Mathematics
In the given figure, M is the centre of the circle. Chords AB and CD are perpendicular to each other. If ∠MAD = x and ∠BAC = y :
(i) express ∠AMD in terms of x.
(ii) express ∠ABD in terms of y.
(iii) prove that : x = y.
Circles
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Answer
Mark the point of intersection of AB and CD as L.
(i) In △AMD,
MA = MD [Radius of circle]
∴ ∠MAD = ∠MDA = x.
In △AMD,
⇒ ∠MAD + ∠MDA + ∠AMD = 180° [Angle sum property of triangle]
⇒ x + x + ∠AMD = 180°
⇒ ∠AMD = 180° - 2x.
Hence, ∠AMD = 180° - 2x.
(ii) Let the perpendicular chords AB and CD intersect each other at L.
From figure,
∠ALC = 90°.
In △ALC,
⇒ ∠LAC + ∠LCA + ∠ALC = 180° [Angle sum property of triangle]
⇒ y + ∠DCA + 90° = 180°
⇒ ∠DCA = 180° - 90° - y
⇒ ∠DCA = 90° - y
From figure,
∠ABD = ∠DCA [Angles in same segment are equal]
∴ ∠ABD = 90° - y.
Hence, ∠ABD = 90° - y.
(iii) We know that,
Angle which an arc subtends at the center is double that which it subtends at any point on the remaining part of the circumference.
∴ ∠AMD = 2∠ABD
∠ABD = ∠AMD = = 90° - x.
We have,
∠ABD = 90° - y and ∠ABD = 90° - x
⇒ 90° - y = 90° - x
⇒ x = y.
Hence, proved that x = y.
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