Answer:
g = 108°
Explanation:
You want angle (g) of the isosceles triangle with base exterior angle 144°.
Angle relations
Let b represent the measure of a base angle of the triangle.
b + 144° = 180° . . . the interior angle and exterior angle are supplementary
2b +g = 180° . . . . . the interior angles of a triangle total 180°
Solution
Using the first equation to substitute for b in the second equation, we have ...
2(180° -144°) +g = 180°
Subtracting the left-side constant gives ...
g = 2(144°) -180° = 288° -180°
g = 108°
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