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DRY Believer · Answer 1 · 2023-09-17T01:21:01+0000

Given:

Angle P is formed by two secants intersecting outside of circle C.

The intercepted arcs are major arc QT and minor arc RS.

$\hat{mQT}=140\degree\text{ and }m\angle P=40\degree$

Required:

$\text{ We need to find }m\mathring{RS}.$

Step-by-step explanation:

Recall that

$\text{ Angle Formed by Two Secants =}(1)/(2)(\text{ \lparen Difference of Intercepted Arcs\rparen}$
$m\angle P=(1)/(2)(m\hat{QT}-m\hat{RS})$
$Substitute\text{ }\hat{mQT}=140\degree\text{ and }m\angle P=40\degree\text{ in the equation.}$
$40\degree=(1)/(2)(140\degree-m\hat{RS})$

Multiply both sides by 2.

$2*40\degree=2*(1)/(2)(140\degree-m\hat{RS})$
$80\degree=140\degree-m\hat{RS}$
$Add\text{ }m\hat{RS}-80\degree\text{ on both sides of the equation.}$
$80\degree+m\hat{RS}-80\degree=140\degree-m\hat{RS}+m\hat{RS}-80\degree$
$m\hat{RS}=140\degree-80\degree$
$m\hat{RS}=60\degree$

Final answer:

$m\hat{RS}=60\degree$

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