在三角形ABC中,cos方2分之A=b+c/2c,(a,b分别为角ABC的对边),则三角形ABC的形状为?
网友回答
a/sinA=b/sinB=c/sinC
所以cos²A/2=(1+cosA)/2=(sinB+sinC)/2sinC
sinC+sinCcosA=sinB+sinC
sinCcosA=sin(180-A-C)=sin(A+C)=sinAcosC+cosAsinC
所以sinAcosC=1
A是三角形内角则0
======以下答案可供参考======
供参考答案1:
由正弦定理:
b/2R=sinB,
c/2R=sinC
所以(b+c)/2c
=[(2RsinB)+(2RsinC)]/[2(2RsinC)]
=(sinB+sinC)/2sinC
所以:cos^2(A/2)=(sinB+sinC)/2sinC
(cosA+1)/2=(sinB+sinC)/2sinC
(cosA+1)sinC=sinB+sinC
cosAsinC=sinB
=sin(π-A-C)
=sin(A+C)
=sinAcosC+cosAsinC
所以sinAcosC=0
因为A是三角形内角,所以sinA>0 故cosC=0
C=90° 所以三角形是直角三角形