Let $H,H'\subset\mathbb{R}^m$ be two hyperplanes with unit normal-vector,
and let $P\subset\mathbb{R^m}$ be a convex polytope (defined via its corners $v_0, ... , v_n$, where $n\ge m$).  

Let's further assume that  

- $dist(v_i,H) = 0,\ i\in [0,k]\ \wedge\  dist(v_i,H) \gt 0,\ i\in[k+1,n]$

- $dist(v_j,H') = 0,\ j\in [0,k+d]\ \wedge\ dist(v_j,H') \gt 0,\ j\in[k+d+1,n]\ \wedge\ d\ge 1$  
 
Here $dist(\ ,\ )$ denotes the signed distance.

**Question:**  

Is it true that under the conditions stated above, we have 
$$
  \sum_{i=0}^{n}dist(v_i,H)\ \gt\ \sum_{j=0}^{n}dist(v_j,H'),
$$  
respectively, are there counterexamples known?