$\mathrm{GL}_n(K)\to\mathrm{SL}_n(K)$ has a retraction iff the following two conditions hold
- The subgroup of $n$-root of unity in $K^*$ has a direct summand in $K^*$.
- $x\mapsto x^n$ is surjective on $K$
Let us first check that (1.) is equivalent to the existence of a retraction in restriction to $K^*\mathrm{SL}_n(K)$ (the subgroup generated by homotheties and unimodular matrices). Clearly it implies it (consider the set of scalar matrices whose diagonal entry belongs to this direct summand). Conversely, if there is a retraction, its kernel has trivial intersection with $\mathrm{SL}_n(K)$, hence contained in its centralizer, which is reduced to scalar matrices, so it should form the set of scalar matrices with diagonal entry in some direct summand of the set $n$-roots of unity in $K^*$.
Now it is clear that $K^*\mathrm{SL}_n(K)$ equals $\mathrm{GL}_n(K)$ if and only if (2.) holds; so if both (1.) and (2.) hold it follows that we have a retraction; conversely if we have a retraction, its kernel is a normal subgroup with trivial intersection with $\mathrm{SL}_n(K)$, hence contained in its centralizer, which is reduced to scalar matrices, so $\mathrm{GL}_n(K)$ should be generated by unimodular and scalar matrices, i.e. (2.) holds, and then the first verification shows that (1.) holds.