1 Answer

Bendrix · Answer 1 · 2023-07-23T02:05:12+0000

Since the gry triangle is the folded part of the paper which has dimensions

$\begin{gathered} L=x+y \\ W=x+(1)/(2)d(\text{small square)} \end{gathered}$

L is the length

x is the side of the small square

y is the side of the big square

d is the diagonal of the small square

The relation between the side of a square and its diagonal is

$d=s\sqrt[]{2}$

s is the side of the square

d is its diagonal

Since p Is the center of the small square, then

The side PQ = 1/2 the diagonal

Since the side of the small square is x, then its diagonal is

$d=x\sqrt[]{2}$

From here we know that

The base of the gry triangle is PQ which equal to

$\begin{gathered} PQ=(1)/(2)x\sqrt[]{2} \\ PQ=\frac{\sqrt[]{2}}{2}x \end{gathered}$

The height of the triangle RP is equal to the length of the unfolded figure which is

The formula of the area of a triangle is

Substitute the base by PQ and the height by PR

$\begin{gathered} A=(1)/(2)(\frac{\sqrt[]{2}}{2}x)(x+y) \\ A=\frac{\sqrt[]{2}}{4}x(x+y) \end{gathered}$

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