To find the measure of the exterior angle \( x \) formed by extending a line from the top vertex of the triangle, we can use the properties of triangles and exterior angles.
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First, we note that the sum of the interior angles of a triangle is always 180 degrees. In this case, we have two of the interior angles:
- Left angle: 41 degrees
- Right angle: 53 degrees
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We can calculate the third interior angle \( A \): \[ A = 180^\circ - (41^\circ + 53^\circ) \] \[ A = 180^\circ - 94^\circ = 86^\circ \]
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The exterior angle \( x \) at the top vertex of the triangle is equal to the sum of the two remote (non-adjacent) interior angles, which are the angles at the left and right vertices: \[ x = 41^\circ + 53^\circ \] \[ x = 94^\circ \]
Thus, the value of angle \( x \) is \( 94^\circ \).
So the correct response is: 94°
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