This solution is from Etienne of Parramatta Highschool, NSW
Australia
I need to prove the area of a triangle $ A $ is given by $ A = rs $
where $ r $ is the radius of the incircle (inscribed circle) and $
s$ is the semi-perimeter (half the perimeter $ (a+b+c)/2$). Let $ a
$, $ b $, $ c $ be the lengths of the sides of triangle $ ABC $.
Join the incentre I of the triangle to the 3 corners. From I drop 3
perpendiculars to each of the sides, each of these has a length of
$ r $. The areas of $ ABI $, $ BCI $, $ CAI $ are $ cr/2 $, $ ar/2
$ and $ br/2 $ respectively. They sum up to give the area of
triangle $ ABC $
Area of $ ABC = cr/2 + ar/2 + br/2 = r(a+b+c)/2 = rs $.
Back to the question!
When $ P $ is the midpoint of $ AD, r_1 = r_2 $ because they sit on
congruent triangles. The area of triangle $ ABP = AP \times AP/2 =
1/4. PB = \sqrt(1+1/4) = \sqrt5/2. $
The semi perimeter of $ ABP = (1 + 1/2 + \sqrt5/2)/2 =
[3+\sqrt5]/4. $ Using the formula $ A = rs $ for the area of the
triangle, the area of $ ABP = r_1[3+\sqrt5]/4 = 1/4. $ This gives $
r_1 = 1/[3 + \sqrt5] = [3 - \sqrt5]/4 $ so $ r_1 = r_2 = [3 -
\sqrt5]/4. $
The area of BPC is 1 - 1/4 - 1/4 = 1/2 and $ PB = PC = \sqrt5/2. $
The semi-perimeter of $ BPC = [1+ \sqrt5/2 + \sqrt5/2]/2 = [1 +
\sqrt5]/2. $ From the area of triangle $ BPC $ we get $ r_3[1 +
\sqrt5]/2 = 1/2 $ so $ r_3 = 1/[1 + \sqrt5] = [\sqrt5 - 1]/4. $
Now suppose the lengths AP and PD are $ 1-p $ and $ p $. The area
of $ APB = (1-p)/2. $ The length $ PB = \sqrt(1 + p^2 - 2p + 1) =
\sqrt(p^2 - 2p + 2) $ and the semi perimeter of $ APB = [1 + (1-p)
+ \sqrt(p^2 - 2p + 2)]/2.$ So, using the area formula again,
$$ r_2 = {1-p\over 2} \times {2\over [2 - p + \sqrt(p^2 - 2p + 2)]}
= {1\over 2}[2 - p - \sqrt(p^2 - 2p + 2)]. $$
Similary with $ DPC $. The area of $ DPC = p/2 $ and the length $
PC = \sqrt(p^2 + 1). $ The semi perimeter of $ PC = [1 + p +
\sqrt(p^2 + 1)]/2. $ So
$$ r_1 = {p\over 2} \times {2\over [1 + p + \sqrt(p^2 + 1)]} =
{1\over 2}[1 + p - \sqrt(p^2 + 1)]. $$
Similarly $$ r_3 = {1\over 2} \times {2\over [1 + \sqrt(p^2 + 1) +
\sqrt(p^2 -2p + 2)]} = {1\over 2}[1 + \sqrt(p^2 + 1) - \sqrt(p^2
-2p +2)][\sqrt(p^2 +1)- p]. $$
To finish this question you need to use the formulae found above
which give the radii $ r_1 $, $ r_2$ and $ r_3 $ in terms of $ p $
and then consider how these values change as $ p $ varies from $0$
to $1$. For example $ r_1 $ varies from $0$ to approximately
$0.293$ as $ p $ increases from $0$ to $1$. In order to discover
whether the ratio of the radii $ r_1 : r_2 : r_3 $ can ever take
the value $1 : 2 : 3$ you could plot on the same axes the graphs of
$ r_1 $, $ r_2 $ and $ r_3 $ as $ p $ varies from $0$ to $1$.