Let's chop off the tops and use some lettering: We want to find the area of trapezoid DEFG. The formula for the area of a trapezoid is Area = which with this choice of letters that formula becomes: Area = and we are given that EF = 3, so the formula further becomes Area = So we just need DE and FG The problem is done with similar triangles. ᐃDEC ∼ ᐃGFC ∼ ᐃABC AB = 4 (given) BC = BE+EF+FH+HC = 4+3+2+1 = 10, EC = EF+FH+HC = 3+2+1 = 6, FC = FH+HC = 2+1 = 3 Using ᐃDEC ∼ ᐃABC = = 10·DE = 4·6 10·DE = 24 DE = DE = 2.4 Using ᐃGFC ∼ ᐃABC = = 10·FG = 4·3 10·FG = 12 FG = FG = 1.2 Substituting in Area = Area = Area = Area = 5.4 cm² Edwin