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Puzzle #33

An arbelos with the distance between two points in a tangent line to the two smaller semicircles. The distance is showed as a double arrow labeled/labelled four.

In an arbelos, the distance between two points lying in a tangent line to the two smaller semicircles is 4.

What is it exact area?

Solution

The distance between the two tangent points is 4.

Then the vertical line segment with endpoints the point of intersection between the two smaller semicircles and the point of intersection between the line segment and the big semicircle has also length 4.

An arbelos with the distance between two points in a tangent line to the two smaller semicircles. The distance is showed as a double arrow labeled/labelled four. The distance between the point of intersection of the two smaller semicircles and the point of intersection of the vertical line passing through the first point and the big semicircle is represented by a double arrow labeled/labelled four.

The four endpoints of the two line segments are concyclic, i.e., lie in the circle of diameter 4.

An arbelos and a circle passing through the point of intersection between the two smaller semicircles. A double arrow labeled/labelled four represents the diameter of the circle.

The area of the arbelos is equal to the area of the circle with radius 2.

So, the area of the arbelos is

(2)2π\left(2\right)^2\pi
4π4\pi

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