Electromagnetic fields: Eletric potential inside a non conductive sphere

GhostStudent
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Homework Statement



Hello all;
i am trying to calculate the potential, inside a non conductive sphere of radius equal to a, in a point at a distance r from the center of the sphere.

Homework Equations


i know that:
lLXjw.png

where E and s are vectors;
and that the Eletric field inside the sphere is:
bLOuE.png



The Attempt at a Solution



since the distance r is:
0<r<a
i changed the limits so that:
HaUIV.png


but here comes the part were i am stuck:
i found:
ltF89.png

but the correct answer, so far, should be
g3KkV.png

which means that the first integral [
QHClG.png
] should be equal to zero, but i can't seem to understand why

thx in advance.
p.s.:
please tell me if the images are not showing up.
 
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It is not clear why you have two line integrals. You should use

\varphi(r)-\varphi(a)=-\int^{r}_{a}\vec{E}\cdot \vec{ds}
 
i guess i was thinking more on terms of the path i should take, that's why my first integral ranges from 0 to a (size of the sphere), but since r is greater than 0 and smaller than a (because its inside the sphere, away from both the center and the surface) i changed the ranges.

dont know if i made it clear or not.

also, i was going to apply that equation, like you said, directly, but when my teacher demonstrated a similar problem in class, he also used those limits, so i guess i got a little mixed up.

thx man
 

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