# Exhausting floating point precision in a (seemingly) infinite loop

I've got the following Python script:

``````x = 300000000.0
while (x < x + x):
x = x + x
print "exec: " + str(x)
print "terminated" + str(x)
``````

This seemingly infinite loop, terminates pretty quickly if x is a floating point number. But if i change x to 300000000 instead, it gets into an infinite loop (runs longer than a minute in my test).

I think this is to do with the fact that it's exhausting the precision of a floating point number that can be represented in memory. Can someone provide a more detailed explanation why this is?

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• When you initialize `x` to `300000000`, integer math is used throughout the program.
• When you initialize `x` to `300000000.0`, floating-point math is used instead.

In Python, integers can grow arbitrarily large. (More accurately, they're limited by the available memory.) This means that the integer version of your program takes a very long time to terminate.

The largest `float` is about `1.8e308`. It takes about 1000 iterations of the floating-point version of the loop to exceed that value, at which point `x` gets set to positive infinity, and the program terminates.

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This is because a floating-point overflow occurs. In that case, as per IEEE754, `x` will adopt the value positive infinity, which is by definition not less than anything else:

``````>>> x = float("inf")
>>> x
inf
>>> x + x
inf
>>> x < x + x
False
``````
-

`x` doubles after each step. A finite number `x` is never equal to `2 * x`. But once you exceed the maximum exponent of your floating point type, the doubling turns `x` to `+infinity`. And `+infinity = 2*+infinity`. So the loop terminates at that point.

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