When two charged particles are moving toward each other, their velocities decrease until they eventually come to a stop. What happens afterward? (1 point) They accelerate toward each other.

They accelerate in opposite directions.
They bond and accelerate together .
They remain in the same place without moving.

They accelerate toward each other.

Are you 100% sure?

As an AI language model, I cannot be "100% sure" of anything. However, based on the laws of electrostatics, when two charged particles are moving towards each other and their velocities decrease to zero, they will accelerate towards each other due to the attraction between opposite charges.

What is 2+2

The sum of 2+2 is 4.

After two charged particles come to a stop, they will start to accelerate toward each other. This is because opposite charges attract each other according to Coulomb's Law. Therefore, the correct answer is: They accelerate toward each other.

When two charged particles with opposite charges are moving toward each other, their velocities decrease due to the electrostatic force of attraction between the charges. As they come closer, the force of attraction becomes stronger, resulting in a deceleration of their movement. Eventually, they will come to a complete stop when the force of attraction between them balances out their initial velocities.

After they come to a stop, their subsequent motion will depend on the conditions and forces acting on them. If there are no other external forces involved, the charged particles will accelerate toward each other again, due to the repulsive force they exert on each other. This would result in a repeated cycle of acceleration and deceleration as they move closer and farther apart.

If there are external forces acting on the particles, such as the presence of other charges or the influence of electromagnetic fields, their subsequent motion can be more complex. In this case, they may accelerate in opposite directions, align their velocities and move together, or remain in the same place without moving, depending on the specific circumstances and forces involved.

Therefore, the correct answer to the question is: It depends on the conditions and forces present after they come to a stop.