Find a polynomial function ƒ(x) of least degree having only real coefficients and zeros as given. Assume multiplicity 1 unless otherwise stated. See Examples 4–6. 5+i and 5-i

A polynomial function is a mathematical expression involving a sum of powers in one or more variables multiplied by coefficients. The general form of a polynomial in one variable x is given by f(x) = a_n*x^n + a_(n-1)*x^(n-1) + ... + a_1*x + a_0, where a_n, a_(n-1), ..., a_0 are constants and n is a non-negative integer. Understanding polynomial functions is essential for constructing and analyzing their properties, including their degree and zeros.

The Complex Conjugate Root Theorem states that if a polynomial has real coefficients, then any non-real complex roots must occur in conjugate pairs. For example, if 5+i is a root, then its conjugate 5-i must also be a root. This theorem is crucial for determining all the roots of a polynomial when given complex roots, ensuring that the polynomial remains a function with real coefficients.

The degree of a polynomial is the highest power of the variable in the polynomial expression. It determines the polynomial's behavior, including the number of roots it can have and its end behavior as x approaches positive or negative infinity. In this context, finding a polynomial of least degree means constructing the simplest polynomial that satisfies the given roots, which directly relates to the number of roots and their multiplicities.