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Find the area of the largest square contained by a circle of radius r = 1cm. Explain your answer and justify that it is correct. Hint: Use the pythagorean theorem.

User Danechkin
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1 Answer

23 votes
23 votes

Answer:

2 square cm

Explanation:

Given :

A square is inscribed in a circle whose radius is r = 1 cm

Therefore, the diameter of the circle is 2 r = 2 x 1

= 2 cm.

So the diagonal of the square is 2r.

Using the Pythagoras theorem, we find each of the side of the triangle is
$r \sqrt 2$.

Therefore, the area of the square is given by
$\text{(side)}^2$

=
$(r\sqrt 2)^2$


$= 2 r^2$


$= 2 (1)^2$


$=2 \ cm^2$

Hence the area of the largest square that is contained by a circle of radius 1 cm is 2 cm square.

User Godfather
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