Difference between revisions of "Golden ratio"
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| − | [[Relationship between sine, imaginary number, logarithm, and the golden ratio]] | + | [[Relationship between sine, imaginary number, logarithm, and the golden ratio]]<br /> |
| − | [[Relationship between cosine, imaginary number, logarithm, and the golden ratio]] | + | [[Relationship between cosine, imaginary number, logarithm, and the golden ratio]]<br /> |
=Videos= | =Videos= | ||
Revision as of 09:20, 5 June 2016
The golden ratio $\varphi$ is the irrational algebraic number $$\varphi = \dfrac{1+\sqrt{5}}{2}.$$
Properties
Relationship between sine, imaginary number, logarithm, and the golden ratio
Relationship between cosine, imaginary number, logarithm, and the golden ratio
Videos
The Golden Ratio & Fibonacci Numbers: Fact versus Fiction
