| Object | (b -y)st | Err(b -y)st | m1st | Errm1st | c1st | Errc1st | H  st | ErrH
st |
| BD -00 03543 | -0.023 | 0.011 | 1.707 | 0.170 | 0.299 | 0.151 | 3.467 | 0.324 |
| BD -12 05132 | -2.594 | 0.078 | 0.314 | 0.360 | 2.467 | 0.825 | 4.372 | 0.840 |
| BD -19 05036 | 0.242 | 0.013 | 0.336 | 0.080 | 0.011 | 0.056 | 2.826 | 0.080 |
| BD -20 05381 | 0.029 | 0.012 | 0.377 | 0.074 | 0.112 | 0.052 | 2.728 | 0.050 |
| BD +02 03815 | 0.099 | 0.011 | 0.577 | 0.084 | 0.105 | 0.056 | 2.753 | 0.057 |
| BD +23 1448 | 0.461 | 0.021 | -0.147 | 0.112 | 0.197 | 0.133 | 2.473 | 0.118 |
| BD +27 797 | 0.285 | 0.014 | -0.447 | 0.086 | 0.216 | 0.112 | 2.477 | 0.095 |
| BD +27 850 | 0.098 | 0.013 | -0.003 | 0.067 | 0.176 | 0.076 | 2.571 | 0.068 |
| BD +36 03946 | 0.349 | 0.014 | -0.149 | 0.079 | -0.039 | 0.066 | 2.582 | 0.063 |
| BD +37 03856 | 0.289 | 0.014 | 0.027 | 0.076 | -0.016 | 0.060 | 2.629 | 0.051 |
| BD +37 675 | -0.002 | 0.010 | 0.526 | 0.079 | 0.123 | 0.052 | 2.738 | 0.052 |
| BD +40 1213 | 0.020 | 0.011 | 0.232 | 0.067 | 0.117 | 0.052 | 2.699 | 0.045 |
| BD +42 1376 | 0.073 | 0.011 | 0.145 | 0.066 | 0.098 | 0.052 | 2.672 | 0.044 |
| BD +46 275 | -0.031 | 0.010 | 0.592 | 0.082 | 0.164 | 0.061 | 2.744 | 0.055 |
| BD +47 03985 | -0.025 | 0.010 | 0.257 | 0.067 | 0.145 | 0.056 | 2.700 | 0.045 |
| BD +49 614 | -0.018 | 0.011 | 0.585 | 0.083 | 0.133 | 0.054 | 2.770 | 0.061 |
| BD +55 552 | 0.166 | 0.015 | 0.366 | 0.079 | -0.012 | 0.052 | 2.703 | 0.048 |
| BD +55 605 | 0.241 | 0.013 | 0.084 | 0.073 | -0.050 | 0.059 | 2.668 | 0.044 |
| BD +56 473 | 0.275 | 0.013 | -0.075 | 0.074 | 0.010 | 0.060 | 2.613 | 0.055 |
| BD +56 478 | 0.255 | 0.014 | -0.001 | 0.074 | -0.021 | 0.058 | 2.628 | 0.051 |
| BD +56 511 | 0.397 | 0.015 | 0.232 | 0.089 | -0.132 | 0.081 | 3.438 | 0.202 |
| BD +56 573 | 0.309 | 0.015 | -0.235 | 0.082 | 0.088 | 0.078 | 2.597 | 0.057 |
| BD +20 4449 | 0.030 | 0.008 | 0.037 | 0.052 | 0.029 | 0.017 | 2.622 | 0.051 |
| BD +29 3842 | 0.342 | 0.013 | 0.166 | 0.081 | -0.075 | 0.033 | 2.689 | 0.044 |
| BD +29 4453 | 0.077 | 0.008 | -0.004 | 0.053 | -0.019 | 0.016 | 2.660 | 0.043 |
| BD +31 4018 | 0.194 | 0.009 | -0.108 | 0.061 | -0.027 | 0.021 | 2.617 | 0.052 |
| BD +42 4538 | 0.107 | 0.008 | 0.321 | 0.060 | -0.013 | 0.017 | 2.705 | 0.044 |
| BD +50 825 | 0.065 | 0.007 | 0.629 | 0.072 | 0.105 | 0.018 | 2.763 | 0.059 |
| BD +58 554 | 0.279 | 0.011 | 0.635 | 0.089 | -0.040 | 0.027 | 2.806 | 0.072 |
| CD -22 13183 | 0.144 | 0.012 | 0.405 | 0.078 | 0.092 | 0.057 | 2.709 | 0.047 |
| Table 6.2: | The full Strömgren data set for the representative sample. |
level, although the form of that correlation is
not returned. Regarding this a cautionary note is sounded by Anscombe’s quartet
(Anscombe, 1973, see also Wall 1996), which shows four simple eleven point x,y scatter
plots each of which contain the same mean x and y value, the same correlation
coefficient, the same linear fits and error on the fits, but very different scatters.
