Exercises: Construct Regular Polygons Inscribed in a Circle

A regular hexagon is inscribed in a circle. What is the central angle subtended by each side of the hexagon?

Triangle $OAB$ is drawn with center $O$ and two adjacent hexagon vertices $A$ and $B$ on a circle of radius $r$. All three sides equal $r$. What type of triangle is $OAB$?

A polygon is inscribed in a circle. What must be true about all vertices of the polygon?

To construct a regular hexagon inscribed in a circle of radius $r$, you first draw the circle and mark a starting point $A$. What compass setting do you use to mark the first new vertex $B$ on the circle?

A student constructs a hexagon by walking the compass around the circle. After marking 3 vertices correctly with the compass set to the radius $r$, she resets the compass to a shorter width before marking the remaining vertices. Which statement best identifies her error?

To construct a square inscribed in a circle, you first draw a diameter $AB$. What is the correct next step?

A regular hexagon $ABCDEF$ is inscribed in a circle. Which set of vertices, when connected, forms an equilateral triangle inscribed in the same circle?

A regular hexagon is inscribed in a circle of radius 5 cm. What is the side length of the hexagon?

When all the radii from center $O$ to the six vertices of an inscribed regular hexagon are drawn, how many equilateral triangles are formed inside the hexagon?

A student wants to construct an equilateral triangle inscribed in a circle using the hexagon method. After constructing the regular hexagon with vertices $A$, $B$, $C$, $D$, $E$, $F$, which vertices should she connect to form the equilateral triangle?

A square is inscribed in a circle of radius $r$. What is the side length of the square?

An equilateral triangle, a square, and a regular hexagon are all inscribed in the same circle of radius $r$. Their side lengths are $r\sqrt{3}$, $r\sqrt{2}$, and $r$, respectively. Order these three polygons from shortest to longest side length, and describe the pattern you observe as the number of sides increases.

What is the side length of this square, to the nearest tenth of a meter?

Who is correct? State the correct side length and explain why using the geometric property of the hexagon construction.

Which statement best identifies the student's error?

Which statement correctly identifies the error in the student's claim?

A regular hexagon $ABCDEF$ is inscribed in a circle of radius 10. Vertices $A$, $C$, and $E$ are connected to form an inscribed equilateral triangle. Using the Law of Cosines (or another method), find the exact length of diagonal $AC$. Express your answer in simplest radical form.

The perimeters of three regular polygons inscribed in a circle of radius $r$ are: equilateral triangle $= 3r\sqrt{3} \approx 5.20r$, square $= 4r\sqrt{2} \approx 5.66r$, and hexagon $= 6r$. The circumference of the circle is $2\pi r \approx 6.28r$. Explain what this pattern reveals about the relationship between regular polygons and circles, and how Archimedes used this idea to approximate $\pi$.