Which segment is included by A and C?
A segment bisector or angle bisector. A bisector can be a line, line segment, or ray.
A perpendicular bisector intersects a line segment at a right angle, forming two 90-degree angles with the segment. This means that the angle between the bisector and the line segment is always a right angle, indicating that the bisector divides the segment into two equal parts.
If a point lies on a segment whose endpoints are on the sides of an angle but is not an endpoint of the segment, then it is located strictly between the two endpoints of that segment. This means the point is inside the angle formed by the two sides, but not on the angle's boundary itself. The point divides the segment into two smaller segments, both of which lie within the angle.
Angle abc will form a right angle if and only if, segment ab is perpendicular to segment bc.
If a point lies on a segment whose endpoints are on the sides of an angle but is not an endpoint of the segment, it is located within the interior of the angle. Specifically, the point is positioned between the two sides of the angle, along the line segment that connects the two endpoints. This means the point is still constrained within the angular region defined by the sides of the angle.
true
ab
If the two segments form an angle it would be obvious that the included angle would be angle a since it is present in both line segments
Angle B and Angle C
Angle abc.
That is correct. The distance from a point C to a line AB is the length of the perpendicular segment drawn from point C to line AB. This forms a right angle, creating a right triangle with the segment as the hypotenuse. The length of this perpendicular segment is the shortest distance from the point to the line.
it would be C because C is the last letter in ac and bc
A bisector is a ray or segment which cuts an angle in half.
To find the angle of a triangle within a circle segment, you first need to determine the central angle of the circle segment. Then, you can use the properties of triangles inscribed in circles to find the angle. The angle of the triangle within the circle segment will be half the measure of the central angle.
A segment bisector or angle bisector. A bisector can be a line, line segment, or ray.
A perpendicular bisector intersects a line segment at a right angle, forming two 90-degree angles with the segment. This means that the angle between the bisector and the line segment is always a right angle, indicating that the bisector divides the segment into two equal parts.
If a point lies on a segment whose endpoints are on the sides of an angle but is not an endpoint of the segment, then it is located strictly between the two endpoints of that segment. This means the point is inside the angle formed by the two sides, but not on the angle's boundary itself. The point divides the segment into two smaller segments, both of which lie within the angle.