I am doing research on the hitting probability of various sets (eg. 3D convex) and   specifically how changes in perimeter/surface area change the hitting probability.

By hitting probability I mean $P(B[0,t]\cap A\neq \varnothing$ for some t).

Say we have two bounded planes in $\mathbb{R}^{3}$, one with greater surface area than the other and  equidistant from the origin. Then given a brownian motion starting from the origin, I want to get the hitting probability of each plane.
![enter image description here][1]


I suppose the larger surface area plane will have a great hitting probability. But what would be a rigorous way of proving that? 


Thanks that is answered below. 


Also, given the exact coordinates of one of the bounded planes A above, can we compute $P(T_{A}<\infty)$? How can I go about it?

$\{T_{A} <\infty\}=\{B_{1}(t)=a, |B_{2}(t)|\geq b,|B_{3}(t)|<c$ for some $t>0\}$. Here by a,b,c I mean the distance from origin, length and width  of the square $A$. Due to the independence of B.M.'s coordinates, we get:

$P_{0}\{(B_{1}(t)=a)\cap (|B_{2}(t)|\geq b)\cap (|B_{3}(t)|<c)$ for some $t>0\}$=

=$P_{0}(B_{1}(t)=a$ for some $t>0)\cdot P_{0}(|B_{2}(t)|\geq b$ for some $t>0)\cdot P_{0}(|B_{3}(t)|<c$ for some $t>0)<$ 



Also, can you provide some books/papers that expose Brownian motion and surface area for more general sets?


Thnx


  [1]: https://i.sstatic.net/xAHqy.jpg