The box will move toward the right side of the page.
This is because there is a net force on the box to the right. The net force is the sum of all the forces acting on the box, and it is calculated by adding up all the forces in the x-direction and all the forces in the y-direction. In this case, the four people pulling on the box are all applying forces in the x-direction, and there are no forces acting on the box in the y-direction.
To calculate the net force, we add up the magnitudes of the four forces:
Net force = 7N + 10N + 13N + 30N = 60N
Since the net force is positive in the x-direction, we know that the box will accelerate to the right.
To answer the question more specifically, the box will **not** move directly toward Arthur or Diane, because they are both pulling at an angle. The box will move in a direction that is somewhere between the directions of Arthur's and Diane's forces, depending on the exact angle at which they are pulling.
The net force is shown as a red arrow in the diagram.
In addition to the above, here is a more detailed explanation of why the box will move toward the right side of the page:
Newton's first law of motion states that an object at rest will remain at rest, and an object in motion will remain in motion at a constant velocity, unless acted upon by an external force. This means that the box will not move on its own. It needs a net force to be applied to it in order to move.
In this case, the net force on the box is to the right. This is because there are four people pulling on the box, and all four people are pulling to the right. The sum of the forces from the four people is greater than zero, so the net force is to the right.
According to Newton's second law of motion, the acceleration of an object is proportional to the net force acting on it. This means that the box will accelerate to the right.
Therefore, we can conclude that the box will move toward the right side of the page.