i Safari File Edit View History Bookmarks Window Help C . ED V 0 El Bcanvastwpitedu C; M'y Lab 3 : Newton's Method Lab W 2 u Screen shot )22-0....28.19 PM (2) Now, consider the function for) = x3 + 4x2 2x + 2. (23) Apply Newton's Method to for) with starting approximation (HZ-0329.47 P x0 = 1. Continue Iinding approximations through x'. Hand In a nereonehot of your equations. (in) In (23), You hopefully generated a repetitive pattern. to see why this happened, add the graphs of the tangent lines to f(x) at your 1 = x1 and): = x2 points from (2a). Based on the tangent lines relation to one another. explain why your results from part (23) make sense. In your answer, be sure to discuss where these tangent lines intersect the x-axis. Hand in a screenshot of these graphs and your equations, as well as your answer to the question. hand-written or typed up In any editor. Screen Shof