An ordered field is said to be Scott complete iff it is complete with respect to its uniform structure. Zakon has asked whether nonstandard real lines are Scott complete. We prove in ZFC that for any complete Boolean algebra $B$ which is not $(\omega, 2)$-distributive there is an ultrafilter $\mathscr{U}$ of $B$ such that the Boolean ultrapower of the real line modulo $\mathscr{U}$ is not Scott complete. We also show how forcing in set theory gives rise to examples of Boolean ultrapowers of the real line which are not Scott complete.