1
answer
0
watching
76
views
13 Nov 2019
question 3 and 4 with complete explanation please. thank you.
J-2 3. Calculate the area of the region bounded by the graph of g(x) and the graph of h(x) HINT: The graph of g and h intersect in exactly three places. The rule to integrate g(x) = 2 is given in question 1. 4. A cylinder container with circular base is to hold 64in3. Using op timization methods, find the dimensions so that the amount(surface area) of metal required is a minimum when the container is an open can. Recall: The volume of a cylinder is V Tr2h and the surface area of an open can is S(r, h) = 2TTh+TT2. Must show work!
question 3 and 4 with complete explanation please. thank you.
J-2 3. Calculate the area of the region bounded by the graph of g(x) and the graph of h(x) HINT: The graph of g and h intersect in exactly three places. The rule to integrate g(x) = 2 is given in question 1. 4. A cylinder container with circular base is to hold 64in3. Using op timization methods, find the dimensions so that the amount(surface area) of metal required is a minimum when the container is an open can. Recall: The volume of a cylinder is V Tr2h and the surface area of an open can is S(r, h) = 2TTh+TT2. Must show work!
Irving HeathcoteLv2
24 Jan 2019