Question
If OQ and RT are parallel lines and mRSP = 52°, what is mTSU?
Answers
GPT-4o mini
If OQ and RT are parallel lines, and you know the measure of angle \( mRSP = 52° \), you can use the properties of parallel lines to determine the measure of angle \( mTSU \).
Assuming that \( RSP \) and \( TSU \) are corresponding angles formed by a transversal line intersecting the parallel lines OQ and RT, the corresponding angles are equal. Therefore:
\[
mTSU = mRSP
\]
So:
\[
mTSU = 52°
\]
Thus, \( mTSU = 52° \).
Assuming that \( RSP \) and \( TSU \) are corresponding angles formed by a transversal line intersecting the parallel lines OQ and RT, the corresponding angles are equal. Therefore:
\[
mTSU = mRSP
\]
So:
\[
mTSU = 52°
\]
Thus, \( mTSU = 52° \).