Although the theory is much cleaner working over algebraically closed fields, I think Sturm's Theorem (counting real roots of a polynomial) is a very nice result in real algebraic geometry which is at a level appropriate for undergraduates.

Although the theory is much cleaner working over algebraically closed fields, I think Sturm's Theorem (counting real roots of a polynomial) is a very nice result in real algebraic geometry which is at a level appropriate for undergraduates.

Although the theory is much cleaner working over algebraically closed fields, I think Sturm's Theorem (counting real roots of a polynomial) is a very nice result in real algebraic geometry which is at level appropriate for undergraduates.

Although the theory is much cleaner working over algebraically closed fields, I think Sturm's Theorem (counting real roots of a polynomial) is a very nice result in real algebraic geometry which is at a level appropriate for undergraduates.