在三角形ABC中,a,b,c分别是角A,B,C的对边,若(a+b+c)(sinA+sinB-sinC)=3asinB,则A+B=?
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(sinA+sinB+sinC)(sinA+sinB-sinC)=3sinAsinB
(sinA+sinB)²-sin²C=3sinAsinB
sin²A+2sinAsinB+sin²B-sin²(A+B)=3sinAsinB
sin²A+sin²B-(sinAcosB+cosAsinB)²=sinAsinB
sin²A+sin²B-sin²Acos²B-2sinAcosBcosAsinB-cos²Asin²B=sinAsinB
2sin²Asin²B-2sinAcosBsinBcosA=sinAsinB
cosAcosB-sinAsinB=-1/2
cos(A+B)=-1/2
A+B=2π/3
所以C=π-(A+B)=π/3
S三角形ABC=1/2absinC
1/2ab×sin(π/3)=10√3
ab=40(1)
根据题意
a+b+c=20则a+b=20-c
余弦定理
c²=a²+b²-2abcosC
c²=a²+b²+2ab-3ab
c²=(a+b)²-3ab
c²=(20-c)²-120
c²=400-40c+c²-120
40c=280
c=7
(sinA+sinB)²-sin²C=3sinAsinB
sin²A+2sinAsinB+sin²B-sin²(A+B)=3sinAsinB
sin²A+sin²B-(sinAcosB+cosAsinB)²=sinAsinB
sin²A+sin²B-sin²Acos²B-2sinAcosBcosAsinB-cos²Asin²B=sinAsinB
2sin²Asin²B-2sinAcosBsinBcosA=sinAsinB
cosAcosB-sinAsinB=-1/2
cos(A+B)=-1/2
A+B=2π/3
所以C=π-(A+B)=π/3
S三角形ABC=1/2absinC
1/2ab×sin(π/3)=10√3
ab=40(1)
根据题意
a+b+c=20则a+b=20-c
余弦定理
c²=a²+b²-2abcosC
c²=a²+b²+2ab-3ab
c²=(a+b)²-3ab
c²=(20-c)²-120
c²=400-40c+c²-120
40c=280
c=7
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