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To construct a parallel to a line through a point not on the line using paper folding you can perform the ----- construction twice?
perpendicular line segment (apex)
If you repeat the perpendicular line segment construction twice using paper folding what can you construct?
~APEX~ A parallel line through a point not on the line
What can you construct if you repeat the perpendicular line segment construction twice using paper folding?
~APEX~ A parallel line through a point not on the line
To find the midpoint of a segment first mark a point not on the segment and then fold the paper so that the point you marked and a point on the line are included in the fold.?
To find the midpoint of a segment using paper folding, start by marking a point off the segment. Then, fold the paper so that this marked point aligns with one endpoint of the segment, causing the other endpoint to lie on the crease. The crease created by the fold represents the perpendicular bisector of the segment, and where it intersects the segment is the midpoint. Unfolding the paper will reveal this point clearly.
How do you find a midpoint segment using the paper folding technique?
To find a midpoint segment using the paper folding technique, first, fold the segment in half so that the endpoints meet. Crease the paper firmly along the fold to create a clear line. Unfold the paper, and the crease will indicate the midpoint of the original segment. You can then mark this point for your reference.
Can You can find a perpendicular line segment from a point to a line using the folding paper technique?
Yes, I can.
What if you repeat the perpendicular line segment construction twice using paper folding you can construct?
You can construct a parallel to a line through a point not on the line. (perpendicular line segment)
What constructions can be accomplished with paper folding?
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
What constructions can be accomplished paper folding?
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
What constructions can be accomplishments with paper-folding?
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
Using paper folding to construct a line perpendicular to a given line through a point fold the paper through the point so that the given line segment lies?
upon itself
To construct a parallel to a line through a point not on the line using paper folding you can perform the ----- construction twice?
perpendicular line segment (apex)
If you repeat the perpendicular line segment construction twice using paper folding what can you construct?
~APEX~ A parallel line through a point not on the line
What can you construct if you repeat the perpendicular line segment construction twice using paper folding?
~APEX~ A parallel line through a point not on the line
If you repeat the perpendicular line segment construction twice using paper folding, you can construct?
~APEX~ A parallel line through a point not on the line
To find a segment parallel to another segment and through a given point using paper folding techniques requires two steps The first step is to find a line perpendicular to the given segment and passi?
true
To find the midpoint of a segment first mark a point not on the segment and then fold the paper so that the point you marked and a point on the line are included in the fold.?
To find the midpoint of a segment using paper folding, start by marking a point off the segment. Then, fold the paper so that this marked point aligns with one endpoint of the segment, causing the other endpoint to lie on the crease. The crease created by the fold represents the perpendicular bisector of the segment, and where it intersects the segment is the midpoint. Unfolding the paper will reveal this point clearly.
