Problem:
In the diagram below, ABCD is a square. Point E is the midpoint of AD. Points F and G lie on CE, and H and J lie on AB and BC, respectively, so that FGHJ is a square. Points K and L lie on GH, and M and N lie on AD and AB, respectively, so that KLMN is a square. The area of KLMN is 99. Find the area of FGHJ.
Solution:
Let AE=s, so CD=2s, and CE=5βs. Note that β³CDE,β³JFC,β³HBJ, β³NKH, and β³MAN are similar to each other. Let x=FG and y=KL. Then 2s=BC=BJ+JC=5βxβ+2x5ββ, so x=5β1β+25ββ2sβ=745βsβ. Then AH=2sβHB=2sβ5β2xβ=76sβ. Hence 76sβ=AH=AN+NH=5βyβ+2y5ββ, so y=5β1β+25ββ76sββ=49125βsβ. The ratio of the areas of squares FGHJ and KLMN is (yxβ)2=(49125βsβ745βsββ)2=949β. Thus if square KLMN has area 99, square FGHJ has area 99β 949β=539β.
OR
With x and y defined as above, note that AN+NH+HB=BJ+JC so
