5 The flux of the curl of the vector field F (1. y, z) = (y², 7, z) through the surface E= {(z, y, z) € R'z = y + 5, + y < 1}, oriented in such a way that its normal vector i satisfies the condition ri · k> 0, equals %3D (A) n/2 (B) – (C) 0 (D) 7

Please solve asap and explain what you did when you solved the integral

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5 The flux of the curl of the vector field F(, y, 2) = (y², r, z) through the surface = {{x, y, z) E RZ=y+ 5, a+ y <1}, oriented in sueh a way that its normal vector i satisfies the condition ñ · k> 0, equals (A) #/2 (B) 元 (C) 0 (D) T