Ich bin etwas verzweifelt. Ich lerne jetzt schon eine Weile LateX. Ich habe hier im Forum schon nach Hilfe gesucht, kann sie aber nicht auf mein Problem anpassen.
Ich habe eine 25x25-Matrix. Ich habe untere Zeilen (mit Lambdas) und auf der rechten Seite sind die Variablen. Da die Matrix so groß ist, passt sie nicht auf eine Seite. Ich würde sie gerne auf mehrere Seiten aufteilen. Danke
\documentclass{article}
\usepackage{booktabs}
\usepackage{ltablex}
\begin{document}
\begin{table}
\begin{tabular}{llllllllllllllllllllllll|l}
$\mathbf{(0.000 \angle -180.00)}$ & $\mathbf{(0.005 \angle 156.59)}$ & $\mathbf{(0.005 \angle -156.59)}$ & $\mathbf{(0.000 \angle 0.00)}$ & $\mathbf{(0.000 \angle -0.00)}$ & $\mathbf{(0.000 \angle 0.00)}$ & $\mathbf{(0.000 \angle 180.00)}$ & $\mathbf{(0.001 \angle 180.00)}$ & $\mathbf{(0.229 \angle 3.19)}$ & $\mathbf{(0.229 \angle -3.19)}$ & $\mathbf{(0.000 \angle -11.91)}$ & $\mathbf{(0.000 \angle 11.91)}$ & $\mathbf{(0.071 \angle 21.78)}$ & $\mathbf{(0.071 \angle -21.78)}$ & $\mathbf{(0.027 \angle -180.00)}$ & $\mathbf{(0.000 \angle 0.00)}$ & $\mathbf{(0.002 \angle 180.00)}$ & $\mathbf{(0.087 \angle 180.00)}$ & $\mathbf{(0.355 \angle -0.00)}$ & $\mathbf{(0.513 \angle -180.00)}$ & $\mathbf{(0.272 \angle 0.00)}$ & $\mathbf{(5.376 \angle -68.74)}$ & $\mathbf{(5.376 \angle 68.74)}$ & $\mathbf{(3.475 \angle 180.00)}$ & $\Delta\delta_{G_1}$ \\
$\mathbf{(0.000 \angle 180.00)}$ & $\mathbf{(0.005 \angle 156.59)}$ & $\mathbf{(0.005 \angle -156.59)}$ & $\mathbf{(0.000 \angle -0.00)}$ & $\mathbf{(0.000 \angle 0.00)}$ & $\mathbf{(0.000 \angle -0.00)}$ & $\mathbf{(0.000 \angle 180.00)}$ & $\mathbf{(0.001 \angle -180.00)}$ & $\mathbf{(0.229 \angle 3.20)}$ & $\mathbf{(0.229 \angle -3.20)}$ & $\mathbf{(0.000 \angle -11.91)}$ & $\mathbf{(0.000 \angle 11.91)}$ & $\mathbf{(0.071 \angle 21.79)}$ & $\mathbf{(0.071 \angle -21.79)}$ & $\mathbf{(0.027 \angle -180.00)}$ & $\mathbf{(0.000 \angle -0.00)}$ & $\mathbf{(0.002 \angle -180.00)}$ & $\mathbf{(0.087 \angle -180.00)}$ & $\mathbf{(0.356 \angle 0.00)}$ & $\mathbf{(0.514 \angle -180.00)}$ & $\mathbf{(0.272 \angle -0.00)}$ & $\mathbf{(5.499 \angle -61.43)}$ & $\mathbf{(5.499 \angle 61.43)}$ & $\mathbf{(4.836 \angle -180.00)}$ & $\Delta\omega_{G_1}$ \\
$\mathbf{(0.000 \angle 0.00)}$ & $\mathbf{(0.003 \angle -176.88)}$ & $\mathbf{(0.003 \angle 176.88)}$ & $\mathbf{(0.000 \angle -180.00)}$ & $\mathbf{(0.001 \angle -180.00)}$ & $\mathbf{(0.000 \angle -0.00)}$ & $\mathbf{(0.000 \angle -0.00)}$ & $\mathbf{(0.000 \angle 180.00)}$ & $\mathbf{(0.013 \angle 73.52)}$ & $\mathbf{(0.013 \angle -73.52)}$ & $\mathbf{(0.000 \angle -26.29)}$ & $\mathbf{(0.000 \angle 26.29)}$ & $\mathbf{(0.007 \angle 89.22)}$ & $\mathbf{(0.007 \angle -89.22)}$ & $\mathbf{(0.002 \angle 0.00)}$ & $\mathbf{(0.000 \angle 0.00)}$ & $\mathbf{(0.000 \angle 0.00)}$ & $\mathbf{(0.009 \angle 180.00)}$ & $\mathbf{(0.060 \angle -0.00)}$ & $\mathbf{(0.682 \angle 0.00)}$ & $\mathbf{(0.023 \angle -0.00)}$ & $\mathbf{(0.101 \angle 48.36)}$ & $\mathbf{(0.101 \angle -48.36)}$ & $\mathbf{(0.108 \angle 0.00)}$ & $\Delta e_q\prime_{G_1}$ \\
$\mathbf{(0.000 \angle 180.00)}$ & $\mathbf{(0.035 \angle -178.36)}$ & $\mathbf{(0.035 \angle 178.36)}$ & $\mathbf{(0.000 \angle -0.00)}$ & $\mathbf{(0.001 \angle 180.00)}$ & $\mathbf{(0.002 \angle -0.00)}$ & $\mathbf{(0.018 \angle -180.00)}$ & $\mathbf{(0.019 \angle -180.00)}$ & $\mathbf{(0.018 \angle 167.73)}$ & $\mathbf{(0.018 \angle -167.73)}$ & $\mathbf{(0.000 \angle 128.27)}$ & $\mathbf{(0.000 \angle -128.27)}$ & $\mathbf{(0.001 \angle 141.18)}$ & $\mathbf{(0.001 \angle -141.18)}$ & $\mathbf{(0.588 \angle 0.00)}$ & $\mathbf{(0.000 \angle 0.00)}$ & $\mathbf{(0.171 \angle -0.00)}$ & $\mathbf{(0.381 \angle 0.00)}$ & $\mathbf{(0.002 \angle 180.00)}$ & $\mathbf{(0.002 \angle -180.00)}$ & $\mathbf{(0.006 \angle 0.00)}$ & $\mathbf{(0.000 \angle -163.48)}$ & $\mathbf{(0.000 \angle 163.48)}$ & $\mathbf{(0.000 \angle 180.00)}$ & $\Delta e_d\prime_{G_1}$ \\
$\mathbf{(0.000 \angle 180.00)}$ & $\mathbf{(0.235 \angle 7.79)}$ & $\mathbf{(0.235 \angle -7.79)}$ & $\mathbf{(0.002 \angle 0.00)}$ & $\mathbf{(0.310 \angle -0.00)}$ & $\mathbf{(0.237 \angle 0.00)}$ & $\mathbf{(0.000 \angle 0.00)}$ & $\mathbf{(0.002 \angle -180.00)}$ & $\mathbf{(0.008 \angle -133.27)}$ & $\mathbf{(0.008 \angle 133.27)}$ & $\mathbf{(0.000 \angle 128.40)}$ & $\mathbf{(0.000 \angle -128.40)}$ & $\mathbf{(0.001 \angle -139.64)}$ & $\mathbf{(0.001 \angle 139.64)}$ & $\mathbf{(0.000 \angle 0.00)}$ & $\mathbf{(0.000 \angle 0.00)}$ & $\mathbf{(0.000 \angle -0.00)}$ & $\mathbf{(0.000 \angle 0.00)}$ & $\mathbf{(0.000 \angle -180.00)}$ & $\mathbf{(0.001 \angle 180.00)}$ & $\mathbf{(0.000 \angle -180.00)}$ & $\mathbf{(0.000 \angle 49.90)}$ & $\mathbf{(0.000 \angle -49.90)}$ & $\mathbf{(0.000 \angle 0.00)}$ & $\Delta e_q\prime\prime_{G_1}$ \\
