Consider the solid Q bounded by the surfaces S₁: Z-1 = (y-2)², S₂ : x + y = 2, S3 : x = 0, S4 : y = 0, S5 : z = 0 Let C be the boundary of surface S1, oriented as shown in the figure below: x Jo An integral that allows to determine the value of where F(x, y, z) = (xz, z, y), is: A) *²²²-2(y - 2) dy da -2-1 B) √²²² - 2x (y-2) dy dz dx (0, x, 0)√4(y-2)² + 1 dy dx 2 D) (² ²-² (−2(1 + (y − 2)²³) (y − 2) + y) dx dy F. dr.

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Consider the solid Q bounded by the surfaces S₁: Z-1 = (y-2)², S₂ : x + y = 2, S3 : x = 0, S4 : y = 0, S5 : z = 0 Let C be the boundary of surface S1, oriented as shown in the figure below: x Jo An integral that allows to determine the value of where F(x, y, z) = (xz, z, y), is: 2-2 A) S ²²² -2(y-2) dy dx 2-1 B) √²²² -2x (y-2) dy dx C) D) (0, x, 0)√4(y-2)² + 1 dy dx S ²² (-2(1 + (y − 2)²³) (y − 2) + y) dx dy F. dr.