true
You can
Yes, I can.
You can construct a parallel to a line through a point not on the line. (perpendicular line segment)
true
Because you would need an infinite length of paper to print out the ticket.
If you have one angle, you can draw two line segments that meet at that angle. Then, rotate your paper 180 degrees, and repeat, ensuring that the new lines are parallel to the existing ones, and eventually intersect them. You now have a parallelogram.
Yes, you can bisect an angle using the paper folding technique.
Folding at right angles.
In most cases it will not.
The word for folding a piece of paper back and forth is "accordion fold" or "fan fold." This technique creates a series of parallel folds that resemble the folds of an accordion or a fan.
true
Yes, I can.
Finding the midpoint of a segment Drawing a perpendicular line segment from a given point to a given segment Drawing a perpendicular line segment through a given point on a given segment Drawing a line through a given point parallel to a given line
Finding the midpoint of a segment Drawing a perpendicular line segment from a given point to a given segment Drawing a perpendicular line segment through a given point on a given segment Drawing a line through a given point parallel to a given line
Finding the midpoint of a segment Drawing a perpendicular line segment from a given point to a given segment Drawing a perpendicular line segment through a given point on a given segment Drawing a line through a given point parallel to a given line
Finding the midpoint of a segment Drawing a perpendicular line segment from a given point to a given segment Drawing a perpendicular line segment through a given point on a given segment Drawing a line through a given point parallel to a given line
True:)
Fold the paper so the line is on itself. Fold this folded edge on itself causing a crease to form that goes through the point in question, You are using the theorem that lines perpendicular to the same line are parallel.