$\mathbf{(0.001 \angle -0.00)}$ & $\mathbf{(0.261 \angle 1.34)}$ & $\mathbf{(0.261 \angle -1.34)}$ & $\mathbf{(0.001 \angle 180.00)}$ & $\mathbf{(0.008 \angle 0.00)}$ & $\mathbf{(0.017 \angle -180.00)}$ & $\mathbf{(0.199 \angle -0.00)}$ & $\mathbf{(0.403 \angle -0.00)}$ & $\mathbf{(0.011 \angle -95.13)}$ & $\mathbf{(0.011 \angle 95.13)}$ & $\mathbf{(0.000 \angle -131.85)}$ & $\mathbf{(0.000 \angle 131.85)}$ & $\mathbf{(0.000 \angle -149.53)}$ & $\mathbf{(0.000 \angle 149.53)}$ & $\mathbf{(0.081 \angle 180.00)}$ & $\mathbf{(0.000 \angle 180.00)}$ & $\mathbf{(0.016 \angle -180.00)}$ & $\mathbf{(0.015 \angle 180.00)}$ & $\mathbf{(0.000 \angle 180.00)}$ & $\mathbf{(0.000 \angle -180.00)}$ & $\mathbf{(0.001 \angle 0.00)}$ & $\mathbf{(0.000 \angle -163.40)}$ & $\mathbf{(0.000 \angle 163.40)}$ & $\mathbf{(0.000 \angle 180.00)}$ & $\Delta e_d\prime\prime_{G_1}$ \\
$\mathbf{(0.000 \angle 180.00)}$ & $\mathbf{(0.005 \angle 141.68)}$ & $\mathbf{(0.005 \angle -141.68)}$ & $\mathbf{(0.000 \angle -180.00)}$ & $\mathbf{(0.001 \angle -180.00)}$ & $\mathbf{(0.000 \angle 180.00)}$ & $\mathbf{(0.000 \angle 180.00)}$ & $\mathbf{(0.000 \angle 0.00)}$ & $\mathbf{(0.301 \angle -2.36)}$ & $\mathbf{(0.301 \angle 2.36)}$ & $\mathbf{(0.001 \angle 102.96)}$ & $\mathbf{(0.001 \angle -102.96)}$ & $\mathbf{(0.037 \angle 35.51)}$ & $\mathbf{(0.037 \angle -35.51)}$ & $\mathbf{(0.015 \angle -180.00)}$ & $\mathbf{(0.000 \angle -180.00)}$ & $\mathbf{(0.007 \angle 180.00)}$ & $\mathbf{(0.004 \angle 180.00)}$ & $\mathbf{(0.167 \angle -180.00)}$ & $\mathbf{(0.535 \angle -0.00)}$ & $\mathbf{(0.325 \angle 180.00)}$ & $\mathbf{(3.970 \angle -61.25)}$ & $\mathbf{(3.970 \angle 61.25)}$ & $\mathbf{(3.489 \angle 180.00)}$ & $\Delta\delta_{G_2}$ \\
$\mathbf{(0.000 \angle 180.00)}$ & $\mathbf{(0.005 \angle 141.68)}$ & $\mathbf{(0.005 \angle -141.68)}$ & $\mathbf{(0.000 \angle 180.00)}$ & $\mathbf{(0.001 \angle 180.00)}$ & $\mathbf{(0.000 \angle -180.00)}$ & $\mathbf{(0.000 \angle 180.00)}$ & $\mathbf{(0.000 \angle 0.00)}$ & $\mathbf{(0.301 \angle -2.36)}$ & $\mathbf{(0.301 \angle 2.36)}$ & $\mathbf{(0.001 \angle 102.96)}$ & $\mathbf{(0.001 \angle -102.96)}$ & $\mathbf{(0.037 \angle 35.51)}$ & $\mathbf{(0.037 \angle -35.51)}$ & $\mathbf{(0.015 \angle 180.00)}$ & $\mathbf{(0.000 \angle 180.00)}$ & $\mathbf{(0.007 \angle -180.00)}$ & $\mathbf{(0.004 \angle -180.00)}$ & $\mathbf{(0.167 \angle 180.00)}$ & $\mathbf{(0.535 \angle -0.00)}$ & $\mathbf{(0.325 \angle -180.00)}$ & $\mathbf{(3.970 \angle -61.25)}$ & $\mathbf{(3.970 \angle 61.25)}$ & $\mathbf{(3.489 \angle -180.00)}$ & $\Delta\omega_{G_2}$ \\
$\mathbf{(0.000 \angle 180.00)}$ & $\mathbf{(0.004 \angle 175.57)}$ & $\mathbf{(0.004 \angle -175.57)}$ & $\mathbf{(0.000 \angle 180.00)}$ & $\mathbf{(0.001 \angle -180.00)}$ & $\mathbf{(0.000 \angle -0.00)}$ & $\mathbf{(0.000 \angle 0.00)}$ & $\mathbf{(0.001 \angle 180.00)}$ & $\mathbf{(0.014 \angle 67.49)}$ & $\mathbf{(0.014 \angle -67.49)}$ & $\mathbf{(0.000 \angle 124.93)}$ & $\mathbf{(0.000 \angle -124.93)}$ & $\mathbf{(0.008 \angle 97.76)}$ & $\mathbf{(0.008 \angle -97.76)}$ & $\mathbf{(0.003 \angle 0.00)}$ & $\mathbf{(0.000 \angle 180.00)}$ & $\mathbf{(0.001 \angle 0.00)}$ & $\mathbf{(0.014 \angle 180.00)}$ & $\mathbf{(0.450 \angle -0.00)}$ & $\mathbf{(0.073 \angle 180.00)}$ & $\mathbf{(0.409 \angle 0.00)}$ & $\mathbf{(0.093 \angle 42.73)}$ & $\mathbf{(0.093 \angle -42.73)}$ & $\mathbf{(0.087 \angle 0.00)}$ & $\Delta e_q\prime_{G_2}$ \\
$\mathbf{(0.001 \angle -180.00)}$ & $\mathbf{(0.043 \angle 168.55)}$ & $\mathbf{(0.043 \angle -168.55)}$ & $\mathbf{(0.000 \angle 0.00)}$ & $\mathbf{(0.002 \angle 180.00)}$ & $\mathbf{(0.001 \angle -180.00)}$ & $\mathbf{(0.011 \angle -180.00)}$ & $\mathbf{(0.016 \angle 180.00)}$ & $\mathbf{(0.037 \angle 157.51)}$ & $\mathbf{(0.037 \angle -157.51)}$ & $\mathbf{(0.000 \angle -55.47)}$ & $\mathbf{(0.000 \angle 55.47)}$ & $\mathbf{(0.005 \angle 176.43)}$ & $\mathbf{(0.005 \angle -176.43)}$ & $\mathbf{(0.660 \angle -0.00)}$ & $\mathbf{(0.001 \angle -0.00)}$ & $\mathbf{(0.135 \angle -0.00)}$ & $\mathbf{(0.399 \angle 0.00)}$ & $\mathbf{(0.010 \angle 180.00)}$ & $\mathbf{(0.007 \angle -0.00)}$ & $\mathbf{(0.000 \angle 180.00)}$ & $\mathbf{(0.000 \angle -155.09)}$ & $\mathbf{(0.000 \angle 155.09)}$ & $\mathbf{(0.000 \angle 180.00)}$ & $\Delta e_d\prime_{G_2}$ \\
$\mathbf{(0.000 \angle 0.00)}$ & $\mathbf{(0.283 \angle 0.24)}$ & $\mathbf{(0.283 \angle -0.24)}$ & $\mathbf{(0.009 \angle 0.00)}$ & $\mathbf{(0.218 \angle -0.00)}$ & $\mathbf{(0.227 \angle 0.00)}$ & $\mathbf{(0.004 \angle 0.00)}$ & $\mathbf{(0.009 \angle 180.00)}$ & $\mathbf{(0.008 \angle -139.29)}$ & $\mathbf{(0.008 \angle 139.29)}$ & $\mathbf{(0.000 \angle -80.38)}$ & $\mathbf{(0.000 \angle 80.38)}$ & $\mathbf{(0.002 \angle -131.09)}$ & $\mathbf{(0.002 \angle 131.09)}$ & $\mathbf{(0.001 \angle -0.00)}$ & $\mathbf{(0.000 \angle -180.00)}$ & $\mathbf{(0.000 \angle -0.00)}$ & $\mathbf{(0.000 \angle 0.00)}$ & $\mathbf{(0.002 \angle -180.00)}$ & $\mathbf{(0.000 \angle 0.00)}$ & $\mathbf{(0.001 \angle 180.00)}$ & $\mathbf{(0.000 \angle 44.27)}$ & $\mathbf{(0.000 \angle -44.27)}$ & $\mathbf{(0.000 \angle 0.00)}$ & $\Delta e_q\prime\prime_{G_2}$ \\
