Question
Question
In which situation is the magnitude of the total force greater than the magnitude of each of the individual forces?(1 point)
Responses
Two people stand on the same side of a large box. One pushes, and the other pulls with the same amount of force.
Two people stand on the same side of a large box. One pushes, and the other pulls with the same amount of force.
Four people stand on each side of a large box. All four people push the box with the same amount of force.
Four people stand on each side of a large box. All four people push the box with the same amount of force.
Four people stand on each side of a large box. All four people pull the box with the same amount of force.
Four people stand on each side of a large box. All four people pull the box with the same amount of force.
Two people stand on opposite sides of a large box. One pushes, and the other pulls with the same amount of force.
In which situation is the magnitude of the total force greater than the magnitude of each of the individual forces?(1 point)
Responses
Two people stand on the same side of a large box. One pushes, and the other pulls with the same amount of force.
Two people stand on the same side of a large box. One pushes, and the other pulls with the same amount of force.
Four people stand on each side of a large box. All four people push the box with the same amount of force.
Four people stand on each side of a large box. All four people push the box with the same amount of force.
Four people stand on each side of a large box. All four people pull the box with the same amount of force.
Four people stand on each side of a large box. All four people pull the box with the same amount of force.
Two people stand on opposite sides of a large box. One pushes, and the other pulls with the same amount of force.
Answers
Answer
ok, but which option is correct:
Question
In which situation is the magnitude of the total force greater than the magnitude of each of the individual forces?(1 point)
Responses
Two people stand on the same side of a large box. One pushes, and the other pulls with the same amount of force.
Two people stand on the same side of a large box. One pushes, and the other pulls with the same amount of force.
Four people stand on each side of a large box. All four people push the box with the same amount of force.
Four people stand on each side of a large box. All four people push the box with the same amount of force.
Four people stand on each side of a large box. All four people pull the box with the same amount of force.
Four people stand on each side of a large box. All four people pull the box with the same amount of force.
Two people stand on opposite sides of a large box. One pushes, and the other pulls with the same amount of force.
Question
In which situation is the magnitude of the total force greater than the magnitude of each of the individual forces?(1 point)
Responses
Two people stand on the same side of a large box. One pushes, and the other pulls with the same amount of force.
Two people stand on the same side of a large box. One pushes, and the other pulls with the same amount of force.
Four people stand on each side of a large box. All four people push the box with the same amount of force.
Four people stand on each side of a large box. All four people push the box with the same amount of force.
Four people stand on each side of a large box. All four people pull the box with the same amount of force.
Four people stand on each side of a large box. All four people pull the box with the same amount of force.
Two people stand on opposite sides of a large box. One pushes, and the other pulls with the same amount of force.
Answered by
GPT-4 Turbo
The situation in which the magnitude of the total force is greater than the magnitude of each of the individual forces is:
"Two people stand on opposite sides of a large box. One pushes, and the other pulls with the same amount of force."
In this scenario, since the two individuals are on opposite sides of the box and are applying their forces in the same direction (one by pushing and one by pulling), the forces add together. If each person applies a force of magnitude F, the total force on the box will be 2F, which is greater than the individual forces applied by each person.
In the other three scenarios described, if everyone pushes or pulls with the same amount of force in the same direction (e.g., all on the same side of the box), the forces would cancel each other out or be equal to the force applied by a single person, and the total force would not be greater than the individual forces.
"Two people stand on opposite sides of a large box. One pushes, and the other pulls with the same amount of force."
In this scenario, since the two individuals are on opposite sides of the box and are applying their forces in the same direction (one by pushing and one by pulling), the forces add together. If each person applies a force of magnitude F, the total force on the box will be 2F, which is greater than the individual forces applied by each person.
In the other three scenarios described, if everyone pushes or pulls with the same amount of force in the same direction (e.g., all on the same side of the box), the forces would cancel each other out or be equal to the force applied by a single person, and the total force would not be greater than the individual forces.
Answered by
GPT-4 Turbo
The correct option is:
"Two people stand on opposite sides of a large box. One pushes, and the other pulls with the same amount of force."
In this situation, the forces applied by the two people add together because they are exerted in the same direction relative to the box—thereby increasing the magnitude of the total force on the box beyond that of either individual force.
"Two people stand on opposite sides of a large box. One pushes, and the other pulls with the same amount of force."
In this situation, the forces applied by the two people add together because they are exerted in the same direction relative to the box—thereby increasing the magnitude of the total force on the box beyond that of either individual force.