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)=2x^3-5x^2-x+1; [-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 of the function equals zero. Identifying turning points is crucial for understanding the shape and behavior of the graph.

The derivative of a function measures the rate at which the function's value changes at a given point. For polynomial functions, the first derivative can be calculated using power rules. Finding the derivative is essential for determining the turning points, as these occur where the derivative is zero.

Graphing calculators are tools that allow users to visualize functions and perform complex calculations, including finding roots and derivatives. They can plot graphs, compute turning points, and evaluate functions over specified intervals. Familiarity with using a graphing calculator is important for efficiently solving problems involving polynomial functions.