Classifying solutions to quadratic equations

Consider the equation ax² + bx + c = 0, which we wish to solve for a complex number x, and suppose that a ≠ 0. Depending on what we know about the coefficients a, b, and c, we can use the discriminant b² − 4ac to classify the solutions even without fully calculating them.

If the coefficients are arbitrary complex numbers, then this is all that we can say:

Discriminant:	Solutions:
Zero,	One solution;
Nonzero,	Two solutions.

If the coefficients are all real numbers, then we can say more:

Discriminant:	Solutions:
Zero,	One real solution;
Positive,	Two real solutions;
Negative,	Two conjugate imaginary solutions.

If the coefficients are all rational numbers, then we can say even more:

Discriminant:	Solutions:
Zero,	One rational solution;
Positive perfect square,	Two rational solutions;
Positive non-square,	Two conjugate irrational real solutions;
Negative,	Two conjugate imaginary solutions.

If a = 1 and the coefficients are all integers, then we can say yet more:

Discriminant:	Solutions:
Zero,	One integer solution;
Positive perfect square,	Two integer solutions;
Positive non-square,	Two conjugate irrational real solutions;
Negative,	Two conjugate imaginary solutions.

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