How to deal problems in finding real roots of a polynomial?

Question

After encountering many numerical problems related to finding real roots of a polynomial, I have fixed  a simple path:

For an odd-degree polynomial: complex roots come in pairs. If a polynomial is of degree $d$ which is odd then the polynomial must have at least one real root.

For a even-degree polynomial I have always seen it has no real root!

I am looking for a counterexample.
please can anyone tell is there any general approach to solve this kind of problem? Often I do mistake in these.

user239203 · Answer

For instance, $(x-1)(x-2)=x^2-3x+2$ has two real roots.

How to deal problems in finding real roots of a polynomial?

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