0
What else can I help you with?
In the straightedge and compass construction of the equilateral triangle below reasons can you use to prove that and are congruent?
In the construction of an equilateral triangle using a straightedge and compass, you can prove that the segments are congruent by demonstrating that all sides of the triangle are created using the same radius of the compass. When you draw a circle with a center at one vertex and a radius equal to the distance to the next vertex, you ensure that each side is of equal length. Additionally, using the properties of circles, you can show that the angles formed at each vertex are congruent, reinforcing that all sides are equal, thus establishing the triangle's equilateral nature.
What two triangles which are not congruent?
No isosceles triangle in the world is congruent to any equilateral triangle. No equilateral triangle in the world is congruent to any right triangle.
What are reasons used to proof that the equilateral triangle construction actually constructs an equilateral triangle?
all the angles measure up to be the sameTwo segments that are both congruent to a third segment must be congruent to each otherAll of the radii of a circle are congruent
What are the reasons used in the proof that the equilateral triangle construction actually constructs an equilateral triangle?
The answer to this question is Two segments that are both congruent to a third segment must be congruent to each other All of the radii of a circle are congruent You're welcome.
Are an equilateral triangle and an obtuse triangle are congruent?
No
In the straightedge and compass construction of the equilateral triangle below reasons can you use to prove that and are congruent?
In the construction of an equilateral triangle using a straightedge and compass, you can prove that the segments are congruent by demonstrating that all sides of the triangle are created using the same radius of the compass. When you draw a circle with a center at one vertex and a radius equal to the distance to the next vertex, you ensure that each side is of equal length. Additionally, using the properties of circles, you can show that the angles formed at each vertex are congruent, reinforcing that all sides are equal, thus establishing the triangle's equilateral nature.
In the straightedge and compass construction of an equilateral triangle below which of the following reasons can you use to prove that and are congruent?
AB and BC are both radii of B. To prove that AB and AC are congruent: "AC and AB are both radii of B." Apex.
What triangle has all sides that are congruent?
Such a triangle is said to be EQUILATERAL. Note that if all three sides are congruent, all three angles are also congruent.
What two triangles which are not congruent?
No isosceles triangle in the world is congruent to any equilateral triangle. No equilateral triangle in the world is congruent to any right triangle.
What are reasons used to proof that the equilateral triangle construction actually constructs an equilateral triangle?
all the angles measure up to be the sameTwo segments that are both congruent to a third segment must be congruent to each otherAll of the radii of a circle are congruent
What are the reasons used in the proof that the equilateral triangle construction actually constructs an equilateral triangle?
The answer to this question is Two segments that are both congruent to a third segment must be congruent to each other All of the radii of a circle are congruent You're welcome.
How is a triangle the same as a equilateral triangle?
A triangle is the same as a equilateral triangle because a equilateral triangle is a triangle but it is congruent on all sides
Triangle with congruent sides?
An equilateral triangle
A triangle with congruent sides?
It is an equilateral triangle
Are an equilateral triangle and an obtuse triangle are congruent?
No
If the base angles of a triangle are congruent then the triangle is isosceles?
It will be either isosceles or equilateral. It is equilateral if all of the angles are congruent.
What is the best next step in the construction of an equilateral triangle?
Use a straightedge to draw a line segment from A to one of the points where the two circles intersect.
