Note: Analogous to the golden ratio, the bronze ratio is the positive solution to the equation x2=3x+1, which equals 23+32+4ββ and has the continued fraction expansion 3+3+3+β―1β1β. The approximation evaluated in this problem is accurate to three decimal places (3.303). Assuming the continued fraction expansion has a limiting value x0β, it can be seen that x0β=3+x0β1β, which is equivalent to x02β=3x0β+1.
The bronze ratio, 23+32+4ββ, is analogous to the golden ratio, 21+12+4ββ. The golden ratio is associated with
1+1+1+β―1β1β
Similarly, the silver ratio is 22+22+4ββ, associated with
2+2+2+β―1β1β
These metallic ratios are also related to generalizations of the Fibonacci sequence, arise as lengths of diagonals in regular polygons, and have many other geometric and algebraic interpretations as well.