Advertisements
Advertisements
प्रश्न
- Two insulated charged copper spheres A and B have their centers separated by a distance of 50 cm. What is the mutual force of electrostatic repulsion if the charge on each is 6.5 × 10−7 C? The radii of A and B are negligible compared to the distance of separation.
- What is the force of repulsion if each sphere is charged double the above amount, and the distance between them is halved?
Advertisements
उत्तर
(a)
Charge on sphere A, qA = Charge on sphere B, qB = 6.5 × 10−7 C
Distance between the spheres, r = 50 cm = 0.5 m
Force of repulsion between the two spheres,
`F = (q_A q_B)/(4piin_0r^2)`
Where,
∈0 = Free space permittivity
`1/(4piin_0) = 9 xx 10^9` N m2 C−2
∴ `F = (9 xx 10^9 xx (6.5 xx 10^-7)^2)/((0.5)^2)`
= `(9 xx 10^9 xx (42.25 xx 10^-14))/(0.25)`
= `(9 xx 42.25 xx 10^-5)/(0.25)`
= `(380.25 xx 10^-5)/(0.25)`
= `0.0038025/0.25`
= 0.01521
or F = 1.521 × 10−2 N
Therefore, the force between the two spheres is 1.52 × 10−2 N.
(b) After doubling the charge, charge on sphere A, qA = Charge on sphere B, qB = 2 × 6.5 × 10−7 C = 1.3 × 10−6 C
The distance between the spheres is halved.
∴ `r = 0.5/2`
= 0.25 m
Force of repulsion between the two spheres,
`F = (q_A q_B)/(4 pi ∈_0 r^2)`
= `(9 xx 10^9 xx 1.3 xx 10^-6 xx 1.3 xx 10^-6)/(0.25)^2`
= `(15.21 xx 10^-3)/0.0625`
= `0.01521/0.0625`
= 0.243 N
Therefore, the force between the two spheres is 0.243 N.
