This article analyses a congruence formula and gives the relationship of the elements of lattice L and its principal congruence by constructing the principal congruence formula.

The original congruent number formula has been deduced by fundmental methods of number theory.

Some congruences concerning Euler numbers;

The note to the solutions of the congruence 2~(n-2)≡1(mod n);

Solution on the congruence 2~n≡5(mod n);

The solution of systems of congruence expressions of first degree by matrix;

The periodic laws of distribution domain of the graph in degree four were obtained by using the principle of congruence expression, and the conditions of the distribution domain which vertices are all integral, were also found.

A necessary and sufficient condition is presented in this paper to decide whether an integer a is p-th surplus to module p and, in addition, a solution is also offered for the congruence expression X P≡a(modp l

Taking m=1,2 we obtain the two congruences for (2-2 2n )B 2n (mod 2 7) and (3-3 2n )B 2n (mod 3 5),which were announced in .

U a mk  with elementary method,and give some identities and congruences involving the Fibonacci numbers and the Lucas numbers.

This generalizes a class of congruences involving the harmonic sums obtained by Lehmer.