作业帮证明:(sinθ)^4+(sin2θ)^4/4+(sin4θ)^4/16+(sin8θ)^4/64=(sinθ)^2-(sin16θ)^/256
来源:学生作业帮助网 编辑:作业帮 时间:2024/05/04 14:12:05
证明:(sinθ)^4+(sin2θ)^4/4+(sin4θ)^4/16+(sin8θ)^4/64=(sinθ)^2-(sin16θ)^/256
证明:(sinθ)^4+(sin2θ)^4/4+(sin4θ)^4/16+(sin8θ)^4/64=(sinθ)^2-(sin16θ)^/256
证明:(sinθ)^4+(sin2θ)^4/4+(sin4θ)^4/16+(sin8θ)^4/64=(sinθ)^2-(sin16θ)^/256
(sinθ)^4=(sinθ)^2(1-(cosθ)^2)=(sinθ)^2-(sinθcosθ)^2=(sinθ)^2-(sin2θ)^2/4
所以(sinθ)^4+(sin2θ)^4/4=(sinθ)^2-(sin2θ)^2/4+(sin2θ)^4/4=(sinθ)^2-(sin2θ)^2/4(1-(sin2θ)^2)=(sinθ)^2-(sin2θ)^2(cos2θ)^2)/4=(sinθ)^2-(sin4θ)^2/16
同理 一直加到(sin8θ)^4/64 同样的变换 结果等于(sinθ)^2-(sin16θ)^/256
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证明:(sinθ)^4+(sin2θ)^4/4+(sin4θ)^4/16+(sin8θ)^4/64=(sinθ)^2-(sin16θ)^/256
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