Suppose that $f$ has level $N$, and suppose that $N$ is divisible by $p$.
Then it is well known that $f$ is congruent modulo (some prime above) $p$ to a form
$g$ of level $M$ dividing $N$ (and high weight), where $M$ is prime to $p$.
In particular, by induction, all forms $f$ are connected to a form $g$ of level $1$ in
at most $d$ steps, where $d$ is the number of distinct prime divisors of $N$. Yet all
weight one forms are congruent to $\Delta$ modulo $2$. This is actually related to ideas behind the proof of Serre's conjecture:

http://en.wikipedia.org/wiki/Serre%27s_modularity_conjecture