The side length of an inscribed regular hexagon is equal to the radius of the circle
The best statement for Maricela to write for Step 3 is the option;
- Without changing the width of the compass, put the compass point at the marked point, then draw an arc that intersects the circle in two places
Reason:
A hexagon is a six sided figure, and a regular hexagon has six equal sides
The steps of constructing a hexagon in a circle is given as follows;
- Mark a point on the circle, which is to be a vertex of the hexagon
- Set the compass to the length of the radius of the given circle, and from the marked point, draw an arc crossing the circumference of the circle
- Place the compass on the next vertex and draw another arc
- Repeat the process until the circle is marked round with six vertices
- With the straightedge, draw lines connecting the points of the vertices
The best statement for Marcela to write for Step 3 is therefore;
Without changing the width of the compass, put the compass point at the marked point, then draw an arc that intersects the circle in two places
Learn more about constructing a regular hexagon inscribed in a circle here;
https://brainly.com/question/11833289
