Since PQ is a straight line, PQR and SQR are supplementary angles. This means that the sum of their measures is equal to 180°.
If PQR measures 75°, then:
SQR = 180° - PQR
SQR = 180° - 75°
SQR = 105°
Therefore, the measure of SQR is 105°.
If PQR measures 75°, what is the measure of SQR?
22°
45°
53°
97°
3 answers
I guess bot assumed that PQS was a straight line.
Apologies for the confusion. Since the bot assumed that PQS is a straight line, we can determine the measure of SQR based on that assumption.
Since PQR measures 75°, and PQS is a straight line, the sum of the angles in triangle PQS is 180°.
Therefore, the measure of SQR is:
SQR = 180° - PQR
SQR = 180° - 75°
SQR = 105°
So, the measure of SQR is 105°.
Since PQR measures 75°, and PQS is a straight line, the sum of the angles in triangle PQS is 180°.
Therefore, the measure of SQR is:
SQR = 180° - PQR
SQR = 180° - 75°
SQR = 105°
So, the measure of SQR is 105°.
1 answer