¿Cómo puedo dividir esta gran tabla en más páginas?

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¿Cómo puedo dividir esta gran tabla en más páginas?

Estoy un poco desesperado. Llevo un tiempo aprendiendo LateX. Ya he buscado ayuda en este foro pero no consigo adaptarla a mi problema.

Tengo una matriz de 25x25. Tengo líneas finales (con Lambdas) y en el lado derecho están las variables. Debido a que la matriz es tan grande que no cabe por un lado. Me gustaría dividirlo en unas pocas páginas. Gracias

\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}

Respuesta1

Aquí hay una solución que divide la "gran matriz" en 4 partes. Cada parte muestra 6 columnas de toda la matriz, junto con los nombres de las variables de la columna 25 de la "matriz grande". La Tabla 1 contiene las partes 1 y 2, mientras que la Tabla 2 contiene las partes 3 y 4.

Tenga en cuenta que he omitido todos \mathbflos envoltorios porque, como @barbarabeeton ya señaló en un comentario, negrita matemática ocupamuchomás espacio que la versión sin negrita. Y, al emplear un entorno arrayen lugar de un tabularentorno, uno puede deshacerse de 1248 [!] $fichas interiores. (¿Por qué 1248 celdas? Una matriz de 25x25 contiene 625 celdas. Sin embargo, la celda inferior derecha de la "matriz grande" que tenemos a mano está vacía. Por lo tanto, hay "sólo" 624 celdas no vacías. 2*624=1248 $tokens. )

ingrese la descripción de la imagen aquí

\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}

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