已知锐角三角形ABC中,sin(A+B)=3/5,sin(A-B)=1/5 1.已知锐角三角形ABC中,sin(A+B)=3/5,sin(A-B)=1/5 1.求tanA/tanB的值 2.求tanB的值
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(1)sin(A+B)=3/5,sin(A-B)=1/5
sin(a+b)=sinAcosB+sinBcosA=3/5
sin(a-b)=sinAcosB-sinBcosA=1/5
两式相加相减后可得:
sinAcosB=2/5
sinBcosA=1/5
将两式相除,可得tanA=2tanB,所以tanA/tanB=2
(2)tan(B)=sinB/cosB=sinBcosA/cosAcosB
cos(A)cos(B)=1/2[cos(A+B)+cos(A-B)]=1/2[4/5+2根号6/5]=(根号6-2)/5
tanB=1/(根号6-2)=(根号6+2)/2