已知三角形ABC中,sinA(sinB+cosB)-sinC=0,sinB-cos2C=0求角A、B、C分别多大?
网友回答
sinA(sinB+cosB)-sinC=0 ----- sinB(sinA-cosA) = 0
sinA = cosA ,A = 45
sinB-cos2C= sinB - cos(2B + 90) = sinB - sin2B = sinB(1-2cosB) = 0
cosB = 1/2 ,B = 60
C = .======以下答案可供参考======
供参考答案1:
三角形ABC中,A+B+C=π,C=π-(A+B),
sinC=sin(A+B)=sinAconB+conAsinB,
conC=con(A+B)=conAconB-sinAsinB,
sinA(sinB+cosB)-sinC=0,
sinAsinB+sinAconB=sinAconB+conAsinB,
sinA=conA,
因为 0sinB-cos2C=0,
sinB=con2C=-con(2A+2B)=
=-con(90º+2B)=
=2sinBconB,
conB=0.5,
B=π/3=60º,
C=π-π/4-π/3=5π/12=75º.
供参考答案2:
.....解如下:
因为sinA(sinB+cosB)-sinC=0
所以sinAsinB+sinAcosB=sinAcosB+sinBcosA
所以sinA=cosB 可得A=45或135(舍)
因为sinB-cos2C=0
所以根号2(sinC+cosC)=cosC平方-sinC平方
所以根号2sin(C+45)=根号2
所以C=45 所以B=90 .....~