由 訪客 於 星期日 六月 06, 2021 3:56 pm我們常看到的波形之所以有起點與終點是因為給定一個範圍所致
舉例 sin(x), 0≦x≦360如下示,只是取0~360之間的波形來看,並非sin(x)就是起自0終於360
![](data:image/png;base64,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" alt=")
如此來看,當我們把把角度減了π/2,波形看起來是向右移了90度,但仍是起自負無限終於正無限
所以原本在範圍外的圖形便會跟著補上了
如下圖示sin(x-π/2) , 0≦x≦360
![](data:image/png;base64,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" alt=")
因此當x帶入0時,sin(x-π/2)會等於sin(-π/2),單位圓會自-π/2開始
而當sin(x-π/2)等於sin(0)時,實際上是x走到了π/2,此時單位圓才會到達角度0的位置