设三角形ABC的内角A、B、C的对边长分别为abc,且3b^2+3c^2-3a^2=4(根号下2)bc
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解决时间 2021-04-02 08:34
- 提问者网友:城市野鹿
- 2021-04-01 16:04
设三角形ABC的内角A、B、C的对边长分别为abc,且3b^2+3c^2-3a^2=4(根号下2)bc
最佳答案
- 五星知识达人网友:你可爱的野爹
- 2021-04-01 16:46
余弦定理
CosA = (b^2+c^2-a^2)/(2bc) = 2/3 * 根号(2)
所以(SinA)^2 = 1-(CosA)^2 = 1 - 8/9 = 1/9
所以SinA = 1/3 因为A是 0~π的角,SinA>0
2
B+C = π - A
所以分子变为
2Sin(A + π/4)Sin(π - A + π/4) = 2Sin(A + π/4) Sin(A-π/4)
= - (Cos(A + π/4 + A - π/4) - Cos(A + π/4 - A + π/4) = - (Cos2A -0) = -Cos2A
则原式化为
Cos2A/(Cos2A-1)
而Cos2A = 1-2(SinA)^2 二倍角公式
SinA = 1/3
所以Cos2A = 1 - 2/9 = 7/9
那么原式 = 7/9 / (7/9 -1) = -7/2
CosA = (b^2+c^2-a^2)/(2bc) = 2/3 * 根号(2)
所以(SinA)^2 = 1-(CosA)^2 = 1 - 8/9 = 1/9
所以SinA = 1/3 因为A是 0~π的角,SinA>0
2
B+C = π - A
所以分子变为
2Sin(A + π/4)Sin(π - A + π/4) = 2Sin(A + π/4) Sin(A-π/4)
= - (Cos(A + π/4 + A - π/4) - Cos(A + π/4 - A + π/4) = - (Cos2A -0) = -Cos2A
则原式化为
Cos2A/(Cos2A-1)
而Cos2A = 1-2(SinA)^2 二倍角公式
SinA = 1/3
所以Cos2A = 1 - 2/9 = 7/9
那么原式 = 7/9 / (7/9 -1) = -7/2
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