To determine which angles are also 22° when lines S and T are parallel, we can use the properties of parallel lines and transversals. Here are some scenarios to consider:
- Corresponding Angles: If a transversal crosses parallel lines, then the angles in corresponding positions are equal.
- Alternate Interior Angles: When a transversal crosses parallel lines, the angles that are on opposite sides of the transversal and inside the two lines are equal.
- Same-Side Interior Angles: These angles sum to 180°, but they are not relevant for finding angles equal to 22°.
Given angle is 22°, the three angles that will also be 22° are likely to be the corresponding angles or alternate interior angles relative to the given angle.
Choose the three angles that are positioned similarly (either matching the position of the given angle on the other parallel line or corresponding to it).
Without the specific image, I can't identify the exact numbered angles. However, based on the rules above, pick the three angles that fit the criteria of corresponding or alternate interior angles to the labeled 22° angle in the context of the transversal crossing lines S and T.
If you can provide the specific angle numbers, I can help confirm your answers!
3 answers