The author proves that there are infinitely many primes $p$ such that $\| αp - β\| < p^{-\frac{28}{87}}$, where $α$ is an irrational number and $β$ is a real number. This sharpens a result of Jia (2000) and provides a new triple $(γ, θ, ν)=(\frac{59}{87}, \frac{28}{87}, \frac{1}{29})$ that can produce primes in Ford and Maynard's work on prime-producing sieves. Our minimum amount of Type-II information required ($ν= \frac{1}{29}$) is less than any previous work on this topic using only traditional Type-I and Type-II information.