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In this paper we provide weighted estimates for rough operators, including rough homogeneous singular integrals TΩ with Ω ∈ L∞(Sn - 1) and the Bochner?Riesz multiplier at the critical index B( n - 1 ) / 2. More precisely, we prove qualitative and quantitative versions of Coifman?Fefferman type inequalities and their vector-valued extensions, weighted Ap- A∞ strong and weak type inequalities for 1 < p< ∞, and A1- A∞ type weak (1, 1) estimates. Moreover, Fefferman?Stein type inequalities are obtained, proving in this way a conjecture raised by the second-named author in the 1990s. As a corollary, we obtain the weighted A1- A∞ type estimates. Finally, we study rough homogenous singular integrals with a kernel involving a function Ω ∈ Lq(Sn - 1) , 1 < q< ∞, and provide Fefferman?Stein inequalities too. The arguments used for our proofs combine several tools: a recent sparse domination result by Conde?Alonso et al. (Anal PDE 10(5):1255?1284, 2017), results by the first author (Collect Math 68:129?144, 2017), suitable adaptations of Rubio de Francia algorithm, the extrapolation theorems for A∞ weights (Cruz-Uribe et al. in J Funct Anal 213:412?439, 2004, Curbera et al. in Adv Math 203:256?318, 2006), and ideas contained in previous works by Seeger (J Am Math Soc 9:95?105 1996) and Fan and Sato (Tohoku Math J 53:265?284, 2001).