An isosceles right triangle is inscribed in a square. Its hypotenuse is a mid se

Question

An isosceles right triangle is inscribed in a square. Its hypotenuse is a mid segment of the square. What is the ratio of the square’s area to the triangle’s area?

Options:

A . 1:2

B . 1:3

C . 4:1

D . none of these

Answer: Option C
:
C

Graphical Division: -

Assume the square to have a side 2a. Hence, area of square = 4a $^{2}$

Using graphical division, we can divide the figure into 8 parts as follows. The triangle in question is the shaded part

Thus the triangle is $\frac{2}{8}$ $^{t h}$ of the square area

Hence ratio = 1:4

Shortcut:- Assumption method. Assume a simple case as the isosceles triangle and square in this case. Just substitute and solve

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