Question: (1 point) Let o be the surface 6x + 3y + 9z = 6 in the first octant, oriented upwards. Let C be the oriented

(1 point) Let o be the surface 6x + 3y + 9z = 6 in the first octant, oriented upwards. Let C be the oriented boundary of 6. Compute the work done in moving a unit mass particle around the boundary of o through the vector field (x - 6y) i+ (6y -7z) /+(7z - x) * using line integrals, and using Stoke's Theorem. Assume mass is measured in kg, length in meters, and force in Newtons (1 nt = 1kg-m). LINE INTEGRALS Parameterize the boundary of o positively using the standard form, tv+P with 0

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