Question
The graph shows a arrow going just like this <----------- and in the middle it shows a square with the word "box" inside the square and another arrow going like this ---------> and on top of both boxes it has numbers the one going like this <----------- has 14 N on top of the arrow and the other going like this --------> has 8 N on top of the arrow.
Which change in force would stop this box from moving?
(1 point)
Responses
adding 6 N of force pulling to the left
adding 6 N of force pulling to the left
subtracting 8 N of force pulling to the right
subtracting 8 N of force pulling to the right
adding 6 N of force pulling to the right
adding 6 N of force pulling to the right
subtracting 8 N of force pulling to the left
Which change in force would stop this box from moving?
(1 point)
Responses
adding 6 N of force pulling to the left
adding 6 N of force pulling to the left
subtracting 8 N of force pulling to the right
subtracting 8 N of force pulling to the right
adding 6 N of force pulling to the right
adding 6 N of force pulling to the right
subtracting 8 N of force pulling to the left
Answers
GPT-4o mini
To determine which change in force would stop the box from moving, we need to analyze the forces acting on it.
Currently, there is a force of 14 N pulling to the left and a force of 8 N pulling to the right.
The net force acting on the box can be calculated as follows:
- Force to the left = 14 N
- Force to the right = 8 N
- Net force = 14 N (left) - 8 N (right) = 6 N to the left
To stop the box from moving, we need to balance this net force to zero.
One way to do this is to apply a force equal to the net force but in the opposite direction (towards the right):
- The net force is 6 N to the left, so we need to add a force of 6 N to the right.
Based on the provided options, the correct response is:
**Adding 6 N of force pulling to the right**.
Currently, there is a force of 14 N pulling to the left and a force of 8 N pulling to the right.
The net force acting on the box can be calculated as follows:
- Force to the left = 14 N
- Force to the right = 8 N
- Net force = 14 N (left) - 8 N (right) = 6 N to the left
To stop the box from moving, we need to balance this net force to zero.
One way to do this is to apply a force equal to the net force but in the opposite direction (towards the right):
- The net force is 6 N to the left, so we need to add a force of 6 N to the right.
Based on the provided options, the correct response is:
**Adding 6 N of force pulling to the right**.