It saves time by providing additional roots.

It eliminates imaginary parts of the roots.

It simplifies the process of finding real roots.

It reduces the degree of the polynomial.

To ensure all roots are real.

To guarantee the existence of complex conjugate pairs.

To allow for the use of the quadratic formula.

To simplify the polynomial to a linear form.

Four

Three

Two

One

They become negative.

They cancel out.

They remain unchanged.

They double.

Difference of squares

Sum of squares

Product of squares

Square of sums

A difference of squares

A sum of squares

A complex number

A real number

It introduces additional imaginary parts.

It eliminates the need for real roots.

It increases the degree of the polynomial.

It simplifies the polynomial to real coefficients.