![Vettoriale Stock Cartoon stick drawing conceptual illustration of man or businessman standing up to neck in water watching broken pipe and thinking about the leaking problem solution unable to solve it. Vettoriale Stock Cartoon stick drawing conceptual illustration of man or businessman standing up to neck in water watching broken pipe and thinking about the leaking problem solution unable to solve it.](https://as2.ftcdn.net/v2/jpg/02/41/38/13/1000_F_241381389_QlzoxhhQ1AcKMTDgSAwDo5ZpCjCRug0B.jpg)
Vettoriale Stock Cartoon stick drawing conceptual illustration of man or businessman standing up to neck in water watching broken pipe and thinking about the leaking problem solution unable to solve it.
![pr.probability - If you break a stick at two points chosen uniformly, the probability the three resulting sticks form a triangle is 1/4. Is there a nice proof of this? - MathOverflow pr.probability - If you break a stick at two points chosen uniformly, the probability the three resulting sticks form a triangle is 1/4. Is there a nice proof of this? - MathOverflow](https://i.stack.imgur.com/9MqM2.png)
pr.probability - If you break a stick at two points chosen uniformly, the probability the three resulting sticks form a triangle is 1/4. Is there a nice proof of this? - MathOverflow
![pr.probability - If you break a stick at two points chosen uniformly, the probability the three resulting sticks form a triangle is 1/4. Is there a nice proof of this? - MathOverflow pr.probability - If you break a stick at two points chosen uniformly, the probability the three resulting sticks form a triangle is 1/4. Is there a nice proof of this? - MathOverflow](https://math.mit.edu/~shor/MO/triangle.jpg)
pr.probability - If you break a stick at two points chosen uniformly, the probability the three resulting sticks form a triangle is 1/4. Is there a nice proof of this? - MathOverflow
![Classic Probability Problem #1: Broken Sticks, Triangles, and Probability | by Andrew Rothman | Towards Data Science Classic Probability Problem #1: Broken Sticks, Triangles, and Probability | by Andrew Rothman | Towards Data Science](https://miro.medium.com/v2/resize:fit:580/1*JhVWc8Yq4reG0qC-aAX_6A.png)
Classic Probability Problem #1: Broken Sticks, Triangles, and Probability | by Andrew Rothman | Towards Data Science
![reference request - Probability that a stick randomly broken in five places can form a tetrahedron - MathOverflow reference request - Probability that a stick randomly broken in five places can form a tetrahedron - MathOverflow](https://i.stack.imgur.com/HBhGL.jpg)
reference request - Probability that a stick randomly broken in five places can form a tetrahedron - MathOverflow
![SOLVED: Problem 7: Probability and Geometry A stick of length 1 is broken into two pieces of length Y and 1 - Y respectively, where Y is uniformly distributed on [0, 1]. SOLVED: Problem 7: Probability and Geometry A stick of length 1 is broken into two pieces of length Y and 1 - Y respectively, where Y is uniformly distributed on [0, 1].](https://cdn.numerade.com/ask_images/848687e836514df4ad66a6df06fa976f.jpg)
SOLVED: Problem 7: Probability and Geometry A stick of length 1 is broken into two pieces of length Y and 1 - Y respectively, where Y is uniformly distributed on [0, 1].
![Classic Probability Problem #1: Broken Sticks, Triangles, and Probability | by Andrew Rothman | Towards Data Science Classic Probability Problem #1: Broken Sticks, Triangles, and Probability | by Andrew Rothman | Towards Data Science](https://miro.medium.com/v2/resize:fit:772/1*SActZEgZTgfijgE9aThFBA.png)