Line integral of electric potential, how to set up?

Question

I having a problem with the line integral of electric potential.

I have a cylinder of radius $a$ and length $L$ with a uniformly surface charge. At point $b$ the potential is zero. I want to calculate the potential a $r$, i.e. $r>b$.

The integral is $\int_\gamma \vec E \,\, \cdot d\vec l$ and the electric field is $\vec E(\vec r)=\frac{Q}{2\pi r L\epsilon_0} \hat r$ (cylindrical coordinates, $\hat r=\hat x\cos\phi+\hat y\sin \phi$).

In multivariable calculus I use $\int_L \vec E \, \, \cdot d\vec r$ and parameterize the curve $L$ so $\int_L \vec E \, \, \cdot d\vec r= \int_P \vec E (\vec r(t)) \, \, \cdot \frac{d\vec r(t)}{dt}dt$.

But what is $d\vec l$?

I'm lost here, how can I find a curve to parameterize?

Answer 1

You want to parametrize as you said. Your starting point is $r = b$ and the endpoint is some $r = r_0$.

One way you can parametrize is by doing something like: $$ \vec{r}(t) = (1 - t) <b> + t < r_0>$$ where $t$ goes from 0 to 1. The rest I'll let you do!

Answer 2

You don't need to parametrize. The electric field is radially symmetric, so you will integrate along a radius. $dl$ is the same as $dr$, so you have to integrate $E(r)dr$ between suitable limits - one of which will be $r=b$ where $V(b)=0$.