判断△的形状 a cosA=b cosB=c cosC
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由正弦定理:a/sinA=b/sinB所以asinB=bsinA由题意,acosA=bcosB两式相除.得sinBcosB=sinAcosA即sin2B=sin2A所以A=B或2(A+B)=π即A=B
直角三角形a/sinA=b/sinB=c/sinC=ta=tsinAb=tsinBc=tsinCacosA+bcosB=ccosCtsinAcosA+tsinBcosB=tsinCcosCsin2A+
∵cosA=b2+c2-a22bc,cosB=a2+c2-b22ac,∴b2+c2-a22bc•a=a2+c2-b22ac•b,化简得:a2c2-a4=b2c2-b4,即(a2-b2)c2=(a2-b
由正弦定理可知a=2rsinAb=2rsinBc=2rsinC代入acosA+bcosB=ccosC,得sinAcosA+sinBcosB=sinCcosCsin2A+sin2B=2sinCcosC即
正弦定理:sinAcosA=sinBcosB所以sinAcosA-sinBcosB=0所以sin(A-B)=0所以A-B=0所以A=B所以是等腰三角形.
令k=a/sinA=b/sinB=c/sinC所以a=ksinAb=ksinBc=ksinC代入acosA+bcosB=ccosC,并约去ksinAcosA+sinBcosB=sinCcosCsin2
正弦定理,得:sinAcosA+sinBcosB=sinCcosC,即:sin2A+sin2B=2sinCcosC,就是2sin(A+B)cos(A-B)=2sinCcosC,则2sinCcos(A-
∵bcosB+ccosC=acosA,由正弦定理得:sinBcosB+sinCcosC=sinAcosA,即sin2B+sin2C=2sinAcosA,∴2sin(B+C)cos(B-C)=2sinA
∵a=2bcosC,由正弦定理可得,2sinBcosC=sinA=sin(B+C)=sinBcosC+cosBsinC,∴sinBcosC-cosBsinC=0,即sin(B-C)=0,∴B-C=0,
∵bcosB+ccosC=acosA∴sinAcosA=sinBcosB+sinCcosC∴sin2A=sin2B+sin2C∴sin2A=2sin(B+C)cos(B-C)∴2sinAcosA-2s
∵acosA+bcosB=ccosC∴sinAcosA+sinBcosB=sinCcosC∴sin2A+sin2B=sin2C=sin(2π-2A-2B)=-sin(2A+2B)∴0=sin2A+si
解题思路:应用正弦定理解题过程:varSWOC={};SWOC.tip=false;try{SWOCX2.OpenFile("http://dayi.prcedu.com/include/readq.
cosA=(b平方+c平方-a平方)/2bc,同理可得cosb和cosc所以acosA+bcosB=ccosC可转化为(b平方+c平方-a平方)/2bc+(a平方+c平方-b平方)/2ac=(a平方+
cosA=(b^2+c^2-a^2)/2bccosB=(a^2+c^2-b^2)/2accosC=(a^2+b^2-c^2)/2abacosA+bcosB=ccosCa(b^2+c^2-a^2)/2b
acosa=bcosba/sina=b/sinb所以sina/sinb=cosb/cosa所以sinacosa=sinbcosb所以sin2a=sin2b所以2a=2b或者2a+2b=180°所以a=
解,根据正弦定理有a/sinA=b/sinB所以a/b=sinA/sinB=cosB/cosA所以sinA*cosA=sinB*cosB两边乘以2得2*sinA*cosA=2*sinB*cosB即为s
∵acosA+bcosB=ccosC∴sinAcosA+sinBcosB=sinCcosC∴sin2A+sin2B=sin2C=sin(2π-2A-2B)=-sin(2A+2B)∴0=sin2A+si
1.由已知得:sinAcosA=sinBcosB,即sin(2A)=sin(2B),可得答案2.用maple,因为a为锐角,arctan(2.0);a:=(%-Pi/4.0)*2;cos(a+Pi/3
S△ABC=(1/2)BC*AE=9.(AE⊥BC).S△BOC=(1/2)BC*OF(OF⊥BC).可见三角形ABC与OBC是是同底不等高的两个三角形.由相似三角形可证明OF=AE/3.∴S△OBC
由正弦定理asinA=bsinB化简已知的等式得:sinAcosA=sinBcosB,∴12sin2A=12sin2B,∴sin2A=sin2B,又A和B都为三角形的内角,∴2A=2B或2A+2B=π