Give a geometric description of the transformation w =A(z+B) where A and B are complex constants and A is not equal to 0 Solution let z=x+iy.now consider the transformation in two steps. let B=k+il z+B=p=x+k+i(y+l)...(1) in other words x becomes x+k and y becomes y+l.hence the first transformation translates the given curve by k units to the left and by l units down. let A=Rei and z+B=rei A(z+B)=Rrei(+)...(2) Hence z+B is now rotated by an angle and magnified by R units by the second transformation. So,the given transformation can be geometrically interpreted as translation,rotation and magnification of the curve given by z. give rating please....