Two of the plots would not normally be associated with linear fits; whilst the data
maybe correlated the form of that correlation is far from clear and not necessarily
a simple linear. To be noted also is that the correlation test does not take into
account errors on the data; “No quantity is of the slightest use unless it has an
error of measurement associated, the uncertainties must be known” (Wall, 1996).
To ascertain the form of the association a linear relationship is fitted as a first
attempt.
The results of both fits are in agreement with those of Fabregat and Torrejon (1998), however
the errors on those fits are too large to regard the data to be linearly related on the basis of
these data alone, the source of the errors on the fits come from the observations.
The 
reduced2=1.047 which gives more substance to the linear fit being correct.
Fabregat and Torrejon (1998) supply 1 error values ( = 0.043), although this
value appears to be the scatter about the fitted line and not an error on the fits,
as a comparison the standard deviation on the representative sample is 0.07. It
is therefore not clear whether the fits presented by Fabregat and Torrejon (1998)
can be regarded with more significance than those derived for the representative
sample.
In an attempt to ascertain how significant the effect of including objects above B5 is, the full representative data sample is plotted, see Figure 6.6. Whilst rs is smaller for those plots containing the full data sample (see Table 6.3) the confidence levels are the same, indicating that there is no significant difference between the two data sets and that the change in correlation between data sets is minimal.
|
|
Plot rs dof Sig. level Conf. level Stan. dev. Gradient Intercept _____
E(b - y)cs vs H
 0.34 26 0.05 3.0 ±0.06 0.0008±0.0011 +0.017±0.027
E(b - y)cs vs H 0.28 26 0.10 3.0 ±0.07 0.0030±0.0068 +0.021±0.029
Mv (Stromgren) vs Mv (Schmidt-Kaler) 0.77 24 <0.0005 4.0 ±1.44 0.4788±0.1240 +0.710±0.344
Including only values earlier than B5
E(b - y)cs vs H 0.43 21 0.025 3.0 ±0.07 0.0008±0.0011 +0.022±0.028
E(b - y)cs vs H 0.40 21 0.05 3.0 ±0.07 0.0050±0.0067 +0.020±0.028
Mv (Stromgren) vs Mv (Schmidt-Kaler) 0.72 21 <0.0005 4.0 ±1.27 0.2954±0.065 +0.077±0.072__
Table 6.3: Full Table of Reduced Results for the Representative Sample (uvby). Col. 1 indicates the plot and whence it has been derived,
the Spearman rank correlation coefficient is listed in Col. 2 and the number of degrees of freedom of the test in Col. 3. Col. 4 shows the
significance levels obtained from the lookup tables of Wall (1996) and Col. 5 the confidence levels extracted from Wall (1979). The standard
deviation about the weighted least squares fit is given in Col. 6 and Cols. 7 & 8 give the weighted gradient and intercept of each fit. |
Using zero age main sequence fits, derived by Balona and Shobbrook (1984), it is possible to derive the magnitude (Mv) of the underlying Be star. The generated magnitudes are plotted against magnitudes tabulated by Schmidt-Kaler (1982). The results are plotted in Figure 6.7.
|
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