(a) Find a vector parametric equation for the part of the plane z = -- 5y + 81 that lies above [0,2] ×x [0, 4]. F(u, v) = for 0

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(Needed only d and e parts )

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(a) Find a vector parametric equation for the part of the plane z = – 5y + 81 that lies above [0,2] × [0, 4]. F(u, v) . for 0 < u < 2 and 0< v< 4. (b) dA du dv (c) dA = ||J|| %3D du dv (d) Set up and evaluate a double integral for the surface area of the part of the plane z=x – 5y + 81 that lies above the square [0, 2] × [0, 4]. Surface area = (e) A region R in the zy-plane has area 1.55. What is the area of the part of the plane z= z – 5y + 81 that lies above and / or below the region R? Surface area =