Please see where I stopped and continue the problem. No need to re-write what I already did. Please format answers just like the question and then solve the problem 100% - TY :) Tutorial Exercise If 19,200 cm of material is available to ma ssible volume of the box. Part 1 of 6 Let b be the length of the base and h the height. Then we must maximize the volume of the box, V = b2h. The surface area of this box is 19200 = 62 + 4 4 hb. Part 2 of 6 19200 - 62 We can solve 19200 = b2 + 4hb for h = 4b 46 Part 3 of 6 We now have V = 62 19200 - 62 ) - 4800 4800 6 -4 2 4 Part 4 of 6 Since V = 4800b - 1b3, then V' = 4800 7x 62 . Submit Skip (you cannot come back) 2 Tutorial Exercise Use Newton's method with the specified initial approximation x, to find x3, the third approximation to the root of the given equation. x5 - x - 6 = 0, x1 = 2 Part 1 of If f( x ) = *5 - x - 6, then F '( X ) = 5 0 25 x4 -1 21 Part 2 of 3 We have Xn + 1 = xn - - = xn - In - *n - 6. Therefore, * 2 = 2 - 24 5 24 1.696203 1.696203 (rounded to six decimal places). Part 3 of 3 We can now determine the value x3- f(x2) X3 = X2 -7'(X2) = 1.696203 - x ) - 1.696203 - 6 * (1.696203)4 - 1 1.539116 (rounded to four decimal places) Submit Skip (you cannot come back) 3 Use Newton's method with initial approximation x1 = -2 to find x2, the second approximation to the root of the equation x3 + x + 7 = 0. (Round your answer to four decimal places.) * 2 = X Need Help? Watch It Find the most general antiderivative of the function. (Check your answer by differentiation. Use C for the constant of the antiderivative. Remember to use absolute values where appropriate.) A(x ) = 5 - X x > 0 F ( x ) = Check your answer by taking the derivative