To determine the measure of Angle 5, we need to consider the relationship between Angle 5 and Angle 6. Since the figure is not visible, let’s assume that Angle 5 and Angle 6 are either supplementary (they add up to 180°) or that they are corresponding angles, depending on their position in relation to a transversal and parallel lines.

1. If Angle 5 and Angle 6 are supplementary:

– Calculate Angle 5 as follows:

– Angle 5 + Angle 6 = 180°

– Angle 5 + 141° = 180°

– Angle 5 = 180° – 141° = 39°

However, since none of the answer choices fits 39°, we can conclude they might be corresponding angles.

2. If they are corresponding angles:

– Angle 5 could be equal to Angle 6, so:

– Angle 5 = Angle 6 = 141°

Based on the options provided and assuming they are either supplementary or corresponding angles, the most likely answer is that Angle 5 equals 141°.

Correct answer: 141°