$\mathbf{(0.006 \angle -0.00)}$ & $\mathbf{(0.323 \angle -11.74)}$ & $\mathbf{(0.323 \angle 11.74)}$ & $\mathbf{(0.003 \angle -180.00)}$ & $\mathbf{(0.013 \angle 0.00)}$ & $\mathbf{(0.010 \angle -0.00)}$ & $\mathbf{(0.120 \angle -0.00)}$ & $\mathbf{(0.353 \angle -0.00)}$ & $\mathbf{(0.023 \angle -105.35)}$ & $\mathbf{(0.023 \angle 105.35)}$ & $\mathbf{(0.000 \angle 44.41)}$ & $\mathbf{(0.000 \angle -44.41)}$ & $\mathbf{(0.002 \angle -114.28)}$ & $\mathbf{(0.002 \angle 114.28)}$ & $\mathbf{(0.090 \angle -180.00)}$ & $\mathbf{(0.000 \angle -180.00)}$ & $\mathbf{(0.013 \angle -180.00)}$ & $\mathbf{(0.015 \angle 180.00)}$ & $\mathbf{(0.001 \angle 180.00)}$ & $\mathbf{(0.001 \angle -0.00)}$ & $\mathbf{(0.000 \angle 180.00)}$ & $\mathbf{(0.000 \angle -155.01)}$ & $\mathbf{(0.000 \angle 155.01)}$ & $\mathbf{(0.000 \angle 180.00)}$ & $\Delta e_d\prime\prime_{G_2}$ \\
$\mathbf{(0.006 \angle 180.00)}$ & $\mathbf{(0.000 \angle -140.05)}$ & $\mathbf{(0.000 \angle 140.05)}$ & $\mathbf{(0.004 \angle 180.00)}$ & $\mathbf{(0.000 \angle -180.00)}$ & $\mathbf{(0.000 \angle -0.00)}$ & $\mathbf{(0.000 \angle -0.00)}$ & $\mathbf{(0.000 \angle -0.00)}$ & $\mathbf{(0.001 \angle 19.45)}$ & $\mathbf{(0.001 \angle -19.45)}$ & $\mathbf{(0.234 \angle 2.62)}$ & $\mathbf{(0.234 \angle -2.62)}$ & $\mathbf{(0.225 \angle -9.84)}$ & $\mathbf{(0.225 \angle 9.84)}$ & $\mathbf{(0.000 \angle 0.00)}$ & $\mathbf{(0.020 \angle -180.00)}$ & $\mathbf{(0.007 \angle -0.00)}$ & $\mathbf{(0.032 \angle -0.00)}$ & $\mathbf{(0.211 \angle 0.00)}$ & $\mathbf{(0.214 \angle 180.00)}$ & $\mathbf{(0.141 \angle -180.00)}$ & $\mathbf{(5.450 \angle 115.19)}$ & $\mathbf{(5.450 \angle -115.19)}$ & $\mathbf{(4.861 \angle -0.00)}$ & $\Delta\delta_{G_3}'$ \\
$\mathbf{(0.006 \angle 180.00)}$ & $\mathbf{(0.000 \angle -140.05)}$ & $\mathbf{(0.000 \angle 140.05)}$ & $\mathbf{(0.004 \angle -180.00)}$ & $\mathbf{(0.000 \angle 180.00)}$ & $\mathbf{(0.000 \angle 0.00)}$ & $\mathbf{(0.000 \angle -0.00)}$ & $\mathbf{(0.000 \angle 0.00)}$ & $\mathbf{(0.001 \angle 19.45)}$ & $\mathbf{(0.001 \angle -19.45)}$ & $\mathbf{(0.234 \angle 2.62)}$ & $\mathbf{(0.234 \angle -2.62)}$ & $\mathbf{(0.225 \angle -9.84)}$ & $\mathbf{(0.225 \angle 9.84)}$ & $\mathbf{(0.000 \angle 0.00)}$ & $\mathbf{(0.020 \angle 180.00)}$ & $\mathbf{(0.007 \angle 0.00)}$ & $\mathbf{(0.032 \angle 0.00)}$ & $\mathbf{(0.211 \angle -0.00)}$ & $\mathbf{(0.214 \angle 180.00)}$ & $\mathbf{(0.141 \angle -180.00)}$ & $\mathbf{(5.450 \angle 115.19)}$ & $\mathbf{(5.450 \angle -115.19)}$ & $\mathbf{(4.861 \angle 0.00)}$ & $\Delta\omega_{G_3}$ \\
$\mathbf{(0.001 \angle 0.00)}$ & $\mathbf{(0.000 \angle -128.67)}$ & $\mathbf{(0.000 \angle 128.67)}$ & $\mathbf{(0.008 \angle -180.00)}$ & $\mathbf{(0.001 \angle -180.00)}$ & $\mathbf{(0.000 \angle 0.00)}$ & $\mathbf{(0.000 \angle 180.00)}$ & $\mathbf{(0.001 \angle -180.00)}$ & $\mathbf{(0.000 \angle 91.41)}$ & $\mathbf{(0.000 \angle -91.41)}$ & $\mathbf{(0.015 \angle 72.44)}$ & $\mathbf{(0.015 \angle -72.44)}$ & $\mathbf{(0.010 \angle 72.66)}$ & $\mathbf{(0.010 \angle -72.66)}$ & $\mathbf{(0.000 \angle 0.00)}$ & $\mathbf{(0.002 \angle -0.00)}$ & $\mathbf{(0.001 \angle -180.00)}$ & $\mathbf{(0.005 \angle -180.00)}$ & $\mathbf{(0.059 \angle 0.00)}$ & $\mathbf{(0.293 \angle -0.00)}$ & $\mathbf{(0.296 \angle 0.00)}$ & $\mathbf{(0.253 \angle 25.79)}$ & $\mathbf{(0.253 \angle -25.79)}$ & $\mathbf{(0.107 \angle -180.00)}$ & $\Delta e_q\prime_{G_3}$ \\
$\mathbf{(0.078 \angle 180.00)}$ & $\mathbf{(0.000 \angle -156.51)}$ & $\mathbf{(0.000 \angle 156.51)}$ & $\mathbf{(0.010 \angle -0.00)}$ & $\mathbf{(0.002 \angle -0.00)}$ & $\mathbf{(0.003 \angle 0.00)}$ & $\mathbf{(0.041 \angle -180.00)}$ & $\mathbf{(0.008 \angle 180.00)}$ & $\mathbf{(0.000 \angle -172.59)}$ & $\mathbf{(0.000 \angle 172.59)}$ & $\mathbf{(0.016 \angle 169.81)}$ & $\mathbf{(0.016 \angle -169.81)}$ & $\mathbf{(0.010 \angle -8.72)}$ & $\mathbf{(0.010 \angle 8.72)}$ & $\mathbf{(0.002 \angle -0.00)}$ & $\mathbf{(0.595 \angle 0.00)}$ & $\mathbf{(0.395 \angle -0.00)}$ & $\mathbf{(0.134 \angle -0.00)}$ & $\mathbf{(0.002 \angle 180.00)}$ & $\mathbf{(0.001 \angle -0.00)}$ & $\mathbf{(0.002 \angle 0.00)}$ & $\mathbf{(0.000 \angle 16.18)}$ & $\mathbf{(0.000 \angle -16.18)}$ & $\mathbf{(0.000 \angle -0.00)}$ & $\Delta e_d\prime_{G_3}$ \\
$\mathbf{(0.036 \angle 180.00)}$ & $\mathbf{(0.009 \angle 56.00)}$ & $\mathbf{(0.009 \angle -56.00)}$ & $\mathbf{(0.508 \angle -0.00)}$ & $\mathbf{(0.260 \angle -0.00)}$ & $\mathbf{(0.284 \angle -0.00)}$ & $\mathbf{(0.005 \angle -180.00)}$ & $\mathbf{(0.006 \angle 180.00)}$ & $\mathbf{(0.000 \angle -115.38)}$ & $\mathbf{(0.000 \angle 115.38)}$ & $\mathbf{(0.010 \angle -132.87)}$ & $\mathbf{(0.010 \angle 132.87)}$ & $\mathbf{(0.002 \angle -156.20)}$ & $\mathbf{(0.002 \angle 156.20)}$ & $\mathbf{(0.000 \angle -0.00)}$ & $\mathbf{(0.000 \angle -0.00)}$ & $\mathbf{(0.000 \angle 180.00)}$ & $\mathbf{(0.000 \angle -0.00)}$ & $\mathbf{(0.000 \angle 180.00)}$ & $\mathbf{(0.001 \angle -180.00)}$ & $\mathbf{(0.001 \angle 180.00)}$ & $\mathbf{(0.001 \angle 27.34)}$ & $\mathbf{(0.001 \angle -27.34)}$ & $\mathbf{(0.000 \angle -180.00)}$ & $\Delta e_q\prime\prime_{G_3}$ \\
