Use a graphing calculator to find the coordinates of the turning points of the graph of each polynomial function in the given domain interval. Give answers to the nearest hundredth. ƒ(x)=x^4-7x^3+13x^2+6x-28; [-1, 0]

Turning points are points on a graph where the function changes direction from increasing to decreasing or vice versa. For polynomial functions, these points occur where the first derivative equals zero. Identifying turning points is crucial for understanding the shape and behavior of the graph within a specified interval.

A graphing calculator is a powerful tool that allows users to visualize functions and perform complex calculations. It can be used to find derivatives, evaluate functions at specific points, and graph polynomial equations. Familiarity with the calculator's features is essential for efficiently finding turning points and interpreting the results.

Polynomial functions are mathematical expressions involving variables raised to whole number powers, combined using addition, subtraction, and multiplication. The degree of the polynomial determines its general shape and the number of turning points it can have. Understanding the characteristics of polynomial functions is vital for analyzing their graphs and behavior over specified intervals.