## How do you construct an inscribed regular hexagon using technology?

## Which step is the same when constructing an inscribed regular hexagon and an inscribed equilateral triangle?

Which step is the same when constructing an inscribed regular hexagon and an inscribed equilateral triangle? **Set the compass width to the radius of the circle**. Which of the following steps is included in the construction of a perpendicular line through a point on a line?

## How do you construct an inscribed equilateral triangle using technology?

## When constructing an inscribed regular hexagon what steps come after six arcs are created on the circle?

When constructing an inscribed regular hexagon what steps come after six arcs are created on the circle? c. **Connect every intersection of an arc and the circle with a segment.**

## What is a step in the construction of an inscribed regular hexagon?

**sets the compass width to that radius and then steps that length off around the circle to create the six vertices of the hexagon**.

## What is the difference between constructing a regular hexagon and constructing an equilateral triangle?

What is the difference between constructing a regular hexagon and an equilateral triangle? Answer :-For **the hexagon construction every arc along the circle is connected** but for the equilateral triangle construction every other arc along the circle is connected.

## When constructing an inscribed square what step comes?

When constructing an inscribed square by hand which step comes after constructing a circle? **Set compass to the diameter of the circle.** **Set compass to the radius of the circle.** **Use a straightedge to draw a diameter of the circle.**

## When constructing an equilateral triangle what step comes after six arcs are created on the circle?

When constructing an equilateral triangle what step comes after six arcs are created on the circle? **Connect every other intersection of an arc and the circle with a segment.**

## What are the steps in constructing equilateral triangle in constructing equilateral triangle?

## When constructing an inscribed equilateral triangle How many arcs will be drawn?

Explanation of method

Since the hexagon construction effectively divided the circle into six equal arcs by using every other point we divide it into **three equal arcs** instead. The three chords of these arcs form the desired equilateral triangle.

## What should be drawn first in constructing an equilateral triangle?

**equilateral triangle given the length of one side**and the other two will be to construct an equilateral triangle inscribed in a circle.

## When constructing an inscribed regular hexagon and you are given a point on the circle How many arcs will be drawn on the circle 6 points?

Move the compass point to the intersection point of the arc and the circle. Without changing the compass width draw another arc. Continue this process until you are back to the original point. There should be **6 arcs drawn**.

## What is the next step to inscribe a regular hexagon in circle O below?

What is the next step to inscribe a regular hexagon in Circle O below? **With compass point at A construct an arc of length OA intersecting the circle.** **At point A draw an obtuse angle.** **Through the center O draw five more radii.**

## Which of these is a correct step in constructing an angle bisector?

The correct option is: C. **Use a compass to draw two equal arcs from the intersection points of a previous arc and the legs**. Keep in mind that this is the penultimate step in the construction of the bisector.

## What polygon Cannot be used to form a regular tessellation?

Regular tessellation

We have already seen that **the regular pentagon** does not tessellate. A regular polygon with more than six sides has a corner angle larger than 120° (which is 360°/3) and smaller than 180° (which is 360°/2) so it cannot evenly divide 360°.

## What is inscribed hexagon?

The regular hexagon is inscribed **in a circle of radius r**. … By joining opposite sides of the hexagon it forms six (6) central angles at centre O each of which =360∘6=60∘. And you see the six triangles are formed. The two sides of each triangle are the radius of the circle and thus are equal.

## What are the steps for using a compass and straightedge to construct an equilateral?

## Which step is the same in the construction of parallel lines and the construction of a perpendicular line to a point off a line?

Which step is the same in the construction of parallel lines and the construction of a perpendicular line to a point off a line? **Create a line that intersects the original line**. When constructing a perpendicular line through a point off a line how can you verify that the lines constructed are perpendicular?

## When constructing a perpendicular line through a point of a line?

**How to Construct a Perpendicular Line through a Point on the Given Line?**

- Open the compass to a radius less than half the segment.
- Draw two arcs intersecting the line on both sides of the point.
- Draw two arcs using the intersection points as the centers. …
- Construct a line between this point and the original point.

## How do you construct a square inside a circle?

## How do you inscribe a hexagon?

## When constructing an inscribed square how many lines will be drawn in the circle?

**two lines**drawn in the circle.

## What is a square inscribed in a square?

**all of the smaller square’s vertices lies on the boundaries of the larger square**. Notice that for this to happen the smaller square’s vertices will divide each side of the larger square into two segments the same on each side.

## Which of these is likely to be his next step in constructing a parallel line?

Which of these is likely to be his next step in constructing the parallel line? Without changing the width of the compass place the compass at Q **and draw an arc similar to the one drawn**.

## Which of these is a correct step in constructing congruent line segments?

Two line segments are said to be congruent if they have the same length. They need not be parallel to each other. Congruent line segments can be constructed by **using a compass and a straightedge**.

## How do you inscribe three circles in an equilateral triangle?

## What is the second step in constructing equilateral triangle?

**Steps**

- Start by drawing the base of the triangle as a line with two end points.
- Using a compass place the spike of the compass at one point and the drawing tip at the second point and draw an arc upwards.
- Repeat the step above for the other point.
- Draw a dot at the point where the two arcs intersect.

## Which of the following is not a regular polygon?

C) **Rectangle** : The opposite sides are equal but the adjacent sides are not equal and each interior angle is of . so that a rectangle is not a regular polygon. Hence Rectangle is not a regular polygon.

## What must you be given to construct an equilateral triangle by Compass Mcq?

What must you be given to construct an equilateral triangle by compass? Explanation: An equilateral triangle is one which has all three sides **of the** same length. For the figure given below with centres P and Q and radius equal to PQ draw arcs intersecting each other at R. After this draw lines joining R with P and Q.

## How do you construct an inscribed circle in a isosceles triangle?

## What is the area of an equilateral triangle inscribed in a circle?

**12cm2**.

## How do you find the length of the sides of a regular hexagon inscribed in the circle?

**s = 2x = 2 (r sin θ)**.

## When constructing an equilateral triangle by hand which step comes after constructing a circle?

When constructing an equilateral triangle by hand which step comes after constructing a circle? **Set compass to the radius of the circle**. You just studied 10 terms!

## What must be given to construct an equilateral triangle?

**all three sides the same length**. It begins with a given line segment which is the length of each side of the desired equilateral triangle. It works because the compass width is not changed between drawing each side guaranteeing they are all congruent (same length).

## CONSTRUCTING INSCRIBED AND CIRCUMSCRIBED HEXAGON

## How to construct a Inscribed Hexagon

## Inscribed Hexagon Construction

## Constructing Regular Hexagons