Answer:
The largest possible area would be 18 square cm.
Step-by-step explanation:
Given,
ABC is a right triangle,
Having legs,
AB = 8 cm, AC = 9 cm,
Also, points D, E and F belong to the sides AB, BC and CA, respectively
Such that we obtain a rectangle ADEF,
Since, Δ BDE is similar to Δ BAC,
( by AA similarity postulate, because ∠BDE ≅ ∠BAC, both are right angles and ∠DBE ≅ ∠ABC, both are same angles )
∵ Corresponding sides of similar triangle are proportional,
I.e. [tex]\frac{BD}{AB}=\frac{DE}{AC}[/tex]
Let AD = x ⇒ BD = 8 - x
By substituting the values,
[tex]\frac{8-x}{8}=\frac{DE}{9}[/tex]
[tex]\implies DE=\frac{9}{8}(8-x)[/tex]
Thus, the area of the rectangle ADEF would be,
[tex]A(x) = AD\times DE[/tex]
[tex]\implies A(x) = x(\frac{9}{8}(8-x))=\frac{9}{8}(8x-x^2)[/tex]
Differentiating with respect to x,
[tex]A'(x) = \frac{9}{8}(8-2x)[/tex]
Again differentiating w.r.t. x,
[tex]A''(x) = \frac{9}{8}(-2)=-\frac{9}{4}[/tex]
For maxima or minima,
A'(x) = 0
[tex]\implies \frac{9}{8}(8-2x)=0[/tex]
[tex]\implies 8-2x=0[/tex]
[tex]\implies x = 4[/tex]
At x = 4, A''(x) = negative,
Hence, the area would be maximum if x = 4,
The maximum area of the rectangle ADEF,
[tex]A(4) = \frac{9}{8}(8\times 4-(4)^2)=\frac{9}{8}(32-16)=\frac{9}{8}\times 16=9\times 2=18\text{ square cm}[/tex]