$\mathbf{(0.603 \angle 0.00)}$ & $\mathbf{(0.003 \angle 23.20)}$ & $\mathbf{(0.003 \angle -23.20)}$ & $\mathbf{(0.073 \angle -180.00)}$ & $\mathbf{(0.011 \angle 180.00)}$ & $\mathbf{(0.021 \angle 180.00)}$ & $\mathbf{(0.445 \angle -0.00)}$ & $\mathbf{(0.173 \angle 0.00)}$ & $\mathbf{(0.000 \angle -75.45)}$ & $\mathbf{(0.000 \angle 75.45)}$ & $\mathbf{(0.011 \angle -90.32)}$ & $\mathbf{(0.011 \angle 90.32)}$ & $\mathbf{(0.003 \angle 60.57)}$ & $\mathbf{(0.003 \angle -60.57)}$ & $\mathbf{(0.000 \angle -180.00)}$ & $\mathbf{(0.081 \angle 180.00)}$ & $\mathbf{(0.037 \angle -180.00)}$ & $\mathbf{(0.005 \angle -180.00)}$ & $\mathbf{(0.000 \angle 180.00)}$ & $\mathbf{(0.000 \angle -0.00)}$ & $\mathbf{(0.000 \angle 0.00)}$ & $\mathbf{(0.000 \angle 16.26)}$ & $\mathbf{(0.000 \angle -16.26)}$ & $\mathbf{(0.000 \angle -0.00)}$ & $\Delta e_d\prime\prime_{G_3}$ \\
$\mathbf{(0.004 \angle 180.00)}$ & $\mathbf{(0.000 \angle -153.51)}$ & $\mathbf{(0.000 \angle 153.51)}$ & $\mathbf{(0.006 \angle 180.00)}$ & $\mathbf{(0.000 \angle -180.00)}$ & $\mathbf{(0.000 \angle -180.00)}$ & $\mathbf{(0.000 \angle -0.00)}$ & $\mathbf{(0.001 \angle 0.00)}$ & $\mathbf{(0.000 \angle -36.89)}$ & $\mathbf{(0.000 \angle 36.89)}$ & $\mathbf{(0.297 \angle -1.84)}$ & $\mathbf{(0.297 \angle 1.84)}$ & $\mathbf{(0.175 \angle -8.52)}$ & $\mathbf{(0.175 \angle 8.52)}$ & $\mathbf{(0.000 \angle 0.00)}$ & $\mathbf{(0.017 \angle 180.00)}$ & $\mathbf{(0.016 \angle -0.00)}$ & $\mathbf{(0.063 \angle -0.00)}$ & $\mathbf{(0.399 \angle 180.00)}$ & $\mathbf{(0.191 \angle 0.00)}$ & $\mathbf{(0.193 \angle -0.00)}$ & $\mathbf{(3.691 \angle 116.16)}$ & $\mathbf{(3.691 \angle -116.16)}$ & $\mathbf{(3.279 \angle -0.00)}$ & $\Delta\delta_{G_4}$ \\
$\mathbf{(0.004 \angle -180.00)}$ & $\mathbf{(0.000 \angle -153.51)}$ & $\mathbf{(0.000 \angle 153.51)}$ & $\mathbf{(0.006 \angle -180.00)}$ & $\mathbf{(0.000 \angle 180.00)}$ & $\mathbf{(0.000 \angle 180.00)}$ & $\mathbf{(0.000 \angle -0.00)}$ & $\mathbf{(0.001 \angle 0.00)}$ & $\mathbf{(0.000 \angle -36.89)}$ & $\mathbf{(0.000 \angle 36.89)}$ & $\mathbf{(0.297 \angle -1.84)}$ & $\mathbf{(0.297 \angle 1.84)}$ & $\mathbf{(0.175 \angle -8.52)}$ & $\mathbf{(0.175 \angle 8.52)}$ & $\mathbf{(0.000 \angle 0.00)}$ & $\mathbf{(0.017 \angle -180.00)}$ & $\mathbf{(0.016 \angle 0.00)}$ & $\mathbf{(0.063 \angle 0.00)}$ & $\mathbf{(0.399 \angle -180.00)}$ & $\mathbf{(0.191 \angle 0.00)}$ & $\mathbf{(0.193 \angle -0.00)}$ & $\mathbf{(3.691 \angle 116.16)}$ & $\mathbf{(3.691 \angle -116.16)}$ & $\mathbf{(3.279 \angle 0.00)}$ & $\Delta\omega_{G_4}$ \\
$\mathbf{(0.001 \angle -0.00)}$ & $\mathbf{(0.000 \angle 176.56)}$ & $\mathbf{(0.000 \angle -176.56)}$ & $\mathbf{(0.009 \angle 180.00)}$ & $\mathbf{(0.001 \angle -180.00)}$ & $\mathbf{(0.000 \angle 0.00)}$ & $\mathbf{(0.001 \angle 180.00)}$ & $\mathbf{(0.001 \angle 180.00)}$ & $\mathbf{(0.000 \angle -21.31)}$ & $\mathbf{(0.000 \angle 21.31)}$ & $\mathbf{(0.014 \angle 66.76)}$ & $\mathbf{(0.014 \angle -66.76)}$ & $\mathbf{(0.009 \angle 73.15)}$ & $\mathbf{(0.009 \angle -73.15)}$ & $\mathbf{(0.000 \angle -180.00)}$ & $\mathbf{(0.004 \angle 0.00)}$ & $\mathbf{(0.002 \angle -180.00)}$ & $\mathbf{(0.006 \angle -180.00)}$ & $\mathbf{(0.465 \angle 0.00)}$ & $\mathbf{(0.092 \angle 0.00)}$ & $\mathbf{(0.260 \angle -0.00)}$ & $\mathbf{(0.143 \angle 25.30)}$ & $\mathbf{(0.143 \angle -25.30)}$ & $\mathbf{(0.078 \angle -180.00)}$ & $\Delta e_q\prime_{G_4}$ \\
$\mathbf{(0.086 \angle -180.00)}$ & $\mathbf{(0.000 \angle -110.32)}$ & $\mathbf{(0.000 \angle 110.32)}$ & $\mathbf{(0.004 \angle 0.00)}$ & $\mathbf{(0.001 \angle 180.00)}$ & $\mathbf{(0.000 \angle 180.00)}$ & $\mathbf{(0.033 \angle -180.00)}$ & $\mathbf{(0.007 \angle 180.00)}$ & $\mathbf{(0.000 \angle -76.09)}$ & $\mathbf{(0.000 \angle 76.09)}$ & $\mathbf{(0.038 \angle 153.11)}$ & $\mathbf{(0.038 \angle -153.11)}$ & $\mathbf{(0.014 \angle -3.66)}$ & $\mathbf{(0.014 \angle 3.66)}$ & $\mathbf{(0.000 \angle -0.00)}$ & $\mathbf{(0.640 \angle -0.00)}$ & $\mathbf{(0.372 \angle -0.00)}$ & $\mathbf{(0.152 \angle -0.00)}$ & $\mathbf{(0.012 \angle 180.00)}$ & $\mathbf{(0.004 \angle 0.00)}$ & $\mathbf{(0.006 \angle -0.00)}$ & $\mathbf{(0.000 \angle 17.67)}$ & $\mathbf{(0.000 \angle -17.67)}$ & $\mathbf{(0.000 \angle -0.00)}$ & $\Delta e_d\prime_{G_4}$ \\
$\mathbf{(0.053 \angle -180.00)}$ & $\mathbf{(0.001 \angle 1.23)}$ & $\mathbf{(0.001 \angle -1.23)}$ & $\mathbf{(0.610 \angle 0.00)}$ & $\mathbf{(0.203 \angle -0.00)}$ & $\mathbf{(0.275 \angle 0.00)}$ & $\mathbf{(0.011 \angle -180.00)}$ & $\mathbf{(0.008 \angle 180.00)}$ & $\mathbf{(0.000 \angle 131.90)}$ & $\mathbf{(0.000 \angle -131.90)}$ & $\mathbf{(0.010 \angle -138.55)}$ & $\mathbf{(0.010 \angle 138.55)}$ & $\mathbf{(0.002 \angle -155.70)}$ & $\mathbf{(0.002 \angle 155.70)}$ & $\mathbf{(0.000 \angle -180.00)}$ & $\mathbf{(0.001 \angle 0.00)}$ & $\mathbf{(0.000 \angle 180.00)}$ & $\mathbf{(0.000 \angle -0.00)}$ & $\mathbf{(0.002 \angle 180.00)}$ & $\mathbf{(0.000 \angle 180.00)}$ & $\mathbf{(0.001 \angle -180.00)}$ & $\mathbf{(0.001 \angle 26.84)}$ & $\mathbf{(0.001 \angle -26.84)}$ & $\mathbf{(0.000 \angle -180.00)}$ & $\Delta e_q\prime\prime_{G_4}$ \\
