is there is a way to visualise what it actually means that a polynomial has complex number roots?
if we take an example of finding a root for the equation $x^2+1 = 0$ in complex field, is there a way to visualise or think about the roots?
can you also please explain in an intuitive way the difference in geometry between the complex field and a real field.
thank you
Yes, you can visualize it. Given a polynomial $p(x)$, consider the graph of $\bigl|p(x)\bigr|$. The zeros of $p(x)$ are the points at which this surface touches tha plane $z=0$.
And you can solve the equation $x^2+1=0$ in $\Bbb C$ using the fact that $i^2=(-i)^2=-1$. So, $i$ and $-i$ are roots of $x^2+1$ and, since no number can have more that two square roots, there are no more roots. If you want to apply the method of the previous paragraph, just consider this surface:
In geometrical terms, the difference between $\Bbb R$ and $\Bbb C$ is that $\Bbb R$ is a line, whereas $\Bbb C$ is a plane.