Question
While constructing an angle bisector, why is it so important to keep the compass the same distance when creating two smaller arcs inside the angle?(1 point)
Responses
Keeping the compass legs at the same distance allows you to ensure that the angle will be divided into four parts.
Keeping the compass legs at the same distance allows you to ensure that the angle will be divided into four parts.
Keeping the compass legs at the same distance ensures that the vertex of the angle is far enough away so that the two arcs will intersect.
Keeping the compass legs at the same distance ensures that the vertex of the angle is far enough away so that the two arcs will intersect.
Keeping the compass legs at the same distance ensures the two arcs are equidistant from both sides of the angle to create the bisector.
Keeping the compass legs at the same distance ensures the two arcs are equidistant from both sides of the angle to create the bisector.
Keeping the compass legs at the same distance ens…
Responses
Keeping the compass legs at the same distance allows you to ensure that the angle will be divided into four parts.
Keeping the compass legs at the same distance allows you to ensure that the angle will be divided into four parts.
Keeping the compass legs at the same distance ensures that the vertex of the angle is far enough away so that the two arcs will intersect.
Keeping the compass legs at the same distance ensures that the vertex of the angle is far enough away so that the two arcs will intersect.
Keeping the compass legs at the same distance ensures the two arcs are equidistant from both sides of the angle to create the bisector.
Keeping the compass legs at the same distance ensures the two arcs are equidistant from both sides of the angle to create the bisector.
Keeping the compass legs at the same distance ens…
Answers
GPT-4o mini
The correct response is:
**Keeping the compass legs at the same distance ensures the two arcs are equidistant from both sides of the angle to create the bisector.**
This ensures that the intersection points of the arcs are the same distance from both arms of the angle, allowing for an accurate construction of the angle bisector that divides the angle into two equal parts.
**Keeping the compass legs at the same distance ensures the two arcs are equidistant from both sides of the angle to create the bisector.**
This ensures that the intersection points of the arcs are the same distance from both arms of the angle, allowing for an accurate construction of the angle bisector that divides the angle into two equal parts.
Richard draws a triangle in the dirt. Two of the sides of the triangle measure 14 inches and 6 inches. Which could be the length of the third side of Richard’s triangle?(1 point)
Responses
3 inches
3 inches
20 inches
20 inches
15 inches
15 inches
7 inches
7 inches
Remaining
Responses
3 inches
3 inches
20 inches
20 inches
15 inches
15 inches
7 inches
7 inches
Remaining