Let µ be a finite Borel measure on [0 ,1). In this paper, we consider the generalized integral type Hilbert operator I µ α + 1 ( f ) ( z ) = ∫ 0 1 f ( t ) ( 1 − tz ) α + 1 d µ ( t ) ( α > − 1 ) . The operator I µ 1 has been extensively studied recently. The aim of this paper is to study the boundedness(resp. compactness) of I µ α + 1 acting from the normal weight Bloch space into another of the same kind. As consequences of our study, we get completely results for the boundedness of I µ α + 1 acting between Bloch type spaces, logarithmic Bloch spaces among others.