\begin{table}%t2
\caption{\label{tab2}The degree of randomness $\Phi$ for the CS and the NCS.}
\small%\centerline
 {
\begin{tabular}{c c c c c }
\hline\hline
          &      Cold       & Northern        & Gauss +   &       \\
          &      Spot       & Cold Spot       & noise     & Gauss \\ 
\hline
  $l$     & 208\fdg7 & 294\fdg8 &           &       \\       
  $b$     & --55\fdg6 &  60\fdg8 &           &       \\       
 $N_1$    &   239           &    243          &  239      & 239   \\       
 $N_2$    &  2155           &   2154          & 2157      & 2157  \\      
 $N_3$    &  5987           &   5989          & 5983      & 5984  \\      
 $\Phi_1$ &  0.02           &   0.03          & 0.17      & 0.15  \\      
 $\Phi_2$ &  0.68           &   0.43          & 0.15      & 0.15  \\      
 $\Phi_3$ &  0.98           &   0.98          & 0.18      & 0.15  \\      
\hline
\end{tabular}}
\medskip
The columns contain coordinates of their centers, the pixel counts within 1$^{\circ}$~($N_1$), 3$^{\circ}$~($N_3$), and 5$^{\circ}$~($N_5$)~radii, and values for $\Phi$ for each region. Mean~$\Phi$ for 20~simulated Gaussian maps with superposed WMAP's noise (Gauss+noise) and without noise, i.e. isotropic map.
\end{table}