Page:Laplace - Œuvres complètes, Gauthier-Villars, 1878, tome 3.djvu/118

de pouvoir corriger immédiatement ces résultats, quand on aura les corrections des masses.

${\displaystyle {\begin{alignedat}{2}(0,\ 1)&=(1+\mu '\ \,).\ \,9''{,}421152,\qquad &{\begin{array}{|c|}\hline 0,\ 1\\\hline \end{array}}&=(1+\mu '\ \,).\ \,6''{,}053725,\\(0,\ 2)&=(1+\mu ''\,).\ \,2''{,}974746,&{\begin{array}{|c|}\hline 0,\ 2\\\hline \end{array}}&=(1+\mu ''\,).\ \,1''{,}411096,\\(0,\ 3)&=(1+\mu ''').\ \,0''{,}125403,&{\begin{array}{|c|}\hline 0,\ 3\\\hline \end{array}}&=(1+\mu ''').\ \,0''{,}039496,\\(0,\ 4)&=(1+\mu ^{\rm {iv}}).\ \,4''{,}862570,&{\begin{array}{|c|}\hline 0,\ 4\\\hline \end{array}}&=(1+\mu ^{\rm {iv}}).\ \,0''{,}451633,\\(0,\ 5)&=(1+\mu ^{\rm {v}}\,).\ \,0''{,}248641,&{\begin{array}{|c|}\hline 0,\ 5\\\hline \end{array}}&=(1+\mu ^{\rm {v}}\,).\ \,0''{,}012610,\\(0,\ 6)&=(1+\mu ^{\rm {vi}}).\ \,0''{,}005252,&{\begin{array}{|c|}\hline 0,\ 6\\\hline \end{array}}&=(1+\mu ^{\rm {vi}}).\ \,0''{,}000129,\\\\(1,\ 0)&=(1+\mu \ \ ).\ \,1''{,}303450,&{\begin{array}{|c|}\hline 1,\ 0\\\hline \end{array}}&=(1+\mu \ \ ).\ \,0''{,}837553,\\(1,\ 2)&=(1+\mu ''\,).22''{,}889753,&{\begin{array}{|c|}\hline 1,\ 2\\\hline \end{array}}&=(1+\mu ''\,).19''{,}058562,\\(1,\ 3)&=(1+\mu ''').\ \,0''{,}457288,&{\begin{array}{|c|}\hline 1,\ 3\\\hline \end{array}}&=(1+\mu ''').\ \,0''{,}263124,\\(1,\ 4)&=(1+\mu ^{\rm {iv}}).12''{,}750512,&{\begin{array}{|c|}\hline 1,\ 4\\\hline \end{array}}&=(1+\mu ^{\rm {iv}}).\ \,2''{,}211195,\\(1,\ 5)&=(1+\mu ^{\rm {v}}\,).\ \,0''{,}640032,&{\begin{array}{|c|}\hline 1,\ 5\\\hline \end{array}}&=(1+\mu ^{\rm {v}}\,).\ \,0''{,}060621,\\(1,\ 6)&=(1+\mu ^{\rm {vi}}).\ \,0''{,}013439,&{\begin{array}{|c|}\hline 1,\ 6\\\hline \end{array}}&=(1+\mu ^{\rm {vi}}).\ \,0''{,}000634,\\\\(2,\ 0)&=(1+\mu \ \ ).\ \,0''{,}301154,&{\begin{array}{|c|}\hline 2,\ 0\\\hline \end{array}}&=(1+\mu \ \ ).\ \,0''{,}142855,\\(2,\ 1)&=(1+\mu '\ \,).16''{,}749060,&{\begin{array}{|c|}\hline 2,\ 1\\\hline \end{array}}&=(1+\mu '\ \,).13''{,}945671,\\(2,\ 3)&=(1+\mu ''').\ \,1''{,}336417,&{\begin{array}{|c|}\hline 2,\ 3\\\hline \end{array}}&=(1+\mu ''').\ \,1''{,}027656,\\(2,\ 4)&=(1+\mu ^{\rm {iv}}).21''{,}444015,&{\begin{array}{|c|}\hline 2,\ 4\\\hline \end{array}}&=(1+\mu ^{\rm {iv}}).\ \,5''{,}129740,\\(2,\ 5)&=(1+\mu ^{\rm {v}}\,).\ \,1''{,}050745,&{\begin{array}{|c|}\hline 2,\ 5\\\hline \end{array}}&=(1+\mu ^{\rm {v}}\,).\ \,0''{,}137390,\\(2,\ 6)&=(1+\mu ^{\rm {vi}}).\ \,0''{,}021899,&{\begin{array}{|c|}\hline 2,\ 6\\\hline \end{array}}&=(1+\mu ^{\rm {vi}}).\ \,0''{,}001428,\\\\(3,\ 0)&=(1+\mu \ \ ).\ \,0''{,}057600,&{\begin{array}{|c|}\hline 3,\ 0\\\hline \end{array}}&=(1+\mu \ \ ).\ \,0''{,}018142,\\(3,\ 1)&=(1+\mu '\ \,).\ \,1''{,}518147,&{\begin{array}{|c|}\hline 3,\ 1\\\hline \end{array}}&=(1+\mu '\ \,).\ \,0''{,}873545,\\(3,\ 2)&=(1+\mu ''\,).\ \,6''{,}063413,&{\begin{array}{|c|}\hline 3,\ 2\\\hline \end{array}}&=(1+\mu ''\,).\ \,4''{,}662522,\\(3,\ 4)&=(1+\mu ^{\rm {iv}}).44''{,}479510,&{\begin{array}{|c|}\hline 3,\ 4\\\hline \end{array}}&=(1+\mu ^{\rm {iv}}).16''{,}108309,\\(3,\ 5)&=(1+\mu ^{\rm {v}}\,).\ \,2''{,}031918,&{\begin{array}{|c|}\hline 3,\ 5\\\hline \end{array}}&=(1+\mu ^{\rm {v}}\,).\ \,0''{,}404446,\\(3,\ 6)&=(1+\mu ^{\rm {vi}}).\ \,0''{,}041468,&{\begin{array}{|c|}\hline 3,\ 6\\\hline \end{array}}&=(1+\mu ^{\rm {vi}}).\ \,0''{,}004114,\\\end{alignedat}}}$