It implies the polynomial is quadratic.

It suggests the polynomial is linear.

It means the derivative will have a root of multiplicity 1 at the same point.

It indicates the polynomial has no real roots.

Finding the derivative of the polynomial.

Identifying the degree of the polynomial.

Guessing the complex roots.

Determining the first factor to use in factorization.

By providing a method to integrate the polynomial.

By eliminating complex roots.

By identifying stationary points which can be roots of the polynomial.

By simplifying the polynomial to a linear form.

It indicates the polynomial is quadratic.

It shows the polynomial has no roots.

It confirms the polynomial is linear.

It reveals the stationary points which might be roots of the original polynomial.

They indicate the polynomial is linear.

They help identify potential roots of the polynomial.

They are irrelevant to factorization.

They confirm the polynomial is quadratic.

To validate that the identified roots are correct and complete the factorization.

To ensure the polynomial is quadratic.

To confirm the polynomial has no imaginary parts.

To check if the polynomial is linear.

By differentiating the polynomial.

By integrating the polynomial.

By converting the polynomial to a linear form.

By checking if the polynomial equals zero at that root.