prove that-equal chords of a circle are equidistant from the centre of the circle
Answers
Step-by-step explanation:
Given a circle with centre O and chords AB = CD Draw OP⊥ AB and OQ ⊥ CD Hence AP = BP = (1/2)AB and CQ = QD = (1/2)CD Also ∠OPA = 90° and ∠OQC = 90° Since AB = CD ⇒ (1/2) AB = (1/2) CD ⇒ AP = CQ In Δ’s OPA and OQC, ∠OPA = ∠OQC = 90° AP = CQ (proved) OA = OC (Radii) ∴ ΔOPA ≅ ΔOQC (By RHS congruence criterion) Hence OP = OQ (CPCT)
Theorem: Congruent chords of circle are equidistant from the center of the circle.
Given: 'O' is the center of the circle, where Chord AB ≅ Chord MN.
To prove that: CO ≅ PO
Construction: Draw radii OB and radii ON.
Proof: OC ⊥ AB and OP ⊥ MN (Given)
Therefore,
Seg AB = Seg PN (Given)
CB = 1/2 AB; PN = 1/2 MN
∴ Seg CB = Seg PN ------ (i)
Now,
In ΔOCB and ΔOPN,
Seg CB ≅ Seg PN ----- From i
∠OCB ≅ ∠OPN ----- Each 90°
Seg OB ≅ Seg ON ------- Radii of circle
∴ ΔOCB ≅ ΔOPN (Hypo. side test)
∴ Seg OP = Seg CO ------- C.S.C.T
Therefore, Chords are equidistant from the center of the circle.
"Refer to the Given attachment".
