sinb=2sina*sinc,若a=b,求cosb
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sinA+sinC=2sinBa+c=2bb=(a+c)/2,代人a^2-c^2=ac-bca^2-c^2=ac-((a+c)/2)c2a^2-ac-3c^2=0(2a-3c)(a+c)=02a-3c
sinA:sinB:sinC=2:3:4a:b:c=2:3:4(4K)²=(2k)²+(3K)²-2*2k*3k*cosCcosC=-1/4sinC=√15/4
由倍角公式:(sinA)^2+(sinB)^2+(sinC)^2=(1-cos2A)/2+(1-cos2B)/2+(1-cos2C)/2=3/2-1/2(cos2A+cos2B+cos2C)(对cos
(Ⅰ)△ABC中,由已知条件可得sin2A-sin2B=2sinAsinC-sin2C,再由正弦定理可得a2+c2-b2=2ac,∴cosB=a2+c2−b22ac=22,∴B=π4.(Ⅱ)∵B=π4
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)^
1).对于第一个等式,两边除以sinA·sinB,并利用正弦定理得到:1=(c^2-a^2)/ab,c^2=a^2+ab,再用余弦定理:c^2=a^2+b^2-2ab·cosC,联立得到:b^2=ab
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
(sinA)^2=(1-cos2A)/2(sinB)^2=(1-cos2B)/2(sinC)^2=(1-cos2C)/2原式可化为3-cos2A-cos2B-cos2C=4cos2A+cos2B+co
分析:首先由条件sinA平方=sinB平方+sinC平方及正弦定理及勾股定理可推得A=90°,再根据另一条件知△ABC必定是特殊的直角三角形.由sinA平方=sinB平方+sinC平方,利用正弦定理得
因为tanA(tanB-tanC)=tanBtanC即sinA/cosA(sinB/cosB-sinC/cosC)=sinBsinC/cosBcosCsinA(sinBcosC-cosBsinC)=c
cosa+cosb+cosc=sina+sinb+sinc=0(cosa)^2=(cosb+cosc)^2=(cosb)^2+(cosc)^2+2*cosb*cosc.(1)(sina)^2=(sin
证明:设sinA/a=sinB/b=sinC/c=k,则sinA=ak,sinB=bk,sinC=ck,sinA/(sinB+sinC)+sinB/(sinA+sinC)+sinC(sinA+sinB
由sinA/a=sinB/b=sinC/c(其中a,b,c为角A,B,C对应的三条边)设sinA/a=sinB/b=sinC/c=k则a=sinA/k,b=sinB/k,c=sinC/k带入(sinB
证:∵△ABC为锐角三角形,∴A+B>90°得A>90°-B∴sinA>sin(90°-B)=cosB,即sinA>cosB,同理可得sinB>cosC,sinC>cosA上面三式相加:sinA+si
sinA-cosB=-2sinC、cosA-sinB=-2cosC则:(sinA-cosB)²+(cosA-sinB)²=(-2sinC)²+(-2cosC)²
2sinB=sinA+sinC,由正弦定理:则2b=a+c,有余弦定理得:b²=a²+c²-2accosB,代入整理得:cosB=[3(a²+c²)/
∵acosA+bcosB=ccosC∴sinAcosA+sinBcosB=sinCcosC∴sin2A+sin2B=sin2C=sin(2π-2A-2B)=-sin(2A+2B)∴0=sin2A+si
(1)(sinA-sinC)²-4(sinB-sinA)(sinC-sinB)=sin²A-2sinAsinC+sin²C-4(sinBsinC-sinAsinC-sin