Let $K_{p,q}$ be a $(p,q)$-cable of the non-trivial knot $K$ in $S^3$. Let $V_{p,q}$ and $V$ denote the Seifert matrices of $K_{p,q}$ and $K$, respectively.
Is it possible to obtain a closed formula for the matrix $V_{p,q}$ in terms of $V$?
It also appeared in the article of H. Seifert as Theorem II:
Seifert, H. (1950). On the homology invariants of knots. The Quarterly Journal of Mathematics, 1(1), 23-32.
A formula for the Seifert matrix of an arbitrary satellite can be found in the proof of Theorem 6.15 of Lickorish's "An introduction to knot theory".