AQ=ηx(hsΔθ)y(ρg1)z . . . (1)
[AQ]=MT−3,[η]=ML−1T−1
[hsΔθ]=LT−2,[ρg1]=M−1L2T2
MT−3=[MxL−xT−x][LyT−2y][M−2L2zT2z]
MT−3=Mx−zL−x+y+2zT−x−2y+2z
So 1=x−z . . . (2)
−x+y+2z=0. . . (3)
−x−2y+2z=−3. . . (4)
from 2, 3, 4
x=1,y=1,z=0,from (1)
so [AQ]=ηhsΔθ