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Which sentence states a property or a definition used in the construction of a perpendicular bisector?
A property used in the construction of a perpendicular bisector is that it divides a line segment into two equal parts while forming right angles (90 degrees) with the segment. This means that any point on the perpendicular bisector is equidistant from the segment's endpoints.
What else can I help you with?
What property do the two legs of a right triangle have?
They are perpendicular.
What is the Definition of identity property?
The number of 1
Is it possible for two skew lines to be perpendicular?
perpendicular lines are lines that MEET at right angles (90 degrees). Skew lines are lines that dont meet at all. Even though the gradients of two skew lines can multiply to be -1 (a property of perpendicular lines) They will not really be perpendicular as they don't accually meet. This can occur when the lines are in different planes.
What is the definition of symmetric in the Properties of congruence?
When in a triangle, for angle A, B, C; As the symmetric property of congruence , when ∠A ≌ ∠B then ∠B ≌ ∠A and when ∠A ≌ ∠C then ∠C ≌ ∠A and when ∠C ≌ ∠B then ∠B ≌ ∠C This is the definition of symmetric property of congruence.
How many perpendicular lines does a rectangle have?
Oh, dude, a rectangle has like, two perpendicular lines. One going up and down, and one going side to side. It's like, the basic geometry you learn in elementary school, man. So, yeah, two perpendicular lines for a rectangle.
If R and S are two points in the plane the perpendicular bisector of is the set of all points equidistant from R and S.?
The perpendicular bisector of the line segment connecting points R and S is a line that is perpendicular to the segment at its midpoint. Any point on this line is equidistant from R and S, meaning the distance from any point on the bisector to R is the same as the distance to S. This property makes the perpendicular bisector a crucial concept in geometry, particularly in triangle construction and circle definition.
If a and b are two points in the plane the perpendicular bisector of ab is the set of all points equidistant from a to b?
The perpendicular bisector of the line segment connecting points ( a ) and ( b ) in a plane is a line that is perpendicular to the segment at its midpoint. This line consists of all points that are equidistant from ( a ) and ( b ). Therefore, if any point lies on the perpendicular bisector, it maintains equal distance from both points. This property is fundamental in geometry and is used in various applications, including triangulation and construction.
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 aS?
The perpendicular bisector of the segment RS is the line that divides the segment into two equal parts at a right angle. It consists of all points in the plane that are equidistant from points R and S. Therefore, any point on this line is the same distance from R as it is from S. This geometric property is fundamental in various applications, including triangle construction and the locus of points.
Why does the cross product give a perpendicular vector?
The cross product gives a perpendicular vector because it is calculated by finding a vector that is perpendicular to both of the original vectors being multiplied. This property is a result of the mathematical definition of the cross product operation.
Does the relation is perpendicular to have a reflexive property?
No, equality of numbers has a reflexive property. Perpendicularity of lines has a symmetric property.
What property do the two legs of a right triangle have?
They are perpendicular.
How does the transitive property apply to perpendicular lines?
it can't
Why are the median angle bisector and altitude from the vertex angle of an isoceles triangle all the same?
It's in the definition of an angle bisector: An angle is formed by two rays with a common endpoint. The angle bisector is a ray or line segment that bisects the angle, creating two congruent angles.and an isoceles triangle:it is a triangle with (at least) two equal sides. This property is equivalent to two angles of the triangle being equal. An isosceles triangle therefore has both two equal sides and two equal angles.
What is the property of the point of concurency in perpendicular bisectors of a triangle?
circumcenter
When perpendicular lines intersect they form?
When perpendicular lines intersect, they form four right angles at the point of intersection. Each angle measures 90 degrees, creating a square-like configuration around the intersection point. This property is fundamental in geometry and is often used in various applications, such as in construction and design.
What is the definition of a recreational property?
Property used for recreation.
Does a rhombus have a perpendicular side?
A wonderful and rare property of a rhombus is that its diagonals are always perpendicular to each other.
