求证:△ABC中,若sinc=cosA cosB,则A,B中必有一个较为直角
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利用正弦定理a/sinA=b/sinB=c/sinC=2R(R为三角形ABC外接圆的半径)则sinA=2R/asinB=2R/bsinC=2R/c将这三个式子带入题目左边,就能得到0
由正弦定理,a/sinA=b/sinB=c/sinC=2R,得sinA=a/2R,sinB=b/2R,sinC=c/2R从而由sin²A=sin²B+sin²C,得a
(1)方法一根据正弦定理,原式可变形为:c(cosA+cosB)=a+b.①∵根据任意三角形射影定理(又称“第一余弦定理”):a=b·cosC+c·cosBb=c·cosA+a·cosC∴a+b=c(
证明:∵在三角形ABC中,∴A+B+C=180度,得SINA=SIN(B+C)则A/2=90度-(B+C)/2,得COSA/2=SIN((B+C)/2)左边=Sin(B+C)+SinB+SinC则4C
证明:∵在三角形ABC中,∴A+B+C=180度,得SINA=SIN(B+C)则A/2=90度-(B+C)/2,得COSA/2=SIN((B+C)/2)左边=Sin(B+C)+SinB+SinC则4C
根据正弦及余弦定理可得sin(A-B)/sinC=(sinAcosB-cosAsinB)/sinC=(acosB-bcosA)/c=[(a²+c²-b²)/2c-(b
题目应该是在锐角三角形中.诚如是,则解答如下:先证明sinA+sinB>1+cosC.由A、B是锐角得A-B0,所以sinA+sinB>1+cosC.所以sinA+sinB+sinC>1+cosC+s
(sinA+sinB+sinC)/(cosA+cosB+cosC)=√3sinA+sinB+sinC=√3cosA+√3cosB+√3cosC(sinA-√3cosA)+(sinB-√3cosB)+(
正弦定理令1/x=a/sinA=b/sinB=c/sinC则sinA=axsinB=bxsinC=cx所以左边=(ac+bx)/cx=(a+b)/c=右边命题得证
1.假设a/sinA=b/sinB=c/sinC=2R那么sinA=a/2RsinB=b/2RsinC=c/2R因为(sinA)平方=(sinB)平方+sinC(sinB+sinC)所以(a/2R)^
由正弦定理:a/sinA=c/sinCa/c=sinA/sinC,两边同时乘以2cosB,左边分子分母同乘以c.得:2ac*cosB/c²=2sinAcosB/sinC.由余弦定理a
sinA=(sinB+sinC)/(cosB+cosC)sin(B+C)=(sinB+sinC)/(cosB+cosC)sinBcosC+cosBsinC=(sinB+sinC)/(cosB+cosC
sinA+sinB=sinC可以直接推导出a+b=c的而a+b=c就能推导出是直角三角形这两个互换是根据正弦定理a/sinA=b/sinB=c/sinC=ka=ksinA,b=ksinB,c=ksin
因为tanA(tanB-tanC)=tanBtanC即sinA/cosA(sinB/cosB-sinC/cosC)=sinBsinC/cosBcosCsinA(sinBcosC-cosBsinC)=c
证明:∵△ABC是锐角三角形,A+B>π2,∴π2>A>π2−B>0∴sinA>sin(π2−B),即sinA>cosB;同理sinB>cosC;sinC>cosA,∴sinA+sinB+sinC>c
因为a/sinA=b/sinB=c/sinC=2R所以a=2R*sinA.b=2R*sinB.c=2R*sinC(a+b)/c=(2R*sinA+2R*sinB)/2R*sinC=(sinA+sinB
4cos(A/2)cos(B/2)cos(C/2)=4cos(A/2)cos(B/2)cos(pi/2-A/2-B/2)=4cos(A/2)cos(B/2)sin(A/2+B/2)=4cos(A/2)
sin(A-B)/sinC=(sinAcosB-COSAsinB)/sinC=(acosB-bcosA)/ccosB=(a²+c²-b²)/2accosA=(b²
∵acosA+bcosB=ccosC∴sinAcosA+sinBcosB=sinCcosC∴sin2A+sin2B=sin2C=sin(2π-2A-2B)=-sin(2A+2B)∴0=sin2A+si
sinA·cos²C/2+sinC·cos²A/2=3/2sinB∵cos²C/2=1/2(1+cosC),cos²A/2=1/2(1+cosA)∴sinA*1