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Which step do the constructions of a regular hexagon, a square, and an equilateral triangle inscribed in a circle all have in
common?


A. Draw segments connecting all of the points of intersection on the circle.

B. Draw a line segment connecting the two points where the arc intersects the circle.

C. Construct a diameter using the center of the circle and the points where the small arc intersects the line segment.

D. Construct an arc using an endpoint of the diameter and the center of the circle.

Respuesta :

The common step to draw any polygon whether it is a hexagon, a square, and a equilateral triangle in a circle is constructing an arc using an end points of the diameter and the center of the circle

What is a cyclic polygon?

If a polygon is drawn in an circle so that every corner of the polygon lies on the circle, the polygon is called an inscribed polygon or cyclic polygon, and the circle is called circumcircle.

If we draw a hexagon, square and equilateral triangle in a circle.

Then all the corners of the polygon lies on the circle and are called cyclic polygon.

The common step to draw any polygon whether it is a hexagon, a square, and a equilateral triangle in a circle is constructing an arc using an end points of the diameter and the center of the circle.

Thus, option D is correct.

Find out more information about cyclic polygon here:

https://brainly.com/question/14309934

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