In the figure below, ray OS stands on a line POQ. Ray OR and ray OT are angle bisectors of ∠POS and ∠SOQ, respectively. If ∠POS = x, find ∠ROT.
Ray OS stands on the line POQ, so that,
∠POS+ ∠SOQ= 180∘
But, ∠POS=x
Hence,x+ ∠SOQ= 180∘
∠SOQ= 180∘–x
Now, ray OR bisects POS.
Hence, ∠ROS= 12 × ∠POS => 12 × x = x2
Similarly, SOT=12 × ∠SOQ => 12 × ( 180∘ - x) = 90∘ – x2
∠ROT= ∠ROS+ ∠SOT => x2 + 90∘ – x2 = 90∘