Talk:Almost integer

An approximation
$$2 \pi + e \approx 9.001$$

$$\sqrt{2\pi + e} \approx 3.0002$$

The sum of the length of the unit circle, and Euler's famous constant.

Another almost integer identity related to Gelfond's constant is:
$$\frac{e^\pi-\pi-1}{6\pi} \approx 1,0079$$

check it

80.32.203.50 (talk) 10:26, 21 June 2008 (UTC)

This article explains why that some almost integer powers of the golden ratio are non-coincidental, but how about this?
The solution to Fib(x)=x+1, when multiplied by 200 is almost exactly 1119 (when rounded to 4 decimal places it's 1118.0000). So... is this coincidental or non-coincidental? Robo37 (talk) 19:01, 4 September 2011 (UTC)