Final answer:
To prove that A is equidistant from B and C with AD as the perpendicular bisector of BC, use congruence of triangles ABD and ACD, using the RHS Rule of Congruence to conclude that AB equals AC.
Step-by-step explanation:
The question asks for the steps to prove that point A is equidistant from points B and C given that line segment AD is a perpendicular bisector of BC. In geometry, especially in the study of triangles and congruence, this involves a number of standard steps:
- Identify triangle ABD and triangle ACD.
- Since AD bisects BC, BD and CD are equal in length, by definition of bisector.
- AD is a common side to both triangles ABD and ACD.
- Angle ADB and angle ADC are right angles because AD is perpendicular to BC.
- By the Reflexive Property, segment AD is equal to itself.
- Now, by the Pythagorean theorem or by the RHS (Right angle-Hypotenuse-Side) Rule of Congruence (also known as HL - Hypotenuse-Leg), the triangles ABD and ACD are congruent.
- Since the triangles are congruent, the corresponding sides AB and AC are equal, which means point A is equidistant from points B and C.