exponent, it figures out what fraction to use for the result. When you add a large number and a small number, the entire result will not fit into the significand. So, the processor must round the mathematical result to something that will fit into the significand.

In the cases you ask about, the second added number is so small that the rounding produces the same value as the first number. In order to change the first number, you must add a value that is at least half the value of the lowest bit in the significand of the first number. (When rounding, if part that does not fit in the significand is more than half the lowest bit of the significand, it is rounded up. If it is exactly half, it is rounded up if that makes the lowest bit zero or down if that makes the lowest bit zero.)

There are additional issues in floating-point, such as subnormal numbers, infinities, how the exponent is stored, and so on, but the above explains the behavior you asked about.

In the specific case you ask about, adding to 360, adding any value greater than 2^{-45} will produce a sum greater than 360. Adding any positive value less than or equal to 2^{-45} will produce exactly 360. This is because the highest bit in 360 is 2^{8}, so the lowest bit in its significand is 2^{-44}.

What Every Computer Scientist Should Know About Floating-Point Arithmetic– martin clayton Jan 29 '13 at 23:56`sys.float_info`

; it won't tell you much though unless you understand fp in more detail, see the article Martin is pointing you to. – Martijn Pieters Jan 29 '13 at 23:57`decimal`

– forivall Jan 30 '13 at 0:06