Quadrilateral PQRS is inscribed in circle A. Which statement is necessarily true?

A.

m∠R = m∠S

B.

m∠R + m∠S = 180°

C.

m∠R = m∠S

D.

m∠R + m∠S = m∠P + m∠Q

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boffeemadrid boffeemadrid · Answer 1 · 2019-01-21T05:37:31+01:00

Answer:

(B) m∠R+m∠S=180°

Step-by-step explanation:

The quadrilateral is inscribed in circle A, then m∠R+m∠S=180° as the sum of corresponding angles of a quadrilateral is equal to 180°.

Since, ∠R and ∠S are corresponding angles of the quadrilateral, therefore, they ca't be equal. Hence, ∠R≠∠S.

Also, the sum of all the angles of the quadrilateral is equal to 360°, therefore ∠P+∠Q+∠R+∠S=360°, hence ∠R+∠S≠∠P+∠Q

Therefore, option B is correct.

binkiethedrunmer binkiethedrunmer · Answer 2 · 2021-06-23T07:28:53+02:00

Answer:

A. m∠R = m∠S

Step-by-step explanation:

Opposite angles of a cyclic quadrilateral add up to 180 degrees so m<R = 180-92 = 88 and m < S = 180-92 = 88 degrees.

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