$\mathbf{(0.661 \angle -0.00)}$ & $\mathbf{(0.000 \angle 69.39)}$ & $\mathbf{(0.000 \angle -69.39)}$ & $\mathbf{(0.028 \angle 180.00)}$ & $\mathbf{(0.006 \angle 0.00)}$ & $\mathbf{(0.001 \angle 0.00)}$ & $\mathbf{(0.352 \angle -0.00)}$ & $\mathbf{(0.149 \angle 0.00)}$ & $\mathbf{(0.000 \angle 21.05)}$ & $\mathbf{(0.000 \angle -21.05)}$ & $\mathbf{(0.027 \angle -107.02)}$ & $\mathbf{(0.027 \angle 107.02)}$ & $\mathbf{(0.004 \angle 65.63)}$ & $\mathbf{(0.004 \angle -65.63)}$ & $\mathbf{(0.000 \angle -180.00)}$ & $\mathbf{(0.087 \angle -180.00)}$ & $\mathbf{(0.035 \angle -180.00)}$ & $\mathbf{(0.006 \angle -180.00)}$ & $\mathbf{(0.002 \angle 180.00)}$ & $\mathbf{(0.001 \angle 0.00)}$ & $\mathbf{(0.001 \angle -0.00)}$ & $\mathbf{(0.000 \angle 17.75)}$ & $\mathbf{(0.000 \angle -17.75)}$ & $\mathbf{(0.000 \angle -0.00)}$ & $\Delta e_d\prime\prime_{G_4}$ \\
\hline
$\qquad\lambda_{0}$ &$\qquad\lambda_{1}$ &$\qquad\lambda_{2}$ &$\qquad\lambda_{3}$ &$\qquad\lambda_{4}$ &$\qquad\lambda_{5}$ &$\qquad\lambda_{6}$ &$\qquad\lambda_{7}$ &$\qquad\lambda_{8}$ &$\qquad\lambda_{9}$ &$\qquad\lambda_{10}$ &$\qquad\lambda_{11}$ &$\qquad\lambda_{12}$ &$\qquad\lambda_{13}$ &$\qquad\lambda_{14}$ &$\qquad\lambda_{15}$ &$\qquad\lambda_{16}$ &$\qquad\lambda_{17}$ &$\qquad\lambda_{18}$ &$\qquad\lambda_{19}$ &$\qquad\lambda_{20}$ &$\qquad\lambda_{21}$ &$\qquad\lambda_{22}$ &$\qquad\lambda_{23}$ & \\
\end{tabular}
\label{tab:my_label}
\end{table}
\end{document}
Antwort1
Hier ist eine Lösung, die die „große Matrix“ in 4 Teile aufteilt. Jeder Teil zeigt 6 Spalten aus der gesamten Matrix zusammen mit den Variablennamen aus Spalte 25 der „großen Matrix“. Tabelle 1 enthält die Teile 1 und 2, während Tabelle 2 die Teile 3 und 4 enthält.
Beachten Sie, dass ich alle Wrapper weggelassen habe \mathbf, da, wie @barbarabeeton bereits in einem Kommentar angemerkt hat, bold-matheine Mengemehr Platz als die nicht fettgedruckte Version. Und indem man eine arrayanstelle einer tabularUmgebung verwendet, kann man 1.248 [!] innere Token loswerden $. (Warum 1.248 Zellen? Eine 25x25-Matrix enthält 625 Zellen. Die untere rechte Zelle der vorliegenden „großen Matrix“ ist jedoch leer. Daher gibt es „nur“ 624 nicht leere Zellen. 2*624=1.248 Token $.)
\documentclass{article}
\usepackage[a4paper,margin=2.5cm]{geometry}
\usepackage{booktabs,array}
% Custom column type that hides its contents:
% (see https://tex.stackexchange.com/a/16607/5001)
\newcolumntype{H}{>{\setbox0=\hbox\bgroup$}c<{$\egroup}@{}}
\newcommand\mc[1]{\multicolumn{1}{c}{#1}} % handy shortcut macro
%%First 24 rows of "big matrix":
\newcommand\blob{%
(0.000 \angle {-}180.00) & (0.005 \angle 156.59) & (0.005 \angle {-}156.59) & (0.000 \angle 0.00) & (0.000 \angle {-}0.00) & (0.000 \angle 0.00) & (0.000 \angle 180.00) & (0.001 \angle 180.00) & (0.229 \angle 3.19) & (0.229 \angle {-}3.19) & (0.000 \angle {-}11.91) & (0.000 \angle 11.91) & (0.071 \angle 21.78) & (0.071 \angle {-}21.78) & (0.027 \angle {-}180.00) & (0.000 \angle 0.00) & (0.002 \angle 180.00) & (0.087 \angle 180.00) & (0.355 \angle {-}0.00) & (0.513 \angle {-}180.00) & (0.272 \angle 0.00) & (5.376 \angle {-}68.74) & (5.376 \angle 68.74) & (3.475 \angle 180.00) & \Delta\delta_{G_1} \\
(0.000 \angle 180.00) & (0.005 \angle 156.59) & (0.005 \angle {-}156.59) & (0.000 \angle {-}0.00) & (0.000 \angle 0.00) & (0.000 \angle {-}0.00) & (0.000 \angle 180.00) & (0.001 \angle {-}180.00) & (0.229 \angle 3.20) & (0.229 \angle {-}3.20) & (0.000 \angle {-}11.91) & (0.000 \angle 11.91) & (0.071 \angle 21.79) & (0.071 \angle {-}21.79) & (0.027 \angle {-}180.00) & (0.000 \angle {-}0.00) & (0.002 \angle {-}180.00) & (0.087 \angle {-}180.00) & (0.356 \angle 0.00) & (0.514 \angle {-}180.00) & (0.272 \angle {-}0.00) & (5.499 \angle {-}61.43) & (5.499 \angle 61.43) & (4.836 \angle {-}180.00) & \Delta\omega_{G_1} \\
(0.000 \angle 0.00) & (0.003 \angle {-}176.88) & (0.003 \angle 176.88) & (0.000 \angle {-}180.00) & (0.001 \angle {-}180.00) & (0.000 \angle {-}0.00) & (0.000 \angle {-}0.00) & (0.000 \angle 180.00) & (0.013 \angle 73.52) & (0.013 \angle {-}73.52) & (0.000 \angle {-}26.29) & (0.000 \angle 26.29) & (0.007 \angle 89.22) & (0.007 \angle {-}89.22) & (0.002 \angle 0.00) & (0.000 \angle 0.00) & (0.000 \angle 0.00) & (0.009 \angle 180.00) & (0.060 \angle {-}0.00) & (0.682 \angle 0.00) & (0.023 \angle {-}0.00) & (0.101 \angle 48.36) & (0.101 \angle {-}48.36) & (0.108 \angle 0.00) & \Delta {e_{q'}}_{G_1} \\
