【答案】116 64 26 在
【解析】
∠ABC+∠ACB=180°-∠A�����,∠OBC+∠OCB= 
(∠ABC+∠ACB), ∠BOC=180°-(∠OBC+∠OCB)�,據(jù)此可求∠BOC的度數(shù);
∠BCP= ∠BCE= (∠A+∠ABC)���,∠PBC= ∠CBF= (∠A+∠ACB)�,由三角形內(nèi)角和定理得:∠BPC=180°-∠BCP-∠PBC�����,據(jù)此可求∠BPC的度數(shù);
作PG⊥AB于G��,PH⊥AC于H����,PK⊥BC于K,利用角平分線的性質(zhì)定理可證明PG=PH��,于是可證得AP平分∠BAC�����,據(jù)此可求∠PAB的度數(shù)���;
同理可證OA平分∠BAC,故點
在直線
上.
解:∵O點是∠ABC和∠ACB的角平分線的交點���,
∴∠OBC+∠OCB= (∠ABC+∠ACB)
= (180°-∠A)
=90°- ∠A��,
∴∠BOC=180°-(∠OBC+∠OCB)
=180°-90°+ ∠A
=90°+ ∠A
=90°+26°
=116°����;
如圖,
∵BP��、CP為△ABC兩外角的平分線�����,
∴∠BCP= ∠BCE= (∠A+∠ABC)��,
∠PBC= ∠CBF= (∠A+∠ACB)�����,
由三角形內(nèi)角和定理得:
∠BPC=180°-∠BCP-∠PBC
=180°- [∠A+(∠A+∠ABC+∠ACB)]
=180°- img src="http://thumb.zyjl.cn/questionBank/Upload/2020/11/27/11/a71e7e8e/SYS202011271140551445817129_DA/SYS202011271140551445817129_DA.001.png" width="16" height="41" style="-aw-left-pos:0pt; -aw-rel-hpos:column; -aw-rel-vpos:paragraph; -aw-top-pos:0pt; -aw-wrap-type:inline" />(∠A+180°)
=90°- ∠A
=90°-26°
=64°.
如圖��,作PG⊥AB于G�,PH⊥AC于H,PK⊥BC于K����,連接AP,
∵BP�、CP為△ABC兩外角的平分線,PG⊥AB����,PH⊥AC����,PK⊥BC���,
∴PG=PK�����,PK=PH�,
∴PG=PH��,
∴AP平分∠BAC����,
∴
26°
同理可證OA平分∠BAC��,
點在直線上.
故答案是:(1) 116 ���;(2) 64����;(3) 26���;(4) 在.
