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Examine the diagram, where quadrilateral MNOP is inscribed in ⨀C such that m∠P=(2x)∘ and m∠N=(2x−12)∘.

What is the measure of m∠P and m∠N?

m∠P=96∘, m∠N=84∘
m∠P=84∘, m∠N=72∘
m∠P=90∘, m∠N=90∘
m∠P=72∘, m∠N=108∘

Examine the diagram where quadrilateral MNOP is inscribed in C such that mP2x and mN2x12 What is the measure of mP and mN mP96 mN84 mP84 mN72 mP90 mN90 mP72 mN1 class=

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Answer:

Option (1)

Step-by-step explanation:

Since quadrilateral MNOP is a cyclic quadrilateral, sum of opposite angles of the quadrilateral will be 180°.

m∠P + m∠N = 180°

(2x)° + (2x - 12)° = 180°

4x - 12 = 180

4x = 192

x = 48

Therefore, m∠P = (2x)° = 2×48 = 96°

m∠N = (2x - 12)° = (2×48) - 12 = 84°

Option (1) will be the answer.

Answer:

Option (1)

Step-by-step explanation:

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