Golden spiral: Difference between revisions

Approximate and true golden spirals: the green spiral is made from quarter-circles tangent to the interior of each square, while the red spiral is a golden spiral, a special type of logarithmic spiral. Overlapping portions appear yellow. The length of the side of a larger square to the next smaller square is in the golden ratio.

A Fibonacci spiral approximates the golden spiral; unlike the "whirling rectangle diagram" based on the golden ratio, above, this one uses squares of integer Fibonacci-number sizes, shown for square sizes 1, 1, 2, 3, 5, 8, 13, 21, and 34.

In geometry, a golden spiral is a logarithmic spiral whose growth factor b is related to φ, the golden ratio.^[1] Specifically, a golden spiral gets wider (or further from its origin) by a factor of φ for every quarter turn it makes.

Formula

The polar equation for a golden spiral is the same as for other logarithmic spirals, but with a special value of b:^[2]

${\displaystyle r=ae^{b\theta }\,}$

or

${\displaystyle \theta ={\frac {1}{b}}\ln(r/a),}$

with ${\displaystyle e}$ being the base of natural logarithms, ${\displaystyle a}$ being an arbitrary positive real constant, and ${\displaystyle b}$ such that when ${\displaystyle \theta }$ is a right angle (a quarter turn in either direction):

${\displaystyle e^{b\theta _{\mathrm {right} }}\,=\phi }$

Therefore, ${\displaystyle b}$ is given by

${\displaystyle b={\ln {\phi } \over \theta _{\mathrm {right} }}.}$

The numerical value of ${\displaystyle b}$ depends on whether the right angle is measured as 90 degrees or as ${\displaystyle \textstyle {\frac {\pi }{2}}}$ radians; and since the angle can be in either direction, it is easiest to write the formula for the absolute value of ${\displaystyle b}$ (that is, ${\displaystyle b}$ can also be the negative of this value):

${\displaystyle |b|={\ln {\phi } \over 90}=0.0053468\,}$ for ${\displaystyle \theta }$ in degrees;

${\displaystyle |b|={\ln {\phi } \over \pi /2}=0.306349\,}$ for ${\displaystyle \theta }$ in radians.

An alternate formula for a logarithmic and golden spiral is:^[3]

${\displaystyle r=ac^{\theta }\,}$

where the constant ${\displaystyle c}$ is given by:

${\displaystyle c=e^{b}\,}$

which for the golden spiral gives ${\displaystyle c}$ values of:

${\displaystyle c=\phi ^{\frac {1}{90}}\doteq 1.0053611}$

if ${\displaystyle \theta }$ is measured in degrees, and

${\displaystyle c=\phi ^{\frac {2}{\pi }}\doteq 1.358456.}$

if ${\displaystyle \theta }$ is measured in radians.

Approximations of the golden spiral

File:History of Gold. Rersum 2007.jpg

There are several similar spirals that approximate, but do not exactly equal, a golden spiral.^[4] These are often confused with the golden spiral.

For example, a golden spiral can be approximated by a "whirling rectangle diagram," in which the opposite corners of squares formed by spiraling golden rectangles are connected by quarter-circles. The result is very similar to a true golden spiral (See image on top right).

Another approximation is a Fibonacci spiral, which is not a true logarithmic spiral. Every quarter turn a Fibonacci spiral gets wider not by φ, but by a changing factor related to the ratios of consecutive terms in the Fibonacci sequence. The ratios of consecutive terms in the Fibonacci series approach φ, so that the two spirals are very similar in appearance. (See image on top right).

Spirals in nature

Approximate logarithmic spirals can occur in nature (for example, the arms of spiral galaxies). It is sometimes stated that nautilus shells get wider in the pattern of a golden spiral, and hence are related to both φ and the Fibonacci series. In truth, nautilus shells (and many mollusc shells) exhibit logarithmic spiral growth, but at an angle distinctly different from that of the golden spiral.^[5] This pattern allows the organism to grow without changing shape. Spirals are common features in nature; golden spirals are one special case of these.

See also

• Golden ratio
• Golden rectangle
• Golden angle
• Logarithmic spiral

References

1. "Golden Spiral" by Yu-Sung Chang, The Wolfram Demonstrations Project.
2. Priya Hemenway (2005). Divine Proportion: Φ Phi in Art, Nature, and Science. Sterling Publishing Co. pp. 127–129. ISBN 1402735227.
3. Klaus Mainzer (1996). Symmetries of Nature: A Handbook for Philosophy of Nature and Science. Walter de Gruyter. pp. 45, 199–200. ISBN 3110129906.
4. Charles B. Madden (1999). Fractals in Music: introductory mathematics for musical analysis. High Art Press. pp. 14–16. ISBN 0967172764.
5. Oberon Zell-Ravenheart (2004). Grimoire for the Apprentice Wizard. Career Press. p. 274. ISBN 1564147118.