RMD007 wrote:
A Circle, with its radius an integer, is inscribed in a square. What is the probability that a point randomly chosen inside the square will lie outside the circle?
1. Side of the square is a prime number.
2. Another square inscribed in the circle has side \(\sqrt{2}\)
You don't need any statements to answer the question. The area of the circle is π r^2, and the area of the square is (2r)^2 = 4r^2, since the diameter of the circle is equal in length to a side of the square, if the circle is inscribed
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