\begin{table}%t9
\caption{\label{tab:modeid2}Mode parameters derived for the secondary component from the application of the FPF method. }
\small%\centerline
{
\begin{tabular}{cccccc}
\hline\hline\noalign{\smallskip}
$\chi^2_\nu$ & $\ell$ & $m$ & $a$  &  \vsini & $\sigma$ \\  \hline
\noalign{\smallskip}
\multicolumn{6}{c}{$f_1=12.81$~\cd} \\ \hline
1.03 & 2 & 1  & 20.2 & 69 & 7.5\\
1.06 & 2 & 2  & 3.7  & 74 & 15.0\\
1.34 & 1 & 1  & 3.7  & 69 & 6.6\\
1.35 & 3 & 2  & 18.9 & 74 & 15.0\\
1.91 & 3 & 3  & 3.1  & 74 & 15.0\\
\hline
\noalign{\smallskip}
\multicolumn{6}{c}{$f_{2b}=19.11$~\cd} \\ \hline
4.06 & 13 & 5  & 22.6  & 72 & 7.5\\
4.23 & 10 & 5  & 15.6  & 74 & 7.5\\
4.30 & 9  & 4  & 12.3  & 70 & 4.7\\
4.33 & 12 & 4  & 20.3  & 68 & 6.6\\
4.45 & 10 & 10 & 1.0   & 71 & 7.5\\
\hline
\noalign{\smallskip}
\multicolumn{6}{c}{$f_3=24.56$~\cd}\\ \hline
2.09 & 6 & 3  & 20.9 & 70 & 7.5\\
2.15 & 6 & 5  & 7.7  & 69 & 5.6\\
2.21 & 7 & 4  & 28.6 & 71 & 11.2\\
2.34 & 7 & 6  & 13.7 & 74 & 11.2\\
2.34 & 6 & 6  & 1.6  & 69 & 11.2\\
\hline
\end{tabular}}
\smallskip
For each pulsation mode, the five best solutions are shown. 
\end{table}