Consider the following 3 cases. (1) A block initially at rest on a floor is given a quick push by a hand. (2) The hand does not touch the block after the quick push. The block slides across the floor, gradually slows down, then comes to rest. In (3), the block is at rest.

In (1), while the hand is pushing the block, but while the block is still at rest, what is the direction of the net force on the block?

In (1), while the hand is pushing the block, but while the block is still at rest, what is the direction of the block’s acceleration?

In (2), after the hand has let go but while the block moves, what is the direction of the net force on the block?

In (2), after the hand has let go but while the block moves to the right before it stops, what is the direction of the block’s acceleration?

In (3), after the block has stopped moving and is at rest, what is the direction of the net force on the block?

In (3), after the block has stopped moving and is at rest, what is the direction of the block’s acceleration?

The acceleration of the block points in the opposite direction of the block's movement (i.e., the opposite direction of the block's velocity.)
The net force on the block points in the opposite direction of the block's movement. (Same direction as the block's acceleration.)

(3) Once again, the block is not moving.

The net force on the block is zero.
The acceleration of the block is also zero.

Explanation:

By Newton's Second Law, the net force on an object is in the same direction as its acceleration. Since this question said a lot about the object's motion, the direction of the object's acceleration might be easier to find than its net force.

(1)

The acceleration of an object is the rate of change of its velocity over time.

In this situation, the velocity of the object is zero, which is itself a constant. As a result, the rate of change of the object's velocity over time would be zero. Hence, the acceleration of the object would also be equal to zero. The zero vector doesn't have a specific direction.

By Newton's Second Law, the net force on the object is proportional to its acceleration. As a result, the net force on the object in this case would also be equal to zero. What about the hand's force on the block? The friction and normal force from the ground balances that force while the block hasn't yet started to move.

(2)

The object is slowing down over time. In other words, its velocity is decreasing over time. When a scalar value is decreasing, its rate of change would be negative. However, since velocity and acceleration are vectors, the acceleration of the object would be in the opposite direction of its velocity.

The net force on an object is in the same direction as its acceleration. As a result, the net force on this block in this case would also be in the opposite direction of the block's velocity.

(3)

Similar to the first situation, since the velocity of the block is zero (a constant,) its acceleration would be equal to zero. Since the net force on an object is proportional to its acceleration, the net force on this block would also be equal to zero.