sinB sinC=2sinAcosB

(1+tana+cota)/(1+tan^2a+tana)-cota/(1+tan^2a)=(1+sina/cosa+cosa/sina)/(1+sina^2/cosa^2a+sina/cosa)-c

a/sinA=b/sinB=c/sinC=2RS△ABC=(ab/2)·sinC=(bc/2)·sinA=(ac/2)·sinB=abc/(4R)故S=(ab/2)·sinC=1/2a*asinB/s

由正弦定理得sinB=b*(sinA/a)sinC=c*(sinA/a)代入得(1/2)*a^2*[(sinBsinC)/sinA]=(1/2)*a^2*[(sinA*bc)/a^2]=(1/2)*b

三角形面积公式为：S=(1/2)abSinC=(1/2)acSinB=(1/2)bcSinA证：已知S=(1/2)a²sinBsinC/sinA由正弦定理：a/SinA=b/SinB=c/S

令k=a/sinA=b/sinBb=ksinB因为S=1/2absinC=1/2a*ksinBsinC=1/2a*(a/sinA)sinBsinC=1/2*a^2*sinBsinC/sinA

S=1/2*absinC这个公式吧,他是由bsinA是高乘以底a得来的现在只要证出1/2*absinC=1/2*a^2*(sinBsinC)/(sinA)就可以了也就是bsinC=a*(sinBsin

^2+c^2-a^2=2bccosA=bc,cosA=1/2,A=60°(sinB)^2+(sinC)^2-3/4=sinBsinC=3/4(sinB)^2+(sinC)^2=3/2(sinB)^2+

设三角形的顶点为A、B、C,对应的边长为a、b、c.过顶点B做AC边上的垂线,设垂线长度为h,则有h=asinC.SΔABC＝h*b/2=absinC/2正弦定理a/sinA=b/sinB可得b=as

cos²(A/2)=(1+cosA)/2=sinBsinC1+cos(180-B-C)=2sinBsinC1-cos(B+C)=2sinBsinC1-(cosBcosC-sinBsinC)=

-cosBcosC+sinBsinC-√2/2=0cosBcosC-sinBsinC=-√2/2cos(B+C)=-√2/2cos(π-A)=-√2/2-cosA=-√2/2cosA=√2/2A=π/

这类问题无非两个思路,一个是转化为角,用三角函数解决,另一个就是转化为边,用代数方法法一：sinA=2*sinB*cosC=sin(B+C)+sin(B-C)=sinA+sin(B-C)sin(B-C

sinA=sin(B+C)=sinBcosC+sinCcosBsinA=2sinBsinCsinBcosC+sinCcosB=2sinBsinCB=CABC为等腰三角形

a/sinA=b/sinB=c/sinC=t(at)^2=(bt)^2+(bt*ct)+(ct)^2a^2=b^2+bc+c^2b^2+c^2-a^2=-bccosA=(b^2+c^2-a^2)/(2

由三角形ABC中sinA：a=sinB:b=sinC:c得a^2=b^2+bc+c^21/2=(b^2+c^2-a^2)/2bc又由cosA=(b^2+c^2-a^2)/2bccosA=1/2A=60

由a/sinA=b/sinB=c/sinC所以sin²A=sinBsinC则a²=bc2a=b+c则a²=(b+c)²/4=bcb²+c²+

sinA=2sinBsinCsin(B+C)=2sinBsinCsinBcosC+cosBsinC=2sinBsinCtanB+tanC=2tanBtanC或者cotB+cotC=2

(sin²a-2sinacosa-cos²a)/(4cos²a-3sinacosa)（题目是这样吗）分子分母同时除以cos²a得原式=（tan²a-2

①cosBcosC-sinBsinC=cos(B+C)=cos(π-A)=-cosA则cosA=-1/2又A∈(0,π)则A=2π/3②若a=2√3则由余弦定理a²=b²+c

题目写的太乱盗版的题吧--!纠错之后好像是用a/sina=b/sinb=c/sinc

∵sinBsinC=cos2A/2∴1＋cosA＝2sinBsinC∴2sinBsinC－cosA＝1,即2sinBsinC＋cos(B＋C)＝1,即cos(B－C)＝1∵在△ABC中,－π＜B－C＜