MeansWhat do we mean by mean?Math isn't tough, but it can be mean. The term "mean" in mathematics simply reflects a specific relationship of one number as the middle point of two extremes. Arithmetic meansThe arithmetic mean of 2 and 6 is 4, as 4 is equally distant between the two in addition: 2 + 2 = 4
For the arithmetic mean (b) of two numbers (a) and (c): b = ( a + c ) / 2 4 = ( 2 + 6 ) / 2 The arithmetic mean is thus the simple average between two numbers. Geometric meansThe geometric mean is similar, but based on a common multiplier that relates the mean to the other two numbers. As an example, the geometric mean of 2 and 8 is 4, as 4 is equally distant between the two in multiplication: 2 * 2 = 4
So 2 is to 4 as 4 is to 8. For the geometric mean (b) of two numbers (a) and (c), b = Ö ( a * c ) 4 = Ö ( 2 * 8 ) The Golden MeanThe Golden Mean is a very specific geometric mean. In the geometric mean above, we see the following lengths of line segments on the number line:
Here, 2 x 2 = 4 and 4 x 2 = 8, but 2 + 4 = 6, not 8. The Golden Mean imposes the additional requirement that the two segments that define the mean also add to the length of the entire line segment:
This occurs only at one point, which as you can see above is just a little less than 5/8ths, or 0.625. The actual point of the Golden Mean is at 0.6180339887..., where: A is to B as B
is to C
If we instead let the length of line B equal 1,
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