Respuesta :
Answer:
a) Vb - Vc = K Q / 2r³ (R² –r²) , b) Vc / Vs = ½ The correct answer is c
Explanation:
The electric potential and the electric field are related by the expression
dV = - E .ds
In this case the electric field lines are radial and normal to the sphere is also radial, so the angle between them is zero and the scalar product is reduced to the algebraic product.
a) For potential outside the sphere
∫ dV = - ∫ E dr
Vb - Va = - k Q ∫ dr / r²
Vb - Va = k Q (1 / rb - / ra)
If we take the power to be zero for the infinite distance
Vb = k Q 1 / rb
Now let's calculate the potential for a point inside the sphere
E = k Q/R³ r
k = 1 / 4π eo
Vb-Vc = - k Q / R³ ∫ r dr
Vb - Vc = - k Q / R³ r² / 2
We evaluate for lower limit with R and upper limit with r
Vb - Vc = K Q / 2r³ (R² –r²)
b) the relation of the potential in the center (r = 0) and the surface (r = R)
Vc = k Q / 2R³ R² = k Q / 2R
Vs = k Q / R
The relationship between these potentials is
Vc / Vs = ½
The correct answer is c
