作业帮化简cos{[(4n+1)π/4]+α}+cos{[(4n-1)π/4]-α},(n∈Z)
来源:学生作业帮助网 编辑:作业帮 时间:2024/05/14 13:33:21
![化简cos{[(4n+1)π/4]+α}+cos{[(4n-1)π/4]-α},(n∈Z)](/uploads/image/z/1021980-12-0.jpg?t=%E5%8C%96%E7%AE%80cos%7B%5B%284n%2B1%29%CF%80%2F4%5D%2B%CE%B1%7D%2Bcos%7B%5B%284n-1%29%CF%80%2F4%5D-%CE%B1%7D%2C%EF%BC%88n%E2%88%88Z%EF%BC%89)
化简cos{[(4n+1)π/4]+α}+cos{[(4n-1)π/4]-α},(n∈Z)
化简cos{[(4n+1)π/4]+α}+cos{[(4n-1)π/4]-α},(n∈Z)
化简cos{[(4n+1)π/4]+α}+cos{[(4n-1)π/4]-α},(n∈Z)
cos{[(4n+1)π/4]+α}+cos{[(4n-1)π/4]-α}
=cos[nπ+(π/4)+α]+cos[nπ-(π/4)-α]
当n为偶数时
原式=cos[(π/4)+α]+cos[(π/4)+α]
=2cos[(π/4)+α]
=√2(cosα-sinα);
当n为奇数时
原式=-cos[(π/4)+α]-cos[(π/4)+α]
=-2cos[(π/4)+α]
=-√2(cosα-sinα);
综上,原式=±√2(cosα-sinα).
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