Answer to Question #217358 in Geometry for Dominik

Question #217358

Let's consider a circle in the plane with radius r and on it a rope AB at a distance r/2 from the center. Let C be a point of the minor arc AB. So the angle ACB...

A. measures 60^0

B. measures 120^0

C. has a measure that depends on the position of C

Expert's answer

Let "SO" be the distance from the line segment "AB" to the center of the circle "O", then "SO \\perp AB", hence, by the Pythagorean theorem, "AB=2AS=\\sqrt{AO^2-SO^2}=\\sqrt{r^2-\\frac{1}{4}r^2}=r\\sqrt{3}".

By the cosine theorem

"\u2312ACB=\\angle{AOB}=\\arccos{\\bigg(\\dfrac{AO^2+BO^2-AB^2}{2\u00d7AO\u00d7BO}\\bigg)}=\\arccos{\\bigg(\\dfrac{-r^2}{2r^2}\\bigg)}=\\arccos{(-0.5)}=120\\degree"

Answer is B.

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Answer to Question #217358 in Geometry for Dominik

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