sir what is the best way for solving the question of class 9^{th} chapter of Circles chapter of question no.1 of math of exercise 10.6 of math, what is the best way for solving the question of class 9^{th} ncert book of question no. 7 AC and BD are chords of a circle which bisect each other. Prove that (i) AC and BD are diameters; (ii) ABCD is a rectangle

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# AC and BD are chords of a circle which bisect each other. Prove that (i) AC and BD are diameters; (ii) ABCD is a rectangle. Q.7

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Here chords AB and CD intersect each other at O.

Consider Î”AOB and Î”COD,

âˆ AOB = âˆ COD (They are vertically opposite angles)

OB = OD (Given in the question)

OA = OC (Given in the question)

So, by SAS congruency, Î”AOB â‰… Î”COD

Also, AB = CD (By CPCT)

Similarly, Î”AOD â‰… Î”COB

Or, AD = CB (By CPCT)

In quadrilateral ACBD, opposite sides are equal.

So, ACBD is a parallelogram.

We know that opposite angles of a parallelogram are equal.

So, âˆ A = âˆ C

Also, as ABCD is a cyclic quadrilateral,

âˆ A+âˆ C = 180Â°

â‡’âˆ A+âˆ A = 180Â°

Or, âˆ A = 90Â°

As ACBD is a parallelogram and one of its interior angles is 90Â°, so, it is a rectangle.

âˆ A is the angle subtended by chord BD. And as âˆ A = 90Â°, therefore, BD should be the diameter of the circle. Similarly, AC is the diameter of the circle.