An infinite binary sequence has randomness rate at least $sigma$ if, for almost every $n$, the Kolmogorov complexity of its prefix of length $n$ is at least $sigma n$. It is known that for every rational $sigma in (0,1)$, on one hand, there exists sequences with randomness rate $sigma$ that can not be effectively transformed into a sequence with randomness rate higher than $sigma$ and, on the other hand, any two independent sequences with randomness rate $sigma$ can be transformed into a sequence with randomness rate higher than $sigma$. We show that the latter result holds even if the two input sequences have linear dependency (which, informally speaking, means that all prefixes of length $n$ of the two sequences have in common a constant ...