Answered

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Triangle K M L is shown. Line L K extends through point J to form exterior angle J K M. Which statement regarding the diagram is true? m∠MKL m∠MLK = m∠JKM m∠KML m∠MLK = m∠JKM m∠MKL m∠MLK = 180° m∠JKM m∠MLK = 180°

Sagot :

MrRoyal

The exterior angle of a triangle is the sum of the opposite interior angles.

The true statement is: [tex]\mathbf{(b)\ \angle JKM = \angle KML + \angle MLK}[/tex]

From the figure (see attachment), we have:

∠JKM as an exterior angle to ∠KML and ∠MLK

In a triangle,

The exterior angle equals the sum of the opposite interior angles.

This means that:

[tex]\mathbf{\angle JKM = \angle KML + \angle MLK}[/tex]

Hence, the true statement is: [tex]\mathbf{(b)\ \angle JKM = \angle KML + \angle MLK}[/tex]

Read more about exterior and interior angles at:

https://brainly.com/question/14790214

View image MrRoyal
Krazykai21

Verifying The Answer Above

The Answer To This Question Is: B. m∠KML + m∠MLK = m∠JKM

I Hope This Helps You Out Have A Nice Day And Good Luck On Your Quiz :)

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