作业帮.[1/cos(-α)+cos(180°+ α )]/[1/sin(540°-α)+sin(360°-α)]=tan^3α
来源:学生作业帮助网 编辑:作业帮 时间:2024/05/03 05:18:06
![.[1/cos(-α)+cos(180°+ α )]/[1/sin(540°-α)+sin(360°-α)]=tan^3α](/uploads/image/z/1802050-34-0.jpg?t=.%5B1%2Fcos%28-%CE%B1%29%2Bcos%28180%C2%B0%2B+%CE%B1+%29%5D%2F%5B1%2Fsin%28540%C2%B0-%CE%B1%29%2Bsin%28360%C2%B0-%CE%B1%29%5D%3Dtan%5E3%CE%B1)
.[1/cos(-α)+cos(180°+ α )]/[1/sin(540°-α)+sin(360°-α)]=tan^3α
.[1/cos(-α)+cos(180°+ α )]/[1/sin(540°-α)+sin(360°-α)]=tan^3α
.[1/cos(-α)+cos(180°+ α )]/[1/sin(540°-α)+sin(360°-α)]=tan^3α
cos(-α)=cosα,
cos(180°+ α)= -cosα
sin(540°-α)=sinα
sin(360°-α)= -sinα
所以
原式左边
=(1/cosα -cosα) / (1/sinα -sinα)
=(1-cos²α)/cosα / (1-sin²α)/sinα
=(sin²α/cosα) / (cos²α)/cosα
=(sinα/cosα)^3
=tan^3 α
这样就得到了答案
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.[1/cos(-α)+cos(180°+ α )]/[1/sin(540°-α)+sin(360°-α)]=tan^3α
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