在△ABC中,内角A,B,C的对边是a,b,c且a²=b²+c²+√3bc,求角A,
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a²=b²+c²+√3bc
b²+c²-a²=- √3bc
cosA
=(b²+c²-a²)/2bc
=- √3/2
A=150°
(2)
sinA=1/2 , a=√3
a/sinA=b/sinB=c/sinC
2√3=b/sinB
b=2√3 sinB
同理:a/sinA=c/sinC
c=2√3 sinC
S+3cosBcosC
=1/2bcsinA+3cosBcosC
=3sinBsinC+3cosBcosC
=3cos(B-C)
B-C=0,即B=C=15°时,S+3cosBcosC取最大值,最大值为3
b²+c²-a²=- √3bc
cosA
=(b²+c²-a²)/2bc
=- √3/2
A=150°
(2)
sinA=1/2 , a=√3
a/sinA=b/sinB=c/sinC
2√3=b/sinB
b=2√3 sinB
同理:a/sinA=c/sinC
c=2√3 sinC
S+3cosBcosC
=1/2bcsinA+3cosBcosC
=3sinBsinC+3cosBcosC
=3cos(B-C)
B-C=0,即B=C=15°时,S+3cosBcosC取最大值,最大值为3
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