\begin{table}%t1 \par \caption{\label{tsample}Target coordinates and parameters.} \small %\centerline { \begin{tabular}{llcccccccc} \hline\hline\noalign{\smallskip} Object&Alternative name &$\alpha$(2000.0)&$\delta$(2000.0)&Spectral&\teff&Eq. Width$^a$ & Class$^b$ &Multiplicity &Projected$^c$\\ & &(h m s) &(\degr~\arcmin~\arcsec)&type&(K)& \halpha & &status &separation (\arcsec)\\ \hline MBM~12-1 &RX J0255.4+2005 & 02 55 25.78 &20 04 51.7 &K6 &4205&--1 & WTTS &B &0.533\\ MBM~12-2 &Lk\halpha \ 262 & 02 56 07.99 &20 03 24.3 &M0 &3850&--40 & CTTS &(Q)$^e$&15.3\\ MBM~12-3 &Lk\halpha \ 263 (A-B/B-C)& 02 56 08.42 &20 03 38.6&M3 &3415 &--25 & CTTS &T &0.416/4.1\\ MBM~12-4 &Lk\halpha \ 264 & 02 56 37.56 &20 05 37.1 &K5 &4350&--18 & CTTS &B &9.160\\ MBM~12-5 &E 02553+2018 & 02 58 11.23 &20 30 03.5 &K3 &4660 &--3 & W/CTTS$^f$ &B &1.144\\ MBM~12-6 &RX J0258.3+1947 & 02 58 16.09 &19 47 19.6 &M5 &3200 &--29 & CTTS &S &--\\ MBM~12-7 &RX J0256.3+2005 & 02 56 17.98 &20 06 09.9 &M5.75 &3024&--14 & WTTS &-- &--\\ MBM~12-8 &-- & 02 57 49.02 &20 36 07.8 &M5.5 &3058&--120 & CTTS &-- &--\\ MBM~12-9 &-- & 02 58 13.37 &20 08 25.0 &M5.75 &3024&--10 & WTTS &-- &--\\ MBM~12-10 &-- & 02 58 21.10 &20 32 52.7 &M3.25 &3379&--12 & WTTS &B &0.390\\ MBM~12-11 &-- & 02 58 43.80 &19 40 38.3 &M5.5 &3058&--14 & WTTS &-- &--\\ MBM~12-12 & S 18 (A-B/Ba-Bb) & 03 02 21.05 &17 10 34.2 &M3 &3415&--69 & CTTS & T &0.747/0.063\\ \hline \end{tabular}} \smallskip $^a$ H$\alpha$ equivalent width of the primary from Luhman (\cite{luhman2001}). A negative equivalent width means emission; the width is given in angstroms, \AA. \\ $^b$ T~Tauri Class as derived by us (see Sect.~\ref{s_targets}).\\ $^c$ From Chauvin et~al.\ (\cite{chauvin2002}) and Brandeker et~al.\ (\cite{brandeker2003}).\\ $^d$ S: single, B: binary, T: triple and Q: quadruple.\\ $^e$ Possible companion to Lk\halpha \ 263 ABC.\\ $^f$ On the border between weak-line and classical TTS, see target notes in Sect.~\ref{s_targets}. \end{table}