golden ratio:
phi = (1 + sqrt(5)) / 2
the version of Binet's formula for the nth Fibonacci number which uses the round-to-the-nearest-integer function is
F[n] = round( phi^n / sqrt(5) )
if that division by sqrt(5) is annoying, another way to write it is
F[n] = round( phi^(n-z) )
where
z = log( Base phi, sqrt(5) ) = log(5) / (2*log(phi)) ~= 1.6722759381845547461703191263944365539
.
not sure what this would be useful for. you need exp and log to compute exponentiation by the non-integer exponent, in contrast to simpler exponentiation by squaring for the integer exponent in the original formula.
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