Sure, I can help you with that question.
The question is asking for the measurements of angles A, B, and C in the given figure.
To find these angles, we need to use the properties of triangles and parallel lines.
First, let's start with angle A. Angle A is a vertical angle with angle 92 degrees, so angle A is also 92 degrees.
Next, let's find angle B. Angle B is an exterior angle of triangle ABC. By the Exterior Angle Theorem, the measure of an exterior angle of a triangle is equal to the sum of the measures of the two opposite interior angles.
In triangle ABC, angle BAC and angle ABC are the two opposite interior angles. We already know angle BAC is 92 degrees.
To find angle ABC, we need to subtract angle BAC from the straight angle (180 degrees), since in a triangle the sum of all angles is always 180 degrees.
So, angle ABC = 180 degrees - 92 degrees = 88 degrees.
Now, angle B is equal to the sum of angle ABC and angle BAC.
Therefore, angle B = 88 degrees + 92 degrees = 180 degrees.
Finally, let's find angle C. Angle C is an alternate interior angle with angle BAC, since line RS is parallel to line PQ.
By the Alternate Interior Angles Theorem, alternate interior angles are congruent when a transversal intersects two parallel lines.
Since angle BAC is 92 degrees, angle C is also 92 degrees.
To summarize:
- Angle A is 92 degrees.
- Angle B is 180 degrees.
- Angle C is 92 degrees.