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README.md |
Binet's Formula
Evaluate Binet's formula extended to real numbers.
Binet's formula refers to the closed-form solution for computing the nth Fibonacci number and may be expressed
where φ
is the golden ratio and ψ
is 1 - φ
. To extend Fibonacci numbers to real numbers, we may express Binet's formula as
Usage
var binet = require( '@stdlib/math/base/special/binet' );
binet( x )
Evaluates Binet's formula extended to real numbers.
var v = binet( 0.0 );
// returns 0.0
v = binet( 1.0 );
// returns 1.0
v = binet( 2.0 );
// returns 1.0
v = binet( 3.0 );
// returns 2.0
v = binet( -1.0 );
// returns 1.0
v = binet( 3.14 );
// returns ~2.12
If provided NaN
, the function returns NaN
.
var v = binet( NaN );
// returns NaN
Notes
- The function returns only approximate Fibonacci numbers for nonnegative integers.
- The function does not return complex numbers, guaranteeing real-valued return values.
Examples
var binet = require( '@stdlib/math/base/special/binet' );
var v;
var i;
for ( i = 0; i < 79; i++ ) {
v = binet( i );
console.log( v );
}