In Fig. 6.10, ray OS stands on a line POQ. Ray OR and ray OT are angle bisectors of `/_P O S`and `/_S O Q`, respectively. If `/_P O S=x`, find `/_R O T`.

In Figure, ray O S stand on a line P O Qdot Ray O R and ray O T are angle bisectors of /_P O S\ a n d\ /_S O Q respectively. If /_P O S=x , find /_R O T

In Figure, ray O S stand on a line P O Qdot Ray O R and ray O T are angle bisectors of /_P O S\ a n d\ /_S O Q respectively. If /_P O S=x , find /_R O T

In Figure,ray OS stand on a line POQ .Ray OR and ray OT are angle bisectors of /_POS and /_SOQ respectively.If /_POS=x, find /_ROT

In Fig., ray OS stand on a line POQ Ray OR and ray OT are angle bisectors of ∠POS and ∠SOQ respectively. If ∠POS=x, find ∠ROT.

In Fig. 6.10, ray OS stands on a line POQ. Ray OR and ray OT are angle bisectors of angle POS and angle SOQ , respectively. If angle POS = x , find angle ROT .

In the given figure, ray OS stands on a lien POQ. Ray OR and ray OT are angle bisectors of anglePOS and angleSOQ respectively. If anglePOS=x , find angleROT .

In the adjacent figure ray OS stands on a line PQ. Ray OR and ray OT are angle bisectors of anglePOS and angleSOQ respectively. Find angleROT .

In the adjacent figure ray OS stands on a line PQ. Ray OR and ray OT are angle bisectors of anglePOS and angleSOQ respectively. Find angleROT .

In the adjacent figure ray OS stands on a line PQ. Ray OR and ray OT are angle bisectors of anglePOS and angleSOQ respectively. Find angleROT .

In the given fig. , ray OS is on POQ. Rays OR and OT are the bisectors of anglePOS and angleSOQ respectively. If anglePOS = x find angleROT .