cosC=4分之3,sinC等于多少
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由正弦定理可得;sinA:sinB:sinC=a:b:c=2:3:4可设a=2k,b=3k,c=4k(k>0)由余弦定理可得,CosC=a2+b2−c22ab=4k2+9k2−16k22•2k•3k=
a:b:c=sinA:sinB:sinC=2:3:4,则设:a=2t、b=3t、c=4t,则:cosC=(a²+b²-c²)/(2ab)=-1/4
令a/sinA=b/sinB=c/sinC=ka:b:c=ksinA:ksinB:ksinC=2:3:4设a=2x,b=3x,c=4xcosC=(a²+b²-c²)/2a
因为sinA:sinB:sinc=2:3:4,根据正弦定理有a:b:c=2:3:4(abc为角ABC所对的角),根据余弦定理又有cosC=(a^2+b^2-c^2)/2ab=(4+9-16)/(2*3
由正弦定理知a:b:c=2:3:4设a=2kb=3kc=4k由余弦定理cosA=(b²+c²-a²)/(2bc)=(9k²+16k²-4k²
a/sinA=2r∴sinA=a/2r∴原比例可转化为:a:b:c=4:5:6设a=4k,b=5k,c=6kcosA=[(25+36-16)/(2*5*6)]k=(3/4)k同理,cosB=(9/16
sinC-√3/2+√3cosC-2sinCcosC=0(sinC-√3/2)-2cosC(sinC-√3/2)=0(sinC-√3/2)(cosC-1/2)=0∴sinC=√3/2或cosC=1/2
在三角形中sinA:sinB:sinC=a:b:c然后再用三角形余弦定理cosC=(a"b"-c")/2ab算出来就OK了.
Ⅰ在三角形ABC中,有a/sinA=b/sinB=c/sinC那么假设三边为a=2n,b=3n,c=4n在三角形ABC中,有a^2=b^2+c^2-2bccosA那么cosA=(b^2+c^2-a^2
解,根据正弦定理a/sinA=b/sinB=c/sinC=2R得sinA=a/2R,sinB=b/2R,sinC=c/2R已知sinA:sinB:sinC=3:2:4得a:/b:c=3:2:4令a=3
正弦定理得:a:b:c=sinA:sinB:sinC=2:3:4设:a=2k,b=3k,c=4kcosC=(a^2+b^2-c^2)/(2ab)=(4k^2+9k^2-16k^2)/(2*2k*3k)
sinA:sinB:sinC=3:2:4由正弦定理,化为边的形式a:b:c=3:2:4设a=3kb=2kc=4k由余弦定理cosC=(a²+b²-c²)/(2ab)=(9
第一问算对,就不用详解了吧,设sinA=7m,sinB=5m,sinC=3m就可以算出cosA,cosB,cosC.第二问应该错了cosA=-1/2cosB=11/14cosC=13/14sinA=±
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)
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
,{sin(A-B)+sinC)/{cos(A-B)+cosC}=,{sin(A-B)+sin(A+B))/{cos(A-B)-cos(A+B)}=2sinAcosB/2sinAsinB=cosB/s
xsina+ycosa=A(x/Asina+y/Acosb)=A(cosbsina+sinbcosa)=Asin(a+b),其中A=√(x^2+y^2),b=arctan(y/x)所以,这种题首先要除
sinC-cosC=√2sin(C-π/4)=√2cos(3π/4-C)=-√2cos(π/4+C)显然C>=π/4,否则cosC>=√2/2,sinC+sinB=√3+cosC>=2,不可能成立因此
根据正弦定理sinA:sinB:sinC=a:b:c=3:2:4设a=3t,b=2t,c=4ta+b+c=9t=9t=1a=3,b=2,c=4根据余弦定理cosC=(a^2+b^2-c^2)/2ab=
由sinc+cosc=2sina平方可得1+2sinc*cosc=4sin^2a因sinc*cosc=sin^2b所以1+2sin^2b=4sin^2a2-4sin^2a=1-2sin^2b2cos2