Contents

- 1 What are the steps to construct parallel lines?
- 2 Which step is the same in the construction of parallel lines and the construction of a perpendicular?
- 3 Which step is included in the construction of perpendicular lines?
- 4 When constructing parallel lines How can you be sure the lines you constructed are parallel?
- 5 Do parallel lines intersect?
- 6 What happens to the draw parallel lines?
- 7 Which construction of parallel lines is justified by the theorem when two lines are intersected?
- 8 Why does the method for constructing parallel lines involve copying an angle?
- 9 Which step is included in the construction of parallel lines 5 points?
- 10 How do you construct a perpendicular line of a triangle?
- 11 How do you construct a perpendicular line through a point not on the line?
- 12 When constructing parallel lines with a compass and straightedge how should you start construction?
- 13 When constructing inscribed polygons and perpendicular lines How are the steps similar 2 points?
- 14 Which step is the same when constructing an inscribed square and an inscribed equilateral triangle?

## What are the steps to construct parallel lines?

**How to Construct Two Parallel Lines**

- The first thing you do is
**draw**a straight**line**. It can be any length. **Step**2:**Steps**Two & Three. Place the stylus of the compass on the point, and swing the compass down to make two marks on the**line**.**Step**3:**Step**Four & Five.- Connect these 3 points, and now you have 2
**parallel lines**!

## Which step is the same in the construction of parallel lines and the construction of a perpendicular?

**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**?

## Which step is included in the construction of perpendicular lines?

**Which step is included in the construction of perpendicular lines** using a point on the **line**? Make arcs above and below the given **line** with a compass.

## When constructing parallel lines How can you be sure the lines you constructed are parallel?

**When constructing parallel lines, how can you** verify the **lines constructed are parallel**? Check the intersecting **lines** with the corner of a piece of paper to ensure the **lines** create 90° angles. Check the distance along the **lines** at several places with a compass to ensure they are the same length.

## Do parallel lines intersect?

**Parallel lines** are **lines** in a plane that are always the same distance apart. **Parallel lines** never **intersect**.

## What happens to the draw parallel lines?

Answer. answer: the **lines** are shifted or displaced.

## Which construction of parallel lines is justified by the theorem when two lines are intersected?

When **two lines are intersected** by a transversal and alternate interior angles are congruent, the **lines** are **parallel**. When **two lines are intersected** by a transversal and the corresponding angles are congruent, the **lines** are **parallel**. 3 The diagram below shows the **construction** of through point P **parallel** to.

## Why does the method for constructing parallel lines involve copying an angle?

If corresponding **angles are** congruent, then **lines are parallel**. Because the copied **angle was** put in the location of the corresponding **angle**, the **construction** created congruent corresponding **angles**. Therefore, the two **lines** must be **parallel**. Use your straightedge to draw a **line** and a point like the one below.

## Which step is included in the construction of parallel lines 5 points?

Intersecting arcs are created and connected. **Which step is included in the construction of parallel lines**? Copy an angle by creating arcs with a compass.

## How do you construct a perpendicular line of a triangle?

**Constructing perpendicular lines**

- Place your compass on the given point (point P).
**Draw**an arc across the**line**on each side of the given point. - From each arc on the
**line**,**draw**another arc on the opposite side of the**line**from the given point (P). - Use your ruler to join the given point (P) to the point where the arcs intersect (Q).

## How do you construct a perpendicular line through a point not on the line?

**Construct a Perpendicular Line through a point Not on the line**

- Using the
**POINT**TOOL, mark**point**D on segment AB. - Using the COMPASS TOOL, create a circle with radius CD and center C.
- Using the
**POINT**TOOL, mark**point**F at the intersection of circle C and segment AB. - Using the COMPASS TOOL, create a circle with radius FD and center F.

## When constructing parallel lines with a compass and straightedge how should you start construction?

Measure the length of the original line and make an arc./ Create a line that intersects the given line with your **straightedge**./ Open the **compass** to the width of the line and draw two arcs./ Use a **straightedge** to create two arcs above and below the line.

## When constructing inscribed polygons and perpendicular lines How are the steps similar 2 points?

**When constructing inscribed polygons and perpendicular lines how are the steps similar**? Intersecting arcs are created and connected. What is the first **step when constructing** parallel **lines**? You just studied 10 terms!

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

Explanation: when **constructing an inscribed square and an inscribed equilateral triangle**, the most important **step** and which turns out to be **same** for both procedures is the constructio of of a circle of an arbitrary radius. Because it’s is within this circle both the **triangle** and **square** would be drawn.