Problem 19.102 Two identical conducting spheres are separated by a fixed center-
ID: 1529629 • Letter: P
Question
Problem 19.102 Two identical conducting spheres are separated by a fixed center-to-center distance of 42 cm and have different charges. Initially, the spheres attract each other with a force of 0.095 N. The spheres are now connected by a thin conducting wire. After the wire is removed, the spheres are positively charged and repel one another with a force of 0.032 N. Find (a) the final and (b) the initial charges on the spheres.
Part A
Express your answer using two significant figures. Enter your answers numerically separated by a comma.
Part B
Express your answer using two significant figures. Enter your answers numerically separated by a comma.
q1i,q2i= C
q1f,q2f= CExplanation / Answer
Force of attraction = k . Q1 . Q2 / 0.42^2
After they are connected, charge on each will be the same
F = k . Q(new)^2 / 0.42^2
Q (new) = 0.032 . 0.42^2 / 9 . 10^9 = = 7.92* 10^–7 C
(b) |Q1 – Q2| / 2 = 8.86 * 10^–7
Q1 – Q2 = 15.84 * 10^–7 C
( the two charges partly cancel each other and then share whatever charge is left )
0.095 = 9 . 10^9 . Q1 . Q2 / 0.42^2
1.862*10^–12 = Q1 . Q2
You have to substitute Q2 = Q1 – 15.84* 10^–7 into the last equation - it will form a quadratic which you can solve to get Q1 ( and then Q2 )