In this paper, we construct a new Roper-Suffridge extension operator Φ n , β 1 , … β n r ( f ) ( z ) = F ( z ) = ( ( r f ( z 1 r ) z 1 ) β 1 z 1 , ( r f ( z 1 r ) z 1 ) β 2 z 2 , … , ( r f ( z 1 r ) z 1 ) β n z n ) ′ , where f is a normalized locally biholomorphic function on the unit disc D , r = sup { | z 1 | : z = ( z 1 , … , z n ) ∈ Ω } , β 1 ∈ [ 0 , 1 ] , 0 ≤ β k ≤ β 1 , k = 2 , … , n , then we prove it can preserve the property of spirallikeness of type β, almost starlikeness of order α and starlikeness of order α on bounded complete Reinhardt domain Ω, respectively.