高一数学三角函数题——急!!!
已知cos(π/4+x)=4/5,x属于(-π/2,-π/4),求(sin2x-2sin²x)/(1+tanx)的值...
已知cos(π/4+x)=4/5,x属于(-π/2,-π/4),求(sin2x-2sin²x)/(1+tanx)的值
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解:cos(π/4+x)=4/5
cos(π/2+2x)=2cos²(π/4+x)-1=7/25
cos(π/2+2x)=-sin2x
sin2x=-7/25
x∈(-π/2,-π/4)
2x∈(-π,-π/2)
cos2x=-24/25
(sin2x-2sin²x)/(1+tanx)=(sin2x-1+cos2x)/[1+sin2x/(1+cos2x)]
=28/75
cos(π/2+2x)=2cos²(π/4+x)-1=7/25
cos(π/2+2x)=-sin2x
sin2x=-7/25
x∈(-π/2,-π/4)
2x∈(-π,-π/2)
cos2x=-24/25
(sin2x-2sin²x)/(1+tanx)=(sin2x-1+cos2x)/[1+sin2x/(1+cos2x)]
=28/75
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cosx -sinx = 4/5*sqrt(2)
sin2x = 1 -(cosx -sinx)^2 = 1 - 32/25 = -7/25;
(cosx+ sinx)^2 = 1+sin2x = 18/25;
cosx+ sinx = - 3sqrt(2)/5;
(sin2x-2sin²x)/(1+tanx) = 2sin(x) (cos(x) -sin(x)/(1+tanx) = sin2x(cosx -sinx)/(cosx+sinx)
= -7/25*4/5sqrt(2)/(-3/5sqrt(2) = 28/75
sin2x = 1 -(cosx -sinx)^2 = 1 - 32/25 = -7/25;
(cosx+ sinx)^2 = 1+sin2x = 18/25;
cosx+ sinx = - 3sqrt(2)/5;
(sin2x-2sin²x)/(1+tanx) = 2sin(x) (cos(x) -sin(x)/(1+tanx) = sin2x(cosx -sinx)/(cosx+sinx)
= -7/25*4/5sqrt(2)/(-3/5sqrt(2) = 28/75
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