CA 3
In the geometry window below, do the following:
Graph a cubic polynomial on the region [-3,3]. Let the four coefficients a,b,c,d show up on the screen as sliders ranging between -2 and 2. Dynamically label the function, that is have the text "ax^3+bx^2+cx+d" show up on the screen beside the function. As the values a,b,c and d vary, they should change in your text also, and the location of the text should move with the function. I suggest tying the location of this text to the Y-intercept.
Insert two checkboxes, if they are unchecked then nothing else should show up on screen(but the function and sliders should still be visible). Call the first checkbox 'Important Points' and the second checkbox 'Inverse'.
If the first checkbox is ticked: Dynamically label the roots of the polynomial and any local maximum and minimum points that exist in this interval. That is have their (x,y) values show up beside the points, and these (x,y) values change as the points move around.
If the second checkbox is ticked: Reflect the cubic about the line y=x. Label the image simply as "Image" and the line of reflection as "Line of Reflection".
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You have until Wednesday the 10th of December at 11pm to complete the CA.