Function: y = x4+ x3 - 2x2 y-intercept: Sketch the graph: Roots: Maximums/Minimums: Describe the end behavior: Part C: Consider the following list of equations. By looking at the qualities of the equation, make a sketch to predict the end behavior of the graph. Take into account the degree and leading coefficient. Describe the predicted end behavior. Then, graph the equation on the calculator to see how close your sketch was to the actual graph of the function. Predicted End Actual Sketch Equation Prediction Sketch Behavior from calculator) noromil aid1 10 10 vadod based x - -0o, y- y = x2+5x+7 x -+ 00, y - ulaniveslle sdi to don not goneto x -+ -0o, y -+ y = -3x6 - 5x2+2x x -+ 00,y-+ x - -oo,y -+ y = 4x5+2x2-5 x - 00, y -+