In the scenario where you have parallel lines S and T' and a transversal creating an angle of 22°, you can identify three other angles that will also measure 22° based on the properties of alternate interior angles and corresponding angles.
If angle 1 is 22° (for example), then the following angles will also be 22°:
- The alternate interior angle on the other side of the transversal (let's call it angle 2).
- The corresponding angle on line T' (let's call it angle 3).
- The alternate interior angle corresponding to angle 1 on line T' (let's call it angle 4).
Without specific angle numbers indicated in your question, I can suggest that the angles corresponding to angle 1 could be referred to as angle 2, angle 3, and angle 4 (using hypothetical angle numbers).
Please provide the actual angle numbers from the figure so I can give you the precise answer!