vs). each segment has infinite bisectors Walkthrough: A bisector divides a line segment into two equal parts. A line can be of indefinite length, but any bisector that crosses the segment in a plane divides the segment into two equal parts. And it is also possible that there are infinite bisectors which can pass through the same bisector points at different angles to divide the line segment in a plane into equal parts of two. Therefore, each segment of a plane has multiple bisectors.
D Walkthrough: Using a compass, the point should rest on point B and draw a circle, repeat at point A. The two circles should meet and create a bisector.
Answer 6
The bisector of a segment is a line, a ray or a segment that intersects the segment in its middle. In a plane there are an infinite number of straight lines passing through each point, therefore in a plane there are an infinite number of bisectors of a segment. D. each segment has infinite bisectors
Each segment has an infinite number of midpoints Each segment has a perpendicular bisector Each segment has an infinite number of congruent segments
Each segment has a perpendicular line Walkthrough: Segments in a plane: The term “segment” is defined as a specific part that is cut out of a given figure, for example a spherical or circular figure through a plane or a line like one of the parts consisting of a “circular area” associated with an arc or its chord connected by two distinct planes or lines.
Answer 7
The correct options are; Every segment has a perpendicular bisector Every segment has infinitely many congruent segments Walkthrough: 1) Every segment in a plane has exactly one perpendicular bisector 2) A congruent segment is a segment of length equal to a given segment, given that there can be infinitely many planes that can contain collinear points, where two points define a segment, so the number of congruent segments that can be formed in infinite planes will be infinite. Also given that the number of possible segments is infinite, the number of segments of a given size, and therefore the number of possible congruent segments, is infinite.
I’m a little rusty on this, but I believe it’s C
your walkthrough D:
1. False 2. D 3. D 4. A
Answer 6
The bisector of a segment is a line, a ray or a segment that intersects the segment in its middle. In a plane there are an infinite number of straight lines passing through each point, therefore in a plane there are an infinite number of bisectors of a segment. D. each segment has infinite bisectors
The answer would be C) Each segment has infinite bisectors. Unless we have only one line segment, we should only have one bisector. But since a section of a plane is given, there must be infinite ways to cut the plane into two equal segments.
I’m a little rusty on this, but I believe it’s C
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