原式=绝对值[sin(θ/2)+cos(θ/2)]-绝对值[sin(θ/2)-cos(θ/2)]
因为0<θ<π,故0<θ/2<π/2.sin(θ/2)与cos(θ/2)都大于0。
当0<θ/2≤π/4时,sin(θ/2)≤cos(θ/2),
故上式=sin(θ/2)+cos(θ/2)+[sin(θ/2)-cos(θ/2)]=2sin(θ/2)
当π/4<θ/2≤π/2时,sin(θ/2)≥cos(θ/2),
故上式=sin(θ/2)+cos(θ/2)-[sin(θ/2)-cos(θ/2)]=2cos(θ/2)
原式=1+sinθ-(1-sinθ)
=2sinθ
因为sinθ∈【-1,1】
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