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A Congruence Theorem relating to Eulerian Numbers and other Coefficients

A Congruence Theorem relating to Eulerian Numbers and other Coefficients

4 !and therefore Substituting in the preceding congruence, we find JBf, (a-) + ( -iy»-»B i( ,. n x+^x = a ^ + 1 > ••(»+P-D , mod p.Now + = -1, modp\ so that the congruence becomes 1900.]relating to Eulerian Numbers and other Coefficients.1734. When a is a positive …