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Geometric Probability Brittany Crawford-Purcell. Bertrand’s Paradox “Given a circle. Find the probability that a chord chosen at random be longer than.

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Presentation on theme: "Geometric Probability Brittany Crawford-Purcell. Bertrand’s Paradox “Given a circle. Find the probability that a chord chosen at random be longer than."— Presentation transcript:

1 Geometric Probability Brittany Crawford-Purcell

2 Bertrand’s Paradox “Given a circle. Find the probability that a chord chosen at random be longer than the side of an inscribed equilateral triangle.”

3 Solution 1 We need to randomly choose 2 points on the circle. First point doesn’t matter, only the second point does. Make the first point fixed. Focus on the chords that extend from the fixed point

4 Solution 2 Chords are determined by midpoints. So, let’s focus on the midpoints. Circle inscribed into an equilateral triangle that is inscribed in a circle.

5 Area of small circle Area of large circle

6 Solution 3 Focus on the distance of the chord to the center of the circle The chord is greater than √3 (length of the side of the equilateral triangle) if the distance to the center of the circle is smaller than 1/2

7

8 Which is correct? Look at the distribution

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