tanc=3 2,c几度

把tan换做sin和cos,在用余旋定理

∵A+B＝π-C,∴tan(A+B)=tan(π-C)(tanA+tanB)/(1-tanA*tanB)=-tanC,tanA+tanB=-tanC+tanAtanBtanC∴tanA+tanB+ta

ABC分别是三角形内角,2B=A+CtanB=tan（A/2+C/2）=（tanA/2+tanC/2）/（1-tanA/2*tanC/2）=√3所以tanA/2+tanC/2+√3tanA/2tanC

sinB/sinA+sinA/sinB=6cosCsin(A+C)/sinA+sin(B+C)/sinB=6cosC(sinAcosC+cosAsinC)/sinA+(sinBcosC+cosBsin

tan[180-(-c)]=-tan（-c）＝tanc也就是tan(180＋c)=tanc这个肯定是正确的.

由正弦定理有a/c=sinA/sinC因为(2a-C)/C=tanB/tanC所以2a/c-1=tanB/tanC2sinA/sinC-1=sinBcosC/cosBsinC2sinAcosB-cos

tanA=tan(180-B-C)=-tan(B+C)=-[(tanB+tanC)/(1-tanB*tanC)]=-31/(cosA)^2=(secA)^2=(tanA)^2+1=10所以(cosA)

（1）2B=A+C得到B=60tan120=tan(A+C)=（tanA+tanC）/（1-tanA*tanC）=-根号3乘过来移项得到tanA+tanC-根号3tanA乘tanC的值是根号3（2）t

（Ⅰ）∵tanC＝37，∴sinCcosC＝37．又∵sin2C+cos2C=1，解得cosC＝±18．∵tanC＞0，∴C是锐角．∴cosC＝18．（Ⅱ）∵CB•CA＝52，∴abcosC＝52．解

B=60度A+C=120度tan(A+C)=-√3=(tanA+tanC)/(1-tanAtanC)=(3+√3)/(1-tanAtanC)--->1-tanAtanC=(3+√3)/(-√3)=-√

应该是在三角形中吧三角形中A+B+C=3.143.14-A=B+CtanA=-tan(3.14-A)=-tan(B+C)=(tanB+tanC)/(tanBtanC-1)所以tanA(tanBtanC

根据正弦定理有：a/c=sinA/sinC因此：(2a-C)/C=tanB/tanC2a/c-1=tanB/tanC2sinA/sinC-1=sinBcosC/cosBsinC2sinAcosB-co

因为是等差数列,所以2tanB=tanA+tanC,tanB=-tan（A+C),展开整理可得,tanAtanC=3,tanC=3\tanA,然后令tanC=t,c为锐角,t>0tanA=3\t,则1

(1+tanC/tanA)+(1+tanC/tanB)=2+tanC/tanA+tanC/tanB=6则tanC/tanA+tanC/tanB=4

tan(b+c)=(tanb+tanc)/(1-tanbtanc)tan(b+c)(1-tanbtanc)=tanb+tanctan(b+c)-tanbtanctan(b+c)=tanb+tanc所以

∵S=1/4c^2tanC又S=1/2absinC∴absinC=1/4c^2sinC/cosC∴abcosC=1/2c^2正弦定理：sin²C=2sinAsinBcosC∴tanC/tan

tanC/tanA+tanC/tanB=1tanBtanC+tanAtanC=tanAtanBtanC(tanA+tanB)=tanAtanBsinC/cosC(sinA/cosA+sinB/cosB

tanC/tanA+tanC/tanB=1tanBtanC+tanAtanC=tanAtanBtanC(tanA+tanB)=tanAtanBsinC/cosC(sinA/cosA+sinB/cosB

tanA=tan(180-B-C)=-tan(B+C)=-[(tanB+tanC)/(1-tanB*tanC)]=-31/(cosA)^2=(secA)^2=(tanA)^2+1=10所以(cosA)

tanA+tanB+tanC=tan(A+B)(1-tanAtanB)+tanC=tan(pai-c)(1-tanAtanB)+tanC=-tanC(1-tanAtanB)+tanC=tanAtanB