Difference between revisions of "Manuals/calci/GOLDENRATIO"
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− | =GOLDENRATIO( | + | =GOLDENRATIO(phiSmall)= |
*where <math>phiSmall</math> is the logical value TRUE or FALSE. | *where <math>phiSmall</math> is the logical value TRUE or FALSE. |
Revision as of 17:52, 15 June 2018
GOLDENRATIO(phiSmall)
- where is the logical value TRUE or FALSE.
GOLDENRATIO() returns the ratio of the longer part divided by the smaller part is also equal to the whole length divided by the longer part.
Description
- Two quantities are in the golden ratio if their ratio is the same as the ratio of their sum to the larger of the two quantities.
- Golden ratio is represented as φ(phi or Smallphi) and its conjugate is represented as Φ(Phi or capitalphi).
- If 'a' and 'b' are two quantities with 'a>b', then
φ = =
- Using quadratic formula, golden ratio is represented as -
= = 1.618033988749895
= = -0.6180339887498948 (Absolute value 0.6180339887498948 is considered as capitalphi)
- Argument can be logical values TRUE (or 1) or FALSE (or 0). Any other argument values are ignored and Calci assumes it to be TRUE or 1.
- If argument is omitted, Calci assumes it as TRUE or 1 and displays the output as 0.6180339887498948.
- If argument is invalid, Calci returns a #NULL error message.
Examples
GOLDENRATIO(TRUE) returns 0.6180339887498948, value of capitalphi Φ
GOLDENRATIO(1) returns 0.6180339887498948, value of capitalphi Φ
GOLDENRATIO(FALSE) returns 1.618033988749895, value of smallphi φ
GOLDENRATIO() returns 0.6180339887498948, value of capitalphi Φ
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See Also
References