Two circles touch internally at point P and a chord AB of the circle o

1.	Two circles touch internally at point P and a chord AB of the circle of longer radius intersects the other circle in C and D. Which of the following holds good?(a) ∠CPA = ∠DPB (b) 2 ∠CPA = ∠CPD (c) ∠APX = ∠ADP (d) ∠BPY = ∠CPD + ∠CPA
Answer» Answer : (a) ∠CPA = ∠DPB In the bigger circle, ∠APX = ∠ABP In the smaller circle, ∠CPX = ∠PDC {Angles in alternate segment are equal.} ⇒ ∠APX + ∠CPA = ∠CPX = ∠PDC ⇒ ∠ABP + ∠CPA = ∠PDC (∵ ∠APX = ∠ABP) ⇒ ∠ABP + ∠CPA = ∠DBP + ∠DPB (ext. ∠ theorem in ∆ PDB) ∠ABP + ∠DPB ⇒ ∠CPA = ∠DPB.

Two circles touch internally at point P and a chord AB of the circle of longer radius intersects the other circle in C and D. Which of the following holds good?(a) ∠CPA = ∠DPB (b) 2 ∠CPA = ∠CPD (c) ∠APX = ∠ADP (d) ∠BPY = ∠CPD + ∠CPA

Answer»

Answer : (a) ∠CPA = ∠DPB

In the bigger circle, ∠APX = ∠ABP

In the smaller circle, ∠CPX = ∠PDC {Angles in alternate segment are equal.}

⇒ ∠APX + ∠CPA = ∠CPX = ∠PDC

⇒ ∠ABP + ∠CPA = ∠PDC (∵ ∠APX = ∠ABP)

⇒ ∠ABP + ∠CPA = ∠DBP + ∠DPB (ext. ∠ theorem in ∆ PDB)

∠ABP + ∠DPB

⇒ ∠CPA = ∠DPB.

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