(0.000 \angle 180.00) & (0.035 \angle {-}178.36) & (0.035 \angle 178.36) & (0.000 \angle {-}0.00) & (0.001 \angle 180.00) & (0.002 \angle {-}0.00) & (0.018 \angle {-}180.00) & (0.019 \angle {-}180.00) & (0.018 \angle 167.73) & (0.018 \angle {-}167.73) & (0.000 \angle 128.27) & (0.000 \angle {-}128.27) & (0.001 \angle 141.18) & (0.001 \angle {-}141.18) & (0.588 \angle 0.00) & (0.000 \angle 0.00) & (0.171 \angle {-}0.00) & (0.381 \angle 0.00) & (0.002 \angle 180.00) & (0.002 \angle {-}180.00) & (0.006 \angle 0.00) & (0.000 \angle {-}163.48) & (0.000 \angle 163.48) & (0.000 \angle 180.00) & \Delta {e_{d'}}_{G_1} \\
(0.000 \angle 180.00) & (0.235 \angle 7.79) & (0.235 \angle {-}7.79) & (0.002 \angle 0.00) & (0.310 \angle {-}0.00) & (0.237 \angle 0.00) & (0.000 \angle 0.00) & (0.002 \angle {-}180.00) & (0.008 \angle {-}133.27) & (0.008 \angle 133.27) & (0.000 \angle 128.40) & (0.000 \angle {-}128.40) & (0.001 \angle {-}139.64) & (0.001 \angle 139.64) & (0.000 \angle 0.00) & (0.000 \angle 0.00) & (0.000 \angle {-}0.00) & (0.000 \angle 0.00) & (0.000 \angle {-}180.00) & (0.001 \angle 180.00) & (0.000 \angle {-}180.00) & (0.000 \angle 49.90) & (0.000 \angle {-}49.90) & (0.000 \angle 0.00) & \Delta {e_{q''}}_{G_1} \\
(0.001 \angle {-}0.00) & (0.261 \angle 1.34) & (0.261 \angle {-}1.34) & (0.001 \angle 180.00) & (0.008 \angle 0.00) & (0.017 \angle {-}180.00) & (0.199 \angle {-}0.00) & (0.403 \angle {-}0.00) & (0.011 \angle {-}95.13) & (0.011 \angle 95.13) & (0.000 \angle {-}131.85) & (0.000 \angle 131.85) & (0.000 \angle {-}149.53) & (0.000 \angle 149.53) & (0.081 \angle 180.00) & (0.000 \angle 180.00) & (0.016 \angle {-}180.00) & (0.015 \angle 180.00) & (0.000 \angle 180.00) & (0.000 \angle {-}180.00) & (0.001 \angle 0.00) & (0.000 \angle {-}163.40) & (0.000 \angle 163.40) & (0.000 \angle 180.00) & \Delta {e_{d''}}_{G_1} \\
(0.000 \angle 180.00) & (0.005 \angle 141.68) & (0.005 \angle {-}141.68) & (0.000 \angle {-}180.00) & (0.001 \angle {-}180.00) & (0.000 \angle 180.00) & (0.000 \angle 180.00) & (0.000 \angle 0.00) & (0.301 \angle {-}2.36) & (0.301 \angle 2.36) & (0.001 \angle 102.96) & (0.001 \angle {-}102.96) & (0.037 \angle 35.51) & (0.037 \angle {-}35.51) & (0.015 \angle {-}180.00) & (0.000 \angle {-}180.00) & (0.007 \angle 180.00) & (0.004 \angle 180.00) & (0.167 \angle {-}180.00) & (0.535 \angle {-}0.00) & (0.325 \angle 180.00) & (3.970 \angle {-}61.25) & (3.970 \angle 61.25) & (3.489 \angle 180.00) & \Delta\delta_{G_2} \\
(0.000 \angle 180.00) & (0.005 \angle 141.68) & (0.005 \angle {-}141.68) & (0.000 \angle 180.00) & (0.001 \angle 180.00) & (0.000 \angle {-}180.00) & (0.000 \angle 180.00) & (0.000 \angle 0.00) & (0.301 \angle {-}2.36) & (0.301 \angle 2.36) & (0.001 \angle 102.96) & (0.001 \angle {-}102.96) & (0.037 \angle 35.51) & (0.037 \angle {-}35.51) & (0.015 \angle 180.00) & (0.000 \angle 180.00) & (0.007 \angle {-}180.00) & (0.004 \angle {-}180.00) & (0.167 \angle 180.00) & (0.535 \angle {-}0.00) & (0.325 \angle {-}180.00) & (3.970 \angle {-}61.25) & (3.970 \angle 61.25) & (3.489 \angle {-}180.00) & \Delta\omega_{G_2} \\
(0.000 \angle 180.00) & (0.004 \angle 175.57) & (0.004 \angle {-}175.57) & (0.000 \angle 180.00) & (0.001 \angle {-}180.00) & (0.000 \angle {-}0.00) & (0.000 \angle 0.00) & (0.001 \angle 180.00) & (0.014 \angle 67.49) & (0.014 \angle {-}67.49) & (0.000 \angle 124.93) & (0.000 \angle {-}124.93) & (0.008 \angle 97.76) & (0.008 \angle {-}97.76) & (0.003 \angle 0.00) & (0.000 \angle 180.00) & (0.001 \angle 0.00) & (0.014 \angle 180.00) & (0.450 \angle {-}0.00) & (0.073 \angle 180.00) & (0.409 \angle 0.00) & (0.093 \angle 42.73) & (0.093 \angle {-}42.73) & (0.087 \angle 0.00) & \Delta {e_{q'}}_{G_2} \\
(0.001 \angle {-}180.00) & (0.043 \angle 168.55) & (0.043 \angle {-}168.55) & (0.000 \angle 0.00) & (0.002 \angle 180.00) & (0.001 \angle {-}180.00) & (0.011 \angle {-}180.00) & (0.016 \angle 180.00) & (0.037 \angle 157.51) & (0.037 \angle {-}157.51) & (0.000 \angle {-}55.47) & (0.000 \angle 55.47) & (0.005 \angle 176.43) & (0.005 \angle {-}176.43) & (0.660 \angle {-}0.00) & (0.001 \angle {-}0.00) & (0.135 \angle {-}0.00) & (0.399 \angle 0.00) & (0.010 \angle 180.00) & (0.007 \angle {-}0.00) & (0.000 \angle 180.00) & (0.000 \angle {-}155.09) & (0.000 \angle 155.09) & (0.000 \angle 180.00) & \Delta {e_{d'}}_{G_2} \\
(0.000 \angle 0.00) & (0.283 \angle 0.24) & (0.283 \angle {-}0.24) & (0.009 \angle 0.00) & (0.218 \angle {-}0.00) & (0.227 \angle 0.00) & (0.004 \angle 0.00) & (0.009 \angle 180.00) & (0.008 \angle {-}139.29) & (0.008 \angle 139.29) & (0.000 \angle {-}80.38) & (0.000 \angle 80.38) & (0.002 \angle {-}131.09) & (0.002 \angle 131.09) & (0.001 \angle {-}0.00) & (0.000 \angle {-}180.00) & (0.000 \angle {-}0.00) & (0.000 \angle 0.00) & (0.002 \angle {-}180.00) & (0.000 \angle 0.00) & (0.001 \angle 180.00) & (0.000 \angle 44.27) & (0.000 \angle {-}44.27) & (0.000 \angle 0.00) & \Delta {e_{q''}}_{G_2} \\
