In Exercises 1–16, divide using long division. State the quotient, and the remainder, r(x). (x^4−81)/(x−3)

Polynomial long division is a method used to divide a polynomial by another polynomial of lower degree. It involves a process similar to numerical long division, where you divide the leading term of the dividend by the leading term of the divisor, multiply the entire divisor by this result, and subtract it from the dividend. This process is repeated until the degree of the remainder is less than the degree of the divisor.

The Quotient and Remainder Theorem states that when a polynomial f(x) is divided by a linear divisor of the form (x - c), the result can be expressed as f(x) = (x - c)Q(x) + R, where Q(x) is the quotient and R is the remainder. The remainder R will be a constant if the divisor is linear, and it can be found directly by evaluating f(c). This theorem is essential for understanding the results of polynomial division.

The degree of a polynomial is the highest power of the variable in the polynomial expression. It plays a crucial role in polynomial division, as the degree of the remainder must be less than the degree of the divisor for the division process to be complete. Understanding the degree helps in predicting the behavior of the polynomial and in determining the number of times the division process will need to be performed.