0
What else can I help you with?
To find a segment parallel to another segment and through a given point using paper folding techniques requires two steps.?
To find a segment parallel to another segment through a given point using paper folding techniques, first, fold the paper so that the given point aligns with one endpoint of the original segment. Next, fold the paper again to create a crease that intersects the original segment, ensuring that the distance between the two segments remains constant, thus establishing a parallel segment through the given point.
To find a segment parallel to another segment and through a given point fold a piece of paper so that the fold goes through the point and the pieces of the segment on either side of the fold match up?
False
To find a segment parallel to another segment and through a given point fold a piece of paper so that the fold goes through the point and the pieces of the segment on either side of the fold match y?
False
What are two different type of circles?
Two different types of circles are the circumcircle and the incircle. A circumcircle is the circle that passes through all the vertices of a polygon, while an incircle is the circle that is tangent to each side of the polygon, fitting snugly inside it. Both types of circles are important in geometry, especially in the study of triangles and polygons.
What intersects at least 2 other lines in geometry?
How about the diagonals of a polygon or a transversal line cutting through parallel lines.
Which parallel of latitude are great circles?
All parallels of latitude, except for the Equator, are not great circles. Great circles are the largest circles that can be drawn on a sphere and pass through its center, whereas small circles do not pass through the center of the sphere.
To find a segment parallel to another segment and through a given point using paper folding techniques requires two steps.?
To find a segment parallel to another segment through a given point using paper folding techniques, first, fold the paper so that the given point aligns with one endpoint of the original segment. Next, fold the paper again to create a crease that intersects the original segment, ensuring that the distance between the two segments remains constant, thus establishing a parallel segment through the given point.
To find a segment parallel to another segment and through a given point fold a piece of paper so that the fold goes through the point and the pieces of the segment on either side of the fold match up?
False
To find a segment parallel to another segment and through a given point fold a piece of paper so that the fold goes through the point and the pieces of the segment on either side of the fold match y?
False
To find a segment parallel to another segment and through a given point fold a piece of paper so that the fold goes through the point and the pieces of the segment on either side of the fold match?
The answer is FALSE i just did it on
What are two different type of circles?
Two different types of circles are the circumcircle and the incircle. A circumcircle is the circle that passes through all the vertices of a polygon, while an incircle is the circle that is tangent to each side of the polygon, fitting snugly inside it. Both types of circles are important in geometry, especially in the study of triangles and polygons.
What is a straight line through a circle not going through the middle?
a chord. i took geometry this year. here are some other things that way help. Circle- a set of points that are equidistant from the center of the circle Diameter- a line segment that passes through the center point and has its endpoints on the circle. Radius- a line segment that connects from the center point to the circle Chord- a line segment that has its endpoints on the circle. Arc- a section of the circle's outer points. Semicircle- half of a circle. Central Angle- an angle that has its' vertex as the center point of the circle. Inscribed Polygon- a polygon that has all its' vertexes on the circles outer points. kk :-)
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 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
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
To find a segment parallel to another segment and through a given point fold a piece of paper so that the fold goes through the point fold a piece of paper so that thefold goes through the point?
true
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)
