But the U.S. banks trade at lower book value multiples with
a harmonic average of 1.29 versus 1.73 north of the border.
The weighted
harmonic average of closing market price divided by the most recent reported book value for each security in the fund's portfolio as calculated for the last twelve months.
Given that there are multiple definitions of «average» (arithmetical average -LCB- or mean -RCB-, geometrical average -LCB- or mean -RCB-,
harmonic average -LCB- or mean -RCB-, weighted average, etc.), then yes, «average» could mean something different to two different people.
The weighted
harmonic average of closing market price divided by the most recent reported book value for each security in the fund's portfolio as calculated for the last twelve months.
The weighted
harmonic average of current share price divided by the forecasted one year earnings per share for each security in the fund.
Not exact matches
Has anyone tried modeling the pole as a circular disc using the temperature at the center as a measure of
average polar temperature, borrowing an idea from harmonic analysis (Average Value Th
average polar temperature, borrowing an idea from
harmonic analysis (
Average Value Th
Average Value Theorem)?
For both monthly and model year
averages, sales - weighted
harmonic means were calculated.
The cypher pattern is an advanced
harmonic price action pattern that, when traded correctly, can achieve a truly outstanding strike - rate as well as a pretty good
average reward - to - risk ratio.
The
harmonic mean is smaller than the usual «
average» most of us are familiar with.
2) Its yearly
average values can always be decomposed EXACTLY over any finite interval as a linear superposition of discrete (line spectrum) sinusoidal
harmonics by DFT analysis, which always ASSUMES N - periodicity.
To elaborate on the question at the end of my above comment — among all other considerations and obstacles, how practical would it be to go back over the past 100 + years and compute monthly anomalies of globally
averaged SST using spherical
harmonic functions?
There are a number of papers by Samuel S. Shen looking at the design of observing networks for estimating spherical
harmonics with idealised surface temperature distributions, but I'm not aware of the technique having been used to reconstruct global
average temperature using the real distribution of stations and data.
The global
average temperature is just the coefficient of the (0,0) spherical
harmonic, and the regression will give its standard error.
The quiet - time behavior of the ionospheric electron density peak height of the F2 region, hmF2, has been evaluated from
average electron density profiles and analytically modeled by the Spherical
Harmonic Analysis (SHA) technique following the same methodology as described by Altadill et al. (2009).