题目:
如图,∠AOC=∠AOB
∠AOB
+∠BOC
∠BOC
=∠AOD
∠AOD
-∠COD
∠COD
;∠BOC=∠BOD
∠BOD
-∠COD
∠COD
=∠AOC
∠AOC
-∠AOB
∠AOB
.答案
∠AOB
∠BOC
∠AOD
∠COD
∠BOD
∠COD
∠AOC
∠AOB
解:根据图形,∴∠AOC=∠AOB+∠BOC=∠AOD-∠COD;
∠BOC=∠BOD-∠COD=∠AOC-∠AOB.
故答案为:∠AOB+∠BOC,∠AOD-∠COD,∠BOD-∠COD,∠AOC-∠AOB.
l图,∠2O它和∠BO2都是直角,l果∠2OB=135°,则∠2O它的度数是( )
如图,在△A十E中,点C,D在十E边中,且AD平分∠CAE,∠t=