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Quadrilateral OPQR is inscribed inside a circle as shown below Which pair, or pairs , of angles are supplementary, if any? ( 10 points
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Quadrilateral OPQR is inscribed inside a circle as shown below Which pair, or pairs , of angles are supplementary, if any? ( 10 points

Quadrilateral OPQR is inscribed inside a circle as shown below Which pair, or pairs-example-1
Quadrilateral OPQR is inscribed inside a circle as shown below Which pair, or pairs-example-1
Quadrilateral OPQR is inscribed inside a circle as shown below Which pair, or pairs-example-2
User Vignesh I
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7.5k points

1 Answer

2 votes

Solution:

Concept:

The opposite angles of a cyclic quadilateral are supplementary.

Hence,

With this concept above, we can conclude that


\begin{gathered} \angle R+\angle P=180^0 \\ \angle O+\angle Q=180^0 \end{gathered}

HENCE,

The final answer is

Quadrilateral OPQR is inscribed inside a circle as shown below Which pair, or pairs-example-1
User Guycole
by
7.8k points
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