B Suppose we want to find all the points on the surface g(x, y) = Vx² + 4y² – 4 where the tangent plane is parallel to the plane 2x + 2y + z = 5. et V = (-A, B), - gA, B), 1). Then the vector V is O a normal vector to the tangent plane to the surface g(x,y) at (A, B, C) (input a number from below) parallel to the tangent plane to the surface g(x,y) Nothing can be said about the vector V. The answer is not given. w = (2,2, 1). Then vectors V and W are (input 11 if they are parallel, 7 if they are perpendicular, 0 otherwise).

please indicate whether parallel perpendicular or neither

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B Suppose we want to find all the points on the surface g(x, y) = x² + 4y - 4 where the tangent plane is parallel to the plane 2x + 2y + z = 5. Let v = (-9,(A, B), - g/A, B), 1). Then the vector V is O a normal vector to the tangent plane to the surface g(x,y) at (A, B, C) (input a number from below) 2 parallel to the tangent plane to the surface g(x,y) Nothing can be said about the vector v. The answer is not given. .et w = (2, 2, 1). Then vectors V and W are (input 11 if they are parallel, 7 if they are perpendicular, O otherwise).