作业帮若x∈[-π/3,2π/3],求函数y=cos^2(x+π/6)+sin(x+2π/3)的最大值与最小值
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![若x∈[-π/3,2π/3],求函数y=cos^2(x+π/6)+sin(x+2π/3)的最大值与最小值](/uploads/image/z/1105210-10-0.jpg?t=%E8%8B%A5x%E2%88%88%5B-%CF%80%2F3%2C2%CF%80%2F3%5D%2C%E6%B1%82%E5%87%BD%E6%95%B0y%3Dcos%5E2%EF%BC%88x%2B%CF%80%2F6%EF%BC%89%2Bsin%28x%2B2%CF%80%2F3%29%E7%9A%84%E6%9C%80%E5%A4%A7%E5%80%BC%E4%B8%8E%E6%9C%80%E5%B0%8F%E5%80%BC)
若x∈[-π/3,2π/3],求函数y=cos^2(x+π/6)+sin(x+2π/3)的最大值与最小值
若x∈[-π/3,2π/3],求函数y=cos^2(x+π/6)+sin(x+2π/3)的最大值与最小值
若x∈[-π/3,2π/3],求函数y=cos^2(x+π/6)+sin(x+2π/3)的最大值与最小值
原式可化为y=sin²(π/3-x)+sin(π/3-x)
令t=sin(π/3-x)
则y=t²+t=(t+1/2)²-1/4
∵x∈[-π/3,2π/3]
∴π/3-x∈[-π/3,2π/3]
∴t∈[负二分之根号三,1]
所以y∈[-1/4,2]
即y最大值为2,最小值为-1/4