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If a and b are two points in the plane the perpendicular bisector of a B is the set of all points equidistant from a and b true or false?
True. The perpendicular bisector of the segment connecting points ( a ) and ( b ) is defined as the set of all points that are equidistant from both ( a ) and ( b ). This line is perpendicular to the segment at its midpoint and ensures that any point on this line maintains equal distance to both endpoints.
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The ancient Greeks were not able to construct a perpendicular bisector for a given line segment using only a straightedge and compass?
FALSE
Is all points on a circle equidistant from the center.True or False?
True, if its not then its an elipse (oval)
The ancient Greeks were able to construct a perpendicular bisector for a given on segment using a straight edge and compass true or false?
True
is this statement true or false If you fold the paper so that A matches up with B and then creases the paper, the line formed by the crease is the perpendicular bisector of AB.?
true
True or false A parallelogram is a quadrilateral in which opposite sides are perpendicular?
false
Is it true or false If R And S Are Two Points In The Plane The Perpendicular Bisector Of RS Is The Set Of All Points Equidistant From R And S?
True
Is the assumption that is a perpendicular bisector of is not enough to show that YXZ Yaz?
This statement is false. A perpendicular bisector is not enough to make the statement true.
Is this True or false the angle bisector of the vertex angle of an isosceles triangle is also the perpendicular bisector of the base?
True
The ancient Greeks were not able to construct a perpendicular bisector for a given line segment using only a straightedge and compass?
FALSE
Is all points on a circle equidistant from the center.True or False?
True, if its not then its an elipse (oval)
Did the ancient Greeks require a straightedge and protractor to construct a perpendicular bisector for a given line segment?
True
The ancient Greeks were able to construct a perpendicular bisector for a given on segment using a straight edge and compass true or false?
True
Were The ancient Greeks required a straightedge and protractor to construct a perpendicular bisector for a given line segment?
false apex The Greeks used a straightedge and a compass
is this statement true or false If you fold the paper so that A matches up with B and then creases the paper, the line formed by the crease is the perpendicular bisector of AB.?
true
The point of concurrency for perpendicular bisectors of any triangle is the center of a circumscribed circle true or false?
The perpendicular bisector of ANY chord of the circle goes through the center. Each side of a triangle mentioned would be a chord of the circle therefore it is true that the perpendicular bisectors of each side intersect at the center.
A bisector cuts something into two parts?
false
If a circle with its centre at the origin has a chord with slope m the equation of the right bisector of the chord is y equals mx is this statement true or false?
False. 1). The proposed equation y=mx suggests that the chord's right bisector has no y-intercept, i.e. passes through the origin. This is interesting, and appears plausible, and I'm willing to acknowledge that this aspect of it is true. But ... 2). If the slope of the chord is 'm', then the slope of its right bisector is not also 'm'. If it were, that would make the chord and its bisector parallel, which would be pretty silly. The slope of any line perpendicular to the chord, including its right bisector, has to be '-1/m'. The equation of the chord's right bisector is: Y = -X/m .
