harmonic mean การใช้

• Thus it illustrates why the harmonic mean works in this case.
• Similarly, the harmonic mean is lower than the geometric mean.
• Another example of a weighted mean is the weighted harmonic mean.
• This equality follows from the following symmetry displayed between both harmonic means:
• Finding averages may involve using weighted averages and possibly using the Harmonic mean.
• Then the effective population size is the harmonic mean of these, giving:
• The harmonic mean is very sensitive to low values.
• The arithmetic mean is often mistakenly used in places calling for the harmonic mean.
• Then equals half the harmonic mean of and.
• The contraharmonic is the remainder of the diameter on which the harmonic mean lies.
• The harmonic mean tends to be dominated by the smallest bottleneck that the population goes through.
• It's the harmonic mean.
• The arithmetic harmonic mean can be similarly defined, but takes the same value as the geometric mean.
• However one may avoid use of the harmonic mean for the case of " weighting by distance ".
• The geometric harmonic mean can be calculated by an analogous method, using sequences of geometric and harmonic means.
• The geometric harmonic mean can be calculated by an analogous method, using sequences of geometric and harmonic means.
• The solution can also be written as a weighted harmonic mean of the initial condition and the carrying capacity,
• It is more apparent that the harmonic mean is related to the dual of the arithmetic mean for positive inputs:
• The harmonic mean is related to the other Pythagorean means, as seen in the third formula in the above equation.
• Interestingly, this is one-half of the harmonic mean of 6 and 4 : 4.8 } }.