Two spheres of electric charges +2 nC and -8 nC are placed at a distance 'd'-apart. If they are allowed to touch each other, what is the new distance between them to get a repulsive force of same magnitude as before?

Question

Two spheres of electric charges +2 nC and -8 nC are placed at a distance 'd'-apart. If they are allowed to touch each other, what is the new distance between them to get a repulsive force of same magnitude as before? (A) (4d/3) (B) (3d/4) (C) d (D) (d/2)

Tardigrade Admin · Accepted Answer

In the first condition, Given, q1=+2 n C=2 × 10-9 C q2 =-8 nC =-8 × 10-9 C F =(k q1 q2/r2) F =(k(2 × 10-9) ×(8 × 10-9)/d2) F =(k(16 × 10-18)/d2) dots(i) In the second condition, F1=(k q1 q2/d' 2) After touching of sphere to each other the total charge =2-8=-6 nC Charge on each sphere =3 nC =3 × 10-9 C F1=(k(3 × 10-9)(3 × 10-9)/(d')2) F1=(k(9 × 10-18)/(d')2) From Eqs. (i) and (ii), we get (k(16 × 10-18)/d2)=(k(9 × 10-18)/(d')2) (d2/d2) =(16 × 10-18/9 × 10-18) (d2/d' 2) =(16/9) (d/d') =√(16/9) (d/d') =(4/3) d ' =(4/3) d' d' =(3/4) d

Q. Two spheres of electric charges $+ 2 n C$ and $- 8 n C$ are placed at a distance $^{'} d^{'}$ -apart. If they are allowed to touch each other, what is the new distance between them to get a repulsive force of same magnitude as before?

$\frac{4 d}{3}$

$\frac{3 d}{4}$

$d$

$\frac{d}{2}$

Q. Two spheres of electric charges +2nC and −8nC are placed at a distance ′d′-apart. If they are allowed to touch each other, what is the new distance between them to get a repulsive force of same magnitude as before?

34d​

43d​

d

2d​

Q. Two spheres of electric charges $+ 2 n C$ and $- 8 n C$ are placed at a distance $^{'} d^{'}$ -apart. If they are allowed to touch each other, what is the new distance between them to get a repulsive force of same magnitude as before?

$\frac{4 d}{3}$

$\frac{3 d}{4}$

$d$

$\frac{d}{2}$