Since lines \( S \) and \( T \) are parallel and one angle is labeled \( 22^\circ \), this indicates that alternate interior angles and corresponding angles will also be \( 22^\circ \).
To accurately identify which angles are also \( 22^\circ \), here are the potential angles based on the properties of parallel lines:
- The angle that is a corresponding angle to the \( 22^\circ \) angle on the alternate line and on the same side of the transversal.
- The alternate interior angle on the opposite side of the transversal.
- Any vertically opposite angle formed by the intersecting transversal line.
Without seeing the actual figure, I can provide a general suggestion for what you should look for:
If you have identified one angle as \( 22^\circ \), the three angles that will also measure \( 22^\circ \) will typically be:
- The corresponding angle.
- The alternate interior angle.
- The vertically opposite angle.
Writing them down in order as angle numbers (which I cannot specify without the figure), you would separate the angle numbers with commas as requested.
1 answer