A conducting sphere of radius 10 cm is charged with 10 μ C. Another uncharged sphere of radius 20 cm is allowed to touch it for some time. After that if the spheres are separated, then surface density of charges on the spheres will be in the ratio of

Question

A conducting sphere of radius 10 cm is charged with 10 μ C. Another uncharged sphere of radius 20 cm is allowed to touch it for some time. After that if the spheres are separated, then surface density of charges on the spheres will be in the ratio of (A) 1: 4 (B) 1: 2 (C) 1: 3 (D) 1: 1

Tardigrade Admin · Accepted Answer

Radius of conducting sphere (R1)=10 cm charge on the conducting sphere =10 μ C and radius of uncharged sphere ( R 2)=20 cm For a spherical conductor, the density of charge is proportional to its radius. Therefore ratio of density of charges of the spheres will be 1: 2.

Q. A conducting sphere of radius $10 c m$ is charged with $10 μ C$ . Another uncharged sphere of radius $20 c m$ is allowed to touch it for some time. After that if the spheres are separated, then surface density of charges on the spheres will be in the ratio of

1 : 4

1 : 2

1 : 3

1 : 1

Radius of conducting sphere $(R_{1}) = 10 c m$
charge on the conducting sphere $= 10 μ C$
and radius of uncharged sphere $(R_{2}) = 20 c m$
For a spherical conductor, the density of charge is proportional to its radius. Therefore ratio of density of charges of the spheres will be $1 : 2$ .

Q. A conducting sphere of radius 10cm is charged with 10μC. Another uncharged sphere of radius 20cm is allowed to touch it for some time. After that if the spheres are separated, then surface density of charges on the spheres will be in the ratio of