Geometry often presents fascinating problems that challenge our understanding of shapes and their relationships. In this blog post, we'll explore a problem involving a circle inscribed in a square and a smaller square inscribed within that circle. Let's dive into the details and find the area of the smaller square.
A circle inscribed a in square The radius of the circle is `r`. A smaller square is inscribed inside the circle with each of its sides touching the circle. If the area of larger square is `4r^2`. What is the area of the smaller square?
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Answer: `2r^2`
Explanation:
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