(0.006 \angle {-}0.00) & (0.323 \angle {-}11.74) & (0.323 \angle 11.74) & (0.003 \angle {-}180.00) & (0.013 \angle 0.00) & (0.010 \angle {-}0.00) & (0.120 \angle {-}0.00) & (0.353 \angle {-}0.00) & (0.023 \angle {-}105.35) & (0.023 \angle 105.35) & (0.000 \angle 44.41) & (0.000 \angle {-}44.41) & (0.002 \angle {-}114.28) & (0.002 \angle 114.28) & (0.090 \angle {-}180.00) & (0.000 \angle {-}180.00) & (0.013 \angle {-}180.00) & (0.015 \angle 180.00) & (0.001 \angle 180.00) & (0.001 \angle {-}0.00) & (0.000 \angle 180.00) & (0.000 \angle {-}155.01) & (0.000 \angle 155.01) & (0.000 \angle 180.00) & \Delta {e_{d''}}_{G_2} \\
(0.006 \angle 180.00) & (0.000 \angle {-}140.05) & (0.000 \angle 140.05) & (0.004 \angle 180.00) & (0.000 \angle {-}180.00) & (0.000 \angle {-}0.00) & (0.000 \angle {-}0.00) & (0.000 \angle {-}0.00) & (0.001 \angle 19.45) & (0.001 \angle {-}19.45) & (0.234 \angle 2.62) & (0.234 \angle {-}2.62) & (0.225 \angle {-}9.84) & (0.225 \angle 9.84) & (0.000 \angle 0.00) & (0.020 \angle {-}180.00) & (0.007 \angle {-}0.00) & (0.032 \angle {-}0.00) & (0.211 \angle 0.00) & (0.214 \angle 180.00) & (0.141 \angle {-}180.00) & (5.450 \angle 115.19) & (5.450 \angle {-}115.19) & (4.861 \angle {-}0.00) & \Delta\delta_{G_3}' \\
(0.006 \angle 180.00) & (0.000 \angle {-}140.05) & (0.000 \angle 140.05) & (0.004 \angle {-}180.00) & (0.000 \angle 180.00) & (0.000 \angle 0.00) & (0.000 \angle {-}0.00) & (0.000 \angle 0.00) & (0.001 \angle 19.45) & (0.001 \angle {-}19.45) & (0.234 \angle 2.62) & (0.234 \angle {-}2.62) & (0.225 \angle {-}9.84) & (0.225 \angle 9.84) & (0.000 \angle 0.00) & (0.020 \angle 180.00) & (0.007 \angle 0.00) & (0.032 \angle 0.00) & (0.211 \angle {-}0.00) & (0.214 \angle 180.00) & (0.141 \angle {-}180.00) & (5.450 \angle 115.19) & (5.450 \angle {-}115.19) & (4.861 \angle 0.00) & \Delta\omega_{G_3} \\
(0.001 \angle 0.00) & (0.000 \angle {-}128.67) & (0.000 \angle 128.67) & (0.008 \angle {-}180.00) & (0.001 \angle {-}180.00) & (0.000 \angle 0.00) & (0.000 \angle 180.00) & (0.001 \angle {-}180.00) & (0.000 \angle 91.41) & (0.000 \angle {-}91.41) & (0.015 \angle 72.44) & (0.015 \angle {-}72.44) & (0.010 \angle 72.66) & (0.010 \angle {-}72.66) & (0.000 \angle 0.00) & (0.002 \angle {-}0.00) & (0.001 \angle {-}180.00) & (0.005 \angle {-}180.00) & (0.059 \angle 0.00) & (0.293 \angle {-}0.00) & (0.296 \angle 0.00) & (0.253 \angle 25.79) & (0.253 \angle {-}25.79) & (0.107 \angle {-}180.00) & \Delta {e_{q'}}_{G_3} \\
(0.078 \angle 180.00) & (0.000 \angle {-}156.51) & (0.000 \angle 156.51) & (0.010 \angle {-}0.00) & (0.002 \angle {-}0.00) & (0.003 \angle 0.00) & (0.041 \angle {-}180.00) & (0.008 \angle 180.00) & (0.000 \angle {-}172.59) & (0.000 \angle 172.59) & (0.016 \angle 169.81) & (0.016 \angle {-}169.81) & (0.010 \angle {-}8.72) & (0.010 \angle 8.72) & (0.002 \angle {-}0.00) & (0.595 \angle 0.00) & (0.395 \angle {-}0.00) & (0.134 \angle {-}0.00) & (0.002 \angle 180.00) & (0.001 \angle {-}0.00) & (0.002 \angle 0.00) & (0.000 \angle 16.18) & (0.000 \angle {-}16.18) & (0.000 \angle {-}0.00) & \Delta {e_{d'}}_{G_3} \\
(0.036 \angle 180.00) & (0.009 \angle 56.00) & (0.009 \angle {-}56.00) & (0.508 \angle {-}0.00) & (0.260 \angle {-}0.00) & (0.284 \angle {-}0.00) & (0.005 \angle {-}180.00) & (0.006 \angle 180.00) & (0.000 \angle {-}115.38) & (0.000 \angle 115.38) & (0.010 \angle {-}132.87) & (0.010 \angle 132.87) & (0.002 \angle {-}156.20) & (0.002 \angle 156.20) & (0.000 \angle {-}0.00) & (0.000 \angle {-}0.00) & (0.000 \angle 180.00) & (0.000 \angle {-}0.00) & (0.000 \angle 180.00) & (0.001 \angle {-}180.00) & (0.001 \angle 180.00) & (0.001 \angle 27.34) & (0.001 \angle {-}27.34) & (0.000 \angle {-}180.00) & \Delta {e_{q''}}_{G_3} \\
(0.603 \angle 0.00) & (0.003 \angle 23.20) & (0.003 \angle {-}23.20) & (0.073 \angle {-}180.00) & (0.011 \angle 180.00) & (0.021 \angle 180.00) & (0.445 \angle {-}0.00) & (0.173 \angle 0.00) & (0.000 \angle {-}75.45) & (0.000 \angle 75.45) & (0.011 \angle {-}90.32) & (0.011 \angle 90.32) & (0.003 \angle 60.57) & (0.003 \angle {-}60.57) & (0.000 \angle {-}180.00) & (0.081 \angle 180.00) & (0.037 \angle {-}180.00) & (0.005 \angle {-}180.00) & (0.000 \angle 180.00) & (0.000 \angle {-}0.00) & (0.000 \angle 0.00) & (0.000 \angle 16.26) & (0.000 \angle {-}16.26) & (0.000 \angle {-}0.00) & \Delta {e_{d''}}_{G_3} \\
(0.004 \angle 180.00) & (0.000 \angle {-}153.51) & (0.000 \angle 153.51) & (0.006 \angle 180.00) & (0.000 \angle {-}180.00) & (0.000 \angle {-}180.00) & (0.000 \angle {-}0.00) & (0.001 \angle 0.00) & (0.000 \angle {-}36.89) & (0.000 \angle 36.89) & (0.297 \angle {-}1.84) & (0.297 \angle 1.84) & (0.175 \angle {-}8.52) & (0.175 \angle 8.52) & (0.000 \angle 0.00) & (0.017 \angle 180.00) & (0.016 \angle {-}0.00) & (0.063 \angle {-}0.00) & (0.399 \angle 180.00) & (0.191 \angle 0.00) & (0.193 \angle {-}0.00) & (3.691 \angle 116.16) & (3.691 \angle {-}116.16) & (3.279 \angle {-}0.00) & \Delta\delta_{G_4} \\
(0.004 \angle {-}180.00) & (0.000 \angle {-}153.51) & (0.000 \angle 153.51) & (0.006 \angle {-}180.00) & (0.000 \angle 180.00) & (0.000 \angle 180.00) & (0.000 \angle {-}0.00) & (0.001 \angle 0.00) & (0.000 \angle {-}36.89) & (0.000 \angle 36.89) & (0.297 \angle {-}1.84) & (0.297 \angle 1.84) & (0.175 \angle {-}8.52) & (0.175 \angle 8.52) & (0.000 \angle 0.00) & (0.017 \angle {-}180.00) & (0.016 \angle 0.00) & (0.063 \angle 0.00) & (0.399 \angle {-}180.00) & (0.191 \angle 0.00) & (0.193 \angle {-}0.00) & (3.691 \angle 116.16) & (3.691 \angle {-}116.16) & (3.279 \angle 0.00) & \Delta\omega_{G_4} \\
