题目内容
【题目】探究:
(1)如图1,在△ABC中,∠A=40°,△ABC的内角平分线交于点P,求∠P的度数;
(2)如图2,在△ABC中,∠A=90°,BP、BQ三等分∠ABC,CP、CQ三等分∠ACB,连结PQ,求∠BQP的度数.
【答案】(1)110°;(2)60°
【解析】
(1)根据角平分线定理可知∠PBC+∠PCB =
( ∠ABC+∠ACB ),∠A=40°已知,根据三角形内角和等于180°,可得∠ABC+∠ACB =140°,所以∠PBC+∠PCB =70°,再次根据三角形内角和可得∠P =110,即为答案.
(2)根据BP、BQ三等分∠ABC,CP、CQ三等分∠ACB可得∠QBC+∠QCB=
( ∠ABC+∠ACB )= 60°,所以∠BQC=120°,又由BP平分∠QBC, CP平分∠QCB,可得PQ平分∠BQC,所以∠BQP =×∠BQC =60° , 即得出答案.
解:(1)∵∠A+∠ABC+∠ACB = 180°
∴∠ABC+∠ACB=180° -∠A =140°
∵BP平分∠ABC, CP平分∠ACB
∴ ∠PBC+∠PCB=( ∠ABC+∠ACB )=70°
∵∠P+∠PBC+∠PCB = 180°
∴∠P=180°-(∠PBC+∠PCB)=110°
(2)∵∠A+∠ABC+ ∠ACB = 180°
∴∠ABC+∠ACB=180° -∠A =90°
∵BQ三等分∠ABC,CQ三等分∠ACB
∴ ∠QBC+∠QCB=( ∠ABC+∠ACB )=60°
∵∠Q+∠QBC+∠QCB= 180°
∴∠Q=180°-(∠QBC+∠QCB)=120°
∵BP平分∠QBC, CP平分∠QCB
∴PQ平分∠BQC
∴∠BQP =×120°=60°
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