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Suppose the spheres A and B in the above question have identical sizes. A third sphere of the same size but uncharged is brought in contact with the first, then brought in contact with the second, and finally removed from both. What is the new force of repulsion between A and B? |
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Answer» Solution :Distance between the spheres, A and B, r = 0.5 m Initially, the CHARGE on each sphere,` q = 6.5 × 10^(−7 )C` When sphere A is touched with an uncharged sphere C, `(q)/(2)`amount ofcharge from A will transfer to sphere C. Hence, charge on each of the spheres, A and C, is.`(q)/(2)` When sphere C with charge `(q)/(2)`is BROUGHT in contact with sphere B with charge q, TOTAL charges on the system will divide into two equal halves given as, `((q)/(2)+q)/(2)=(3q)/(4)` Each sphere will SHARE each half. Hence, charge on each of the spheres, C and B, is. `(3q)/(4)` Force of repulsionbetweensphere Ahaving charge `(q)/(2)` and sphere B havingcharge`(3q)/(4) =((q)/(2) xx(3q)/(4))/(4pi epsilon_(0)r^(2))=(3q^(2))/(8 xx 4 pi epsi_(0)r^(2))` `9 xx 10^(9) xx(3xx (6.5 xx 10^(-7))^(2))/( 8xx (0.5)^(2))` `= 5.703 xx 10^(-3) N` Therefore, the force of attraction between the two spheres is `5.703 × 10^(−3) N`. |
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