\begin{table}%t10
\caption{\label{estimatorsEBpop3}SFR estimators based on \nlyc\ and \lcuva\ for Pop. III.}
\small%\centering
\par
\begin{tabular}{ccccccc}
\hline\hline \noalign{\smallskip}
 & \multicolumn{2}{c}{EB($2{-}120$~\msun)\tablefootmark{\dag}} & \multicolumn{2}{c}{EB($1{-}100$~\msun)} &  \multicolumn{2}{c}{EB($1{-}500$~\msun)}  \\ 
Age & \nlyc\tablefootmark{a} & \lcuva\tablefootmark{b} & \nlyc\tablefootmark{a} & \lcuva\tablefootmark{b}  & \nlyc\tablefootmark{a}  & \lcuva\tablefootmark{b}  \\
\hline \noalign{\smallskip}
$10$~Myr & $1.27\times 10^{-54}$ & $7.96\times 10^{-41}$ & $1.70\times 10^{-54}$ & $1.07\times 10^{-40}$ & $1.26\times 10^{-54}$ & $8.67\times 10^{-41}$ \\
$30$~Myr & $1.15\times 10^{-54}$ & $5.60\times 10^{-41}$ & $1.55\times 10^{-54}$ & $7.50\times 10^{-41}$ & $1.18\times 10^{-54}$ & $6.61\times 10^{-41}$ \\
$250$~Myr & $1.14\times 10^{-54}$ & $3.53\times 10^{-41}$ & $1.53\times 10^{-54}$ & $4.73\times 10^{-41}$ & $1.17\times 10^{-54}$ & $4.52\times 10^{-41}$ \\
\hline
\end{tabular} 
\tablefoot{\tablefoottext{\dag}{Values for $2{-}120$~\msun\ were obtained analytically from those for $1{-}100$~\msun.}
\tablefoottext{a}{Measured in~s$^{-1}$~(\msun~yr$^{-1})^{-1}$.}
\tablefoottext{b}{Measured in~\ergs~\AA$^{-1}$~(\msun~yr$^{-1})^{-1}$.} }
\end{table}