Mass of spherical balls after adding charges

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When two identical spherical balls A and B are charged, A gains a positive charge while B gains a negative charge. Charging affects their masses; B gains mass due to the addition of electrons, while A loses mass as it loses electrons. Consequently, the mass ratio of A to B is less than one. The discussion emphasizes that the method of charging can influence the outcome, but ultimately concludes that the mass of ball A will be less than that of ball B. Thus, the final mass ratio is determined to be less than one.
Amith2006
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# Two identical spherical balls A and B are given equal amount of positive and negative charge. What is the ratio of the masses A and B now?
a)Equal to one
b)Greater than one
c)Less than one
d)May be Greater than or Less than one depending on their sizes
 
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Amith2006 said:
# Two identical spherical balls A and B are given equal amount of positive and negative charge. What is the ratio of the masses A and B now?
a)Equal to one
b)Greater than one
c)Less than one
d)May be Greater than or Less than one depending on their sizes
Are we to assume that A is given a positive charge and B given a negative charge? Even in that case, depending upon the method by which the positive and negative charges are given, the answer could be any of a, b, or c. I don't think the answer can be d because the balls are identical. Is there more information about how to give the balls their charges?
 
When an object becomes charged, it either gains or loses electrons. Since electrons are negatively charged, when an object becomes negatively charged, it GAINS electrons, and therefore mass. So, mass B gains mass.
Similarly, when an object becomes postively charged, it loses electrons. So, mass A loses mass.

Therefore, the ratio of the masses is now less than one.
 

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