(0.001 \angle {-}0.00) & (0.000 \angle 176.56) & (0.000 \angle {-}176.56) & (0.009 \angle 180.00) & (0.001 \angle {-}180.00) & (0.000 \angle 0.00) & (0.001 \angle 180.00) & (0.001 \angle 180.00) & (0.000 \angle {-}21.31) & (0.000 \angle 21.31) & (0.014 \angle 66.76) & (0.014 \angle {-}66.76) & (0.009 \angle 73.15) & (0.009 \angle {-}73.15) & (0.000 \angle {-}180.00) & (0.004 \angle 0.00) & (0.002 \angle {-}180.00) & (0.006 \angle {-}180.00) & (0.465 \angle 0.00) & (0.092 \angle 0.00) & (0.260 \angle {-}0.00) & (0.143 \angle 25.30) & (0.143 \angle {-}25.30) & (0.078 \angle {-}180.00) & \Delta {e_{q'}}_{G_4} \\
(0.086 \angle {-}180.00) & (0.000 \angle {-}110.32) & (0.000 \angle 110.32) & (0.004 \angle 0.00) & (0.001 \angle 180.00) & (0.000 \angle 180.00) & (0.033 \angle {-}180.00) & (0.007 \angle 180.00) & (0.000 \angle {-}76.09) & (0.000 \angle 76.09) & (0.038 \angle 153.11) & (0.038 \angle {-}153.11) & (0.014 \angle {-}3.66) & (0.014 \angle 3.66) & (0.000 \angle {-}0.00) & (0.640 \angle {-}0.00) & (0.372 \angle {-}0.00) & (0.152 \angle {-}0.00) & (0.012 \angle 180.00) & (0.004 \angle 0.00) & (0.006 \angle {-}0.00) & (0.000 \angle 17.67) & (0.000 \angle {-}17.67) & (0.000 \angle {-}0.00) & \Delta {e_{d'}}_{G_4} \\
(0.053 \angle {-}180.00) & (0.001 \angle 1.23) & (0.001 \angle {-}1.23) & (0.610 \angle 0.00) & (0.203 \angle {-}0.00) & (0.275 \angle 0.00) & (0.011 \angle {-}180.00) & (0.008 \angle 180.00) & (0.000 \angle 131.90) & (0.000 \angle {-}131.90) & (0.010 \angle {-}138.55) & (0.010 \angle 138.55) & (0.002 \angle {-}155.70) & (0.002 \angle 155.70) & (0.000 \angle {-}180.00) & (0.001 \angle 0.00) & (0.000 \angle 180.00) & (0.000 \angle {-}0.00) & (0.002 \angle 180.00) & (0.000 \angle 180.00) & (0.001 \angle {-}180.00) & (0.001 \angle 26.84) & (0.001 \angle {-}26.84) & (0.000 \angle {-}180.00) & \Delta {e_{q''}}_{G_4} \\
(0.661 \angle {-}0.00) & (0.000 \angle 69.39) & (0.000 \angle {-}69.39) & (0.028 \angle 180.00) & (0.006 \angle 0.00) & (0.001 \angle 0.00) & (0.352 \angle {-}0.00) & (0.149 \angle 0.00) & (0.000 \angle 21.05) & (0.000 \angle {-}21.05) & (0.027 \angle {-}107.02) & (0.027 \angle 107.02) & (0.004 \angle 65.63) & (0.004 \angle {-}65.63) & (0.000 \angle {-}180.00) & (0.087 \angle {-}180.00) & (0.035 \angle {-}180.00) & (0.006 \angle {-}180.00) & (0.002 \angle 180.00) & (0.001 \angle 0.00) & (0.001 \angle {-}0.00) & (0.000 \angle 17.75) & (0.000 \angle {-}17.75) & (0.000 \angle {-}0.00) & \Delta {e_{d''}}_{G_4} \\
}
\begin{document}
\begin{table}[p]
\caption{Big matrix, parts 1 and 2}
\scriptsize
\[
\begin{array}{@{} *{6}{l} *{18}{H} | l @{}} % pick off columns 1 to 6
\blob
\midrule
\mc{\lambda_{0}} & \mc{\lambda_{1}} & \mc{\lambda_{2}} & \mc{\lambda_{3}} & \mc{\lambda_{4}} & \mc{\lambda_{5}} &
%\mc{\lambda_{6}} & \mc{\lambda_{7}} & \mc{\lambda_{8}} & \mc{\lambda_{9}} & \mc{\lambda_{10}}& \mc{\lambda_{11}}&
%\mc{\lambda_{12}}& \mc{\lambda_{13}} & \mc{\lambda_{14}}& \mc{\lambda_{15}}& \mc{\lambda_{16}}& \mc{\lambda_{17}}&
%\mc{\lambda_{18}}& \mc{\lambda_{19}} & \mc{\lambda_{20}}& \mc{\lambda_{21}}& \mc{\lambda_{22}}& \mc{\lambda_{23}}& \\
\end{array}
\]
\[
\begin{array}{@{} *{6}{H} *{6}{l} *{12}{H}|l @{}} % pick off cols 7 to 12
\blob
\midrule
\lambda_{0} & \lambda_{1} & \lambda_{2} & \lambda_{3} & \lambda_{4} & \lambda_{5} &
\mc{\lambda_{6}} & \mc{\lambda_{7}} & \mc{\lambda_{8}} & \mc{\lambda_{9}} & \mc{\lambda_{10}}& \mc{\lambda_{11}}&
%\mc{\lambda_{12}}& \mc{\lambda_{13}} & \mc{\lambda_{14}}& \mc{\lambda_{15}}& \mc{\lambda_{16}}& \mc{\lambda_{17}}&
%\mc{\lambda_{18}}& \mc{\lambda_{19}} & \mc{\lambda_{20}}& \mc{\lambda_{21}}& \mc{\lambda_{22}}& \mc{\lambda_{23}}& \\
\end{array}
\]
\end{table}
\begin{table}[p]
\caption{Big matrix, parts 3 and 4}
\scriptsize
\[
\begin{array}{@{} *{12}{H} *{6}{l} *{6}{H} | l @{}} % pick off cols 13 to 18
\blob
\midrule
\lambda_{0} & \lambda_{1} & \lambda_{2} & \lambda_{3} & \lambda_{4} & \lambda_{5} &
\lambda_{6} & \lambda_{7} & \lambda_{8} & \lambda_{9} & \lambda_{10} & \lambda_{11} &
\mc{\lambda_{12}}& \mc{\lambda_{13}}& \mc{\lambda_{14}}& \mc{\lambda_{15}}& \mc{\lambda_{16}}& \mc{\lambda_{17}}&
%\mc{\lambda_{18}}& \mc{\lambda_{19}} & \mc{\lambda_{20}}& \mc{\lambda_{21}}& \mc{\lambda_{22}}& \mc{\lambda_{23}}& \\
\end{array}
\]
\[
\begin{array}{@{} *{18}{H} *{6}{l} | l @{}} % pick off cols 19 to 24
\blob
\midrule
\lambda_{0} & \lambda_{1} & \lambda_{2} & \lambda_{3} & \lambda_{4} & \lambda_{5} &
\lambda_{6} & \lambda_{7} & \lambda_{8} & \lambda_{9} & \lambda_{10}& \lambda_{11}&
\lambda_{12}& \lambda_{13}& \lambda_{14}& \lambda_{15}& \lambda_{16}& \lambda_{17}&
\mc{\lambda_{18}}& \mc{\lambda_{19}} & \mc{\lambda_{20}}& \mc{\lambda_{21}}& \mc{\lambda_{22}}& \mc{\lambda_{23}}& \\
\end{array}
\]
\end{table}
\end{document}