Final answer:
Due to Newton's Second Law, object A with its greater mass will accelerate less than object B under the same force. Thus, the magnitude of acceleration for object A is 1/8 that of object B. The correct answer is |aA| = |aB|/8.
Step-by-step explanation:
The question presented asks about the relationship between the magnitudes of the accelerations (denoted as |aA| and |aB|) of two charged objects on an airtrack, object A and object B, where object A is three times more charged and eight times more massive than object B. According to Coulomb's Law, the force experienced by both objects due to their charge interaction will be the same magnitude but in opposite directions. However, their accelerations will differ due to Newton's Second Law of Motion (F = m*a), because the forces are applied to objects of different masses.
Thus, object A with a higher mass will experience a smaller acceleration compared to object B when subjected to the same force. The correct relationship between the accelerations should indicate that the acceleration of object A is smaller than that of object B, and can be found by dividing the force (which is the same for both) by the mass of each object. Since object A's mass is 8 times that of object B, object A's acceleration will be 1/8 the acceleration of object B. Therefore, the correct answer is that |aA| = |aB|/8.