在三角形ABC中,已知ln(sinA+sinB)=lnsinA+lnsinB-ln(sinB-sinA),且cos(A-B)+cosC=1-cos2C求三角形形状,求(a+c)∕b的取值范围
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1,1-cos2C = cos(A+B) + cosC =0
cos2C = 1
C =π/2直角三角形2,ln(sinA+sinB)=lnsinA+ln(sinB-sinA)+lnsinB
sinA+sinB = sinAsinB(sinB-sinA)
(a+b)/b = (sinA+sinB)/sinB = sinA(sinB-sinA)
注意sinB-sinA>0所以(a+b)/b>0(a+b)/b = sinA(cosA-sinA)
=1/2sin2A - 1/2(1-cos2A)
=1/2(sin2A+cos2A) -1/2
≤√2/2-1/2
当A=π/8时取得
所以0======以下答案可供参考======
供参考答案1:
不对啊供参考答案2:
(1)ln(sinA+sinB)=ln(sinA)+ln(sinB)-ln(sinB-sinA)
所以可得ln(sinA+sinB)=ln[sinAsinB/(sinB-sinA)]
所以sinA+sinB=sinAsinB/(sinB-sinA)
即(sinB)^2-(sinA)^2=sinAsinB,根据正弦定理a/sinA=b/sinB=c/sinC可得sinA:sinB=a:b
所以可得b^2-a^2=ab
cos(A-B)+cosC=1-cos2C=2(sinC)^2
因为A+B+C=π,所以C=π-(A+B)
所以cosC=-cos(A+B)
所以cos(A-B)-cos(A+B)=2(sinC)^2
化简可得2sinAsinB=2(sinC)^2
再根据正弦定理可得:ab=c^2
所以可得b^2-a^2=c^2
即a^2+c^2=b^2
所以是直角三角形
(2)根据正弦定理可得:
(a+c)/b=(sinA+sinC)/sinB=sinA+sinC=sinA+cosA=√2sin(A+π/4)
0所以1