在三角形ABC中,若sin(2π-A)=-根号二sin(π-B),根号三cosA=-根号二(π-B)-sinA=-√2sinB,sinA=√2sinB√3cosA=√2cosB,cosA=√(2/3)cosB(sinA)^2+(cosA)^2=1所以2(sinB)^2+(2/3)(cosA)^2=1(4/3)(sinB)^2+(2/3)[(sinB)^2+(cosA)^2]=1(4/3)(sinB)^2
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![在三角形ABC中,若sin(2π-A)=-根号二sin(π-B),根号三cosA=-根号二(π-B)-sinA=-√2sinB,sinA=√2sinB√3cosA=√2cosB,cosA=√(2/3)cosB(sinA)^2+(cosA)^2=1所以2(sinB)^2+(2/3)(cosA)^2=1(4/3)(sinB)^2+(2/3)[(sinB)^2+(cosA)^2]=1(4/3)(sinB)^2](/uploads/image/z/1122987-3-7.jpg?t=%E5%9C%A8%E4%B8%89%E8%A7%92%E5%BD%A2ABC%E4%B8%AD%2C%E8%8B%A5sin%282%CF%80-A%29%3D-%E6%A0%B9%E5%8F%B7%E4%BA%8Csin%28%CF%80-B%29%2C%E6%A0%B9%E5%8F%B7%E4%B8%89cosA%3D-%E6%A0%B9%E5%8F%B7%E4%BA%8C%28%CF%80-B%29-sinA%3D-%E2%88%9A2sinB%2CsinA%3D%E2%88%9A2sinB%E2%88%9A3cosA%3D%E2%88%9A2cosB%2CcosA%3D%E2%88%9A%282%2F3%29cosB%28sinA%29%5E2%2B%28cosA%29%5E2%3D1%E6%89%80%E4%BB%A52%28sinB%29%5E2%2B%282%2F3%29%28cosA%29%5E2%3D1%284%2F3%29%28sinB%29%5E2%2B%282%2F3%29%5B%28sinB%29%5E2%2B%28cosA%29%5E2%5D%3D1%284%2F3%29%28sinB%29%5E2)
在三角形ABC中,若sin(2π-A)=-根号二sin(π-B),根号三cosA=-根号二(π-B)-sinA=-√2sinB,sinA=√2sinB√3cosA=√2cosB,cosA=√(2/3)cosB(sinA)^2+(cosA)^2=1所以2(sinB)^2+(2/3)(cosA)^2=1(4/3)(sinB)^2+(2/3)[(sinB)^2+(cosA)^2]=1(4/3)(sinB)^2
在三角形ABC中,若sin(2π-A)=-根号二sin(π-B),根号三cosA=-根号二(π-B)
-sinA=-√2sinB,sinA=√2sinB
√3cosA=√2cosB,cosA=√(2/3)cosB
(sinA)^2+(cosA)^2=1
所以2(sinB)^2+(2/3)(cosA)^2=1
(4/3)(sinB)^2+(2/3)[(sinB)^2+(cosA)^2]=1
(4/3)(sinB)^2+(2/3)=1
(sinB)^2=1/4
(4/3)(sinB)^2+(2/3)[(sinB)^2+(cosA)^2]=1这玩意怎么得出来的
在三角形ABC中,若sin(2π-A)=-根号二sin(π-B),根号三cosA=-根号二(π-B)-sinA=-√2sinB,sinA=√2sinB√3cosA=√2cosB,cosA=√(2/3)cosB(sinA)^2+(cosA)^2=1所以2(sinB)^2+(2/3)(cosA)^2=1(4/3)(sinB)^2+(2/3)[(sinB)^2+(cosA)^2]=1(4/3)(sinB)^2
2(sinB)^2+(2/3)(cosA)^2=1
(4/3+2/3)(sinB)^2+(2/3)(cosA)^2=1
(4/3)(sinB)^2+(2/3)(sinB)^2+(2/3)(cosA)^2=1
(4/3)(sinB)^2+(2/3)[(sinB)^2+(cosA)^2]=1
-sinA=-√2sinB,sinA=√2sinB
√3cosA=√2cosB,cosA=√(2/3)cosB
(sinA)^2+(cosA)^2=1
所以2(sinB)^2+(2/3)(cosA)^2=1
(4/3)(sinB)^2+(2/3)[(sinB)^2+(cosA)^2]=1
(4/3)(sinB)^2+(2/3)=1
(sinB)^2=...
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-sinA=-√2sinB,sinA=√2sinB
√3cosA=√2cosB,cosA=√(2/3)cosB
(sinA)^2+(cosA)^2=1
所以2(sinB)^2+(2/3)(cosA)^2=1
(4/3)(sinB)^2+(2/3)[(sinB)^2+(cosA)^2]=1
(4/3)(sinB)^2+(2/3)=1
(sinB)^2=1/4
三角形内角在0到180度之间
所以sinB>0
所以sinB=1/2,B=30度或150度
sinA=√2sinB=√2/2,A=45度或135度
若B=150度,则A+C=30度,和A=45度或135度矛盾
所以B=30度
所以cosB=√3/2
cosA=√(2/3)cosB=√2/2
所以A=45度
综上
A=45度
B=30度
C=105度
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