Q&A

What is the probability that a triangle formed by three random points?

What is the probability that a triangle formed by three random points?

What is the probability that the triangle with vertices at these three points contains the center of the circle? Answer: 50\%.

What is the probability of the triangle formed by any 3 points on the circumference of a circle to contain the center of the circle?

1/4
The probability that the interior of the triangle determined by the three points picked at random on the circumference of a circle contains the origin is 1/4.

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What is the average area of a triangle?

So, the area A of a triangle is given by the formula A=12bh where b is the base and h is the height of the triangle. Example: Find the area of the triangle. The area A of a triangle is given by the formula A=12bh where b is the base and h is the height of the triangle.

What is the probability that three random points on a unit circle would form a triangle that includes the center of the unit circle?

There is a 1/4 chance that point C will fall in place to create a triangle which contains the center of the circle.

What is the total area of the three triangles?

The area of a triangle is defined as the total space occupied by the three sides of a triangle in a 2-dimensional plane. The basic formula for the area of a triangle is equal to half the product of its base and height, i.e., A = 1/2 × b × h.

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How many circles contain all the three points ABC?

Only 1 Circle containing all the three non collinear points A, B, C. There can only be one circle such that it contains all three non-collinear points.

What’s the probability that you randomly choose three points on a circle and these three points would be covered by a semi circle?

There are 3 points, thus three semi circles and the events that the all the points lie on a semi circle starting at each of the points are mutually exclusive. Therefore the probability is 3×122.

What is the average area of the triangle ABC?

Since the three points are chosen independently, the average area of the triangle ABC is: 3 2 π ≈ 0.47746. Since the answers from Alex Eustis and Klaus Grünbaum don’t agree, I decided to go ahead and write (what I regard as) a convincing Monte Carlo simulation which averages 10,000 areas on each run.

What is the probability that a triangle can be put together?

Point is uniquely and randomly determined by the two break points. If the points are distributed uniformly and chosen independently, the probability that a triangle can be put together from the three pieces is The stick is first broken into two pieces. The longest (or rather, not the shortest) is then broken into two.

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What is the central angle of AB on the unit circle?

The diagram above shows three randomly chosen points A, B, C on the unit circle. We choose a coordinate system so that the chord AB is perpendicular to the x-axis. The chord AB makes a central angle of 2 α, and the point C makes an angle of θ with the positive x-axis.