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Question
Diagonal AC is the perpendicular bisector of diagonal BD in the quadrilateral ABCD.
Prove that
- AB = AD
- BC = DC
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Solution
Given: Diagonal AC is the perpendicular bisector of diagonal BD in the quadrilateral ABCD.
To Prove:
- AB = AD
- BC = DC
Proof:
1. Since AC is the perpendicular bisector of BD, it means:
AC ⟂ BD ...(AC is perpendicular to BD)
AC bisects BD, so O is the midpoint of BD such that BO = OD
2. Consider triangles △ABO and △ADO:
AO is common to both triangles.
BO = DO ...(O is midpoint of BD)
∠AOB = ∠AOD = 90° ...(Since AC is perpendicular to BD)
Therefore, by RHS (Right angle-Hypotenuse-Side) congruence, △ABO ≅ △ADO
3. From congruence, corresponding parts are equal:
AB = AD
4. Similarly, consider triangles △BCO and △DCO:
CO is common.
BO = DO ...(Midpoint)
∠BCO = ∠DCO = 90° ...(Perpendicularity)
Again by RHS congruence,
△BCO ≅ △DCO
5. From this congruence,
BC = DC
Hence proved:
- AB = AD
- BC = DC
