\begin{table}%tD.2
\caption{\label{tab:percentages-full}Percentage of CEMP, CNEMP and NEMP (sub-)giants relative to total EMP~giants in all our model binary populations (see Sect.~\ref{sub:model-Selection-criteria} for selection criteria).}
\small%\centerline
 {
\begin{tabular}{ccccc}
\hline\hline \noalign{\smallskip}
Model set & CEMP/EMP $\%$ & CNEMP/EMP $\%$ & NEMP/EMP $\%$ \\
\hline
$A$, {\it A1}, {\it A2} & $2.300 \pm 0.034$ & $0.098 \pm 0.002$ & $0.267 \pm 0.007$ \\
{\it CEp1} & $2.370 \pm 0.029$ & $0.100 \pm 0.002$ & $0.273 \pm 0.007$ \\
{\it CE3} & $2.300 \pm 0.033$ & $0.097 \pm 0.002$ & $0.267 \pm 0.006$ \\
{\it B} & $3.050 \pm 0.038$ & $0.157 \pm 0.003$ & $0.323 \pm 0.006$ \\
{\it Ae5} & $2.150 \pm 0.033$ & $0.086 \pm 0.002$ & $0.249 \pm 0.007$ \\
{\it 8} & $2.460 \pm 0.034$ & $0.101 \pm 0.002$ & $0.268 \pm 0.006$ \\
{\it E} & $2.900 \pm 0.040$ & $0.098 \pm 0.002$ & $0.267 \pm 0.006$ \\
{\it 10} & $2.640 \pm 0.032$ & $0.208 \pm 0.003$ & $0.310 \pm 0.005$ \\
{\it 11} & $1.490 \pm 0.021$ & $0.053 \pm 0.001$ & $0.091 \pm 0.002$ \\
{\it 12} & $0.489 \pm 0.009$ & $0.005 \pm 0.000$ & $0.015 \pm 0.001$ \\
{\it 13} & $0.101 \pm 0.004$ & $0.000$ & $0.000$ \\
{\it 14} & $2.460 \pm 0.035$ & $0.099 \pm 0.002$ & $0.291 \pm 0.007$ \\
{\it 15} & $2.640 \pm 0.036$ & $0.100 \pm 0.002$ & $0.303 \pm 0.007$ \\
{\it C} & $2.940 \pm 0.038$ & $0.103 \pm 0.002$ & $0.311 \pm 0.007$ \\
{\it D} & $4.210 \pm 0.039$ & $0.290 \pm 0.003$ & $0.409 \pm 0.004$ \\
{\it At12} & $2.230 \pm 0.047$ & $0.093 \pm 0.003$ & $0.258 \pm 0.009$ \\
{\it At8} & $2.480 \pm 0.028$ & $0.110 \pm 0.002$ & $0.278 \pm 0.005$ \\
{\it F} & $6.470 \pm 0.030$ & $0.103 \pm 0.002$ & $0.267 \pm 0.006$ \\
{\it 27} & $8.840 \pm 0.041$ & $0.171 \pm 0.003$ & $0.273 \pm 0.004$ \\
{\it 28} & $8.320 \pm 0.039$ & $0.103 \pm 0.002$ & $0.266 \pm 0.006$ \\
{\it Ap5} & $3.460 \pm 0.042$ & $0.203 \pm 0.003$ & $0.267 \pm 0.004$ \\
{\it Ap7} & $2.990 \pm 0.039$ & $0.158 \pm 0.003$ & $0.267 \pm 0.005$ \\
{\it 31} & $11.600 \pm 0.053$ & $0.256 \pm 0.003$ & $0.273 \pm 0.004$ \\
{\it 32} & $10.400 \pm 0.048$ & $0.221 \pm 0.003$ & $0.273 \pm 0.004$ \\
{\it 33} & $2.490 \pm 0.035$ & $0.116 \pm 0.003$ & $0.340 \pm 0.008$ \\
{\it 34} & $6.520 \pm 0.030$ & $0.103 \pm 0.002$ & $0.267 \pm 0.006$ \\
{\it B1} & $9.430 \pm 0.044$ & $0.103 \pm 0.002$ & $0.266 \pm 0.006$ \\
{\it 36} & $5.640 \pm 0.060$ & $0.102 \pm 0.002$ & $0.267 \pm 0.006$ \\
{\it 37} & $2.260 \pm 0.036$ & $0.096 \pm 0.002$ & $0.262 \pm 0.006$ \\
{\it 38} & $2.270 \pm 0.036$ & $0.096 \pm 0.002$ & $0.264 \pm 0.006$ \\
{\it 39} & $2.280 \pm 0.035$ & $0.097 \pm 0.002$ & $0.265 \pm 0.007$ \\
{\it 40} & $2.300 \pm 0.036$ & $0.098 \pm 0.002$ & $0.265 \pm 0.007$ \\
{\it 41}, {\it 42} & $2.280 \pm 0.035$ & $0.097 \pm 0.002$ & $0.265 \pm 0.006$ \\
{\it B2} & $14.900 \pm 0.063$ & $0.303 \pm 0.003$ & $0.425 \pm 0.004$ \\
{\it 44} & $14.600 \pm 0.066$ & $0.286 \pm 0.003$ & $0.389 \pm 0.004$ \\
{\it 45}, $G$ & $9.430 \pm 0.044$ & $0.103 \pm 0.002$ & $0.266 \pm 0.006$ \\
{\it 47} & $2.060 \pm 0.028$ & $0.000$ & $0.002 \pm 0.000$ \\
{\it 48}, {\it 50} & $8.320 \pm 0.039$ & $0.103 \pm 0.002$ & $0.266 \pm 0.006$ \\
{\it 51}, {\it 52}, {\it 53} & $14.700 \pm 0.064$ & $0.298 \pm 0.003$ & $0.426 \pm 0.004$ \\
{\it H}, {\it 55}, {\it 56} & $15.500 \pm 0.068$ & $0.298 \pm 0.003$ & $0.426 \pm 0.004$ \\
{\it 57}, {\it 58}, {\it 59} & $12.900 \pm 0.057$ & $0.278 \pm 0.003$ & $0.387 \pm 0.004$ \\
\hline
\end{tabular}}
\medskip
The errors convey Poisson statistics only. 
\end{table}