The connection between congruences and integral equations is based on the simple remark that if the equation. F(x₁, x₂, …, x?? )= 0 (1) where F is a polynomial with integral coefficients, has a soltion in integers, then the congruence F(x₁, x₂, …, x?? )= 0 (mod m) (2) is solvable for any value of the modulus m. Since the question of the solvability of a congruence can always be decided, we have a sequence of necessary conditions for the solvability of (1) in integers. The question of the sufficiency of these conditions is much more difficult. The assertion that "an integral equation is solvable in integers if and only if it is solvable as a congruence modulus any positive integer" is in general false. In this paper, we have such an integral equation.