Quadratic Congruence is a modular equation of the form: 
.
. In this exercise you will be given a vector containing the coefficients of a quadratic polynomial (
), and a modulus base (m). Using these data, create a function that outputs the pair (
), which are the 'primitive' solutions to the quadratic congruence.
), and a modulus base (m). Using these data, create a function that outputs the pair (), which are the 'primitive' solutions to the quadratic congruence.For example consider the congruence: 
, the solution is 
, since:
, the solution is , since:
, and
.NOTE: A primitive modulus to base m, can only have values from 0 to 
. This is a simplified problem, in which the quadratic polynomials given in the test suite, are all factorable, and the modulus base are all odd primes.
. This is a simplified problem, in which the quadratic polynomials given in the test suite, are all factorable, and the modulus base are all odd primes.Solution Stats
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