To determine which angles are also 22° when lines S and T are parallel, we can use the properties of corresponding angles, alternate interior angles, and same-side interior angles.
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Corresponding angles: If one angle is 22° and is formed by a transversal intersecting the parallel lines, then the angle that is in the same position on the other parallel line will also measure 22°.
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Alternate interior angles: If one angle of 22° is between the parallel lines and on the opposite side of the transversal, then the angle that is also between the parallel lines and on the opposite side of the transversal, but measured from the other parallel line, will also be 22°.
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Same-side interior angles: These angles are supplementary if they lie on the same side of the transversal, but they won't be equal to 22°.
Since I do not have the actual picture to identify specific angles, I can suggest that the three angles that would also measure 22° are:
- Angle corresponding to the first 22° angle (same relative position on the other parallel line),
- Alternate interior angle (if there's one),
- Or any angle labeled as congruent by other properties shown in your specific diagram.
Please refer to the diagram for the specific angle numbers, but the angle numbers will typically be those that are labeled as corresponding or alternate interior.