Find the area of the largest rectangle that can be inscribed in a right triangle

garnentas3m

garnentas3m

Answered question

2021-12-11

Find the area of the largest rectangle that can be inscribed in a right triangle with legs of lengths 3 cm and 4 cm if two sides of the rectangle lie along the legs.

Answer & Explanation

Melinda McCombs

Melinda McCombs

Beginner2021-12-12Added 38 answers

Step 1

Step 2
Let x and y be the side lengths of the rectangle, then the area is
A=xy
and by similar triangles (ABC and FBE, note: BF is 3y)
x4=3y3
3x4=3y
3x43=y
y=334x
Step 3
Substitute for y in the area equation, find A
A=x(334x)=3x34x2
A=332x
Find where it is 0
0=332x
32x=3
x=2
Step 4
Find te corresponding y (with the similar triangle equation)
y=334(2)=332=632=32
So the maximum rectangle area is
A=232=3cm2
Becky Harrison

Becky Harrison

Beginner2021-12-13Added 40 answers

Step 1
The largest possible rectangle must have a vertex that touches the hypotenuse of the triangle at one point.
Let us put the right angle of the triangle at the point (0,0), another vertex at (8,0) and the final vertex at (0,3)
We can represent points on the hypotenuse parametrically as:
(8t, 3(1t))
where t[0,1]
Then the area of the rectangle with vertices:
(0,0),(8t,0),(8t,3(1t)),(0,3(1t)) is:
f(t)=8t3(1t)=24t(1t)=24(tt2)=24(14(t12)2)
This takes its maximum value when t=12 and f(t)=2414=6

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