Solve each polynomial inequality. Give the solution set in interval notation. See Examples 2 and 3. x^5 + x^2 + 2 ≥ x^4 + x^3 + 2x

Polynomial inequalities involve expressions where a polynomial is compared to a value using inequality symbols (e.g., ≥, ≤). To solve these inequalities, one typically rearranges the equation to set it to zero, allowing for the identification of critical points where the polynomial changes sign. Understanding how to analyze these points is crucial for determining the intervals where the inequality holds true.

Interval notation is a mathematical notation used to represent a range of values. It uses parentheses and brackets to indicate whether endpoints are included (closed intervals) or excluded (open intervals). For example, the interval [a, b) includes 'a' but not 'b', which is essential for expressing solution sets of inequalities clearly and concisely.

Sign analysis is a method used to determine the intervals where a polynomial is positive or negative. After finding the critical points from the polynomial inequality, one tests the sign of the polynomial in the intervals created by these points. This process helps in identifying the solution set that satisfies the inequality, which is vital for correctly expressing the answer in interval notation.