在△ABC,sin²C-sin²B=sinBcosB-根3sinCcosC

sin²B+sin²C=sin²A+sinBsinC,正弦定理：sinA=A/2R,sinB=b/2R,sinC=c/2R,b²+c²=a²

sin^2A+sin^2B=sin^2C利用三角形正弦定理sinA/a=sinB/b=sinC/c显然a^2+b^2=c^2所以边c所对的角C为直角.

①在△ABC中,sin²A-sin²C+sin²B＝sinA·sinB.则角C度数(²为平方）由正弦定理,sinA=a/2R,sinB=b/2R,sinC=c/

原式可化为a^2+b^2-c^2=ab也即是a^2+b^2-c^2/2ab=1/2也即是cosC=1/2所以C=60°联立2sinC=sinA+sinB可得等边三角形

sin²A+sin²B=2sin²C由正弦定理a^2+b^2=2c^2代入余弦定理：cosC=(a^2+b^2-c^2)/(2ab)=c^2/(2ab)>0所以：cosC

用正弦定理化作a^2-b^2+c^2=ac整理得到cosB=a^2-b^2+c^2/2ac=1/2B=π/3

为直角三角形,利用正弦定理即可得到：因为：sinA/a=sinB/b=sinC/c设上式等于t,则有：sinA=at；sinB=bt;sinC=ct;代入后得到：a^2t^2+b^2t^2=c^2t^

解题思路：第一问利用正弦定理求解，第二问先证明三角形是直角三角形，然后求出外接圆面积解题过程：

sin²B+sin²C=sin²A+sinBsinC由正弦定理得到b^2+c^2=a^2+bc余弦定理得到cosA=(b^2+c^2-a^2)/2bc=1/2又在三角形中

由正弦定理,原式可化为a^2+c^2-ac=b^2即[(a^2+c^2-b^2)/2ac]=0.5即cosB=0.5∴B=π/3

∵在△ABC中,sin(A+B)=sinC∴sinC·sin(A-B)=sin²Csin(A-B)=sinC又∵sinC=sin(A+B)∴sin(A-B)=sin(A+B)sinAcosB

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根据正玄定理原式=a^2+b^2=2c^2cosC=(a^2+b^2-c^2)/2ab=(a^2+b^2)/4ab>=2ab/4ab=1/2所以∠C

sin方A+sin方B=sin方C根据正弦定理：a/sinA=b/sinB=c/sinC=2Ra^2/(2R)^2+b^2/(2R)^2=c^2/(2R)^2即：a^2+b^2=c^2,符合勾股定理,

sin^2A+sin^2B=sin^2C=sin^2(A+B)=(sinAcosB+sinBcosA)^2=sin^2Acos^2B+sin^2Bcos^2A+2sinAcosAsinBcosB左边减

sin^2A+sin^2B+sin^2C=(1-cosA)/2+(1-cosB)/2+(1-cos^2C)=2-cos(A+B)cos(A-B)-cos^2C=2+cosCsoc(A-B)-cos^2

这是个直角三角形用正弦定理证明a/sinA=b/sinB=c/sinC=ksinA=a/k,sinB=b/k,sinC/c/k代入sin²A=sin²B+sin²C即可得

sin^2A+sin^2B+sin^2C=(1-cosA)/2+(1-cosB)/2+(1-cos^2C)=2-cos(A+B)cos(A-B)-cos^2C=2+cosCsoc(A-B)-cos^2

/c=sinB/sinC&bsinB=csinC=>sinB/sinC=c/b=>b/c=c/b=>b^2=c^2i.e.b=c=>B=C=>A=180度-2B=>sinA=sin(2B)=>sin^

改了结果相同由正弦定理a/sinA=b/sinB=c/sinC(sinA)^2=(sinB)^2+(sinC)^2等价于a^2=b^2+c^2可知△ABC直角三角形A=π/2sinA=2sinBcos