作业帮若函数f(x)=[(2sin(x+π/6)+x^4+x)/(x^4+cosx)]+1在[-π/2,π/2]上的最大值与最小值分别为M和N,则有( )A.M-N=2B.M+N=2C.M-N=4D.M+N=4
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![若函数f(x)=[(2sin(x+π/6)+x^4+x)/(x^4+cosx)]+1在[-π/2,π/2]上的最大值与最小值分别为M和N,则有( )A.M-N=2B.M+N=2C.M-N=4D.M+N=4](/uploads/image/z/12491555-59-5.jpg?t=%E8%8B%A5%E5%87%BD%E6%95%B0f%28x%29%3D%5B%282sin%28x%2B%CF%80%2F6%29%2Bx%5E4%2Bx%29%2F%28x%5E4%2Bcosx%29%5D%2B1%E5%9C%A8%5B-%CF%80%2F2%2C%CF%80%2F2%5D%E4%B8%8A%E7%9A%84%E6%9C%80%E5%A4%A7%E5%80%BC%E4%B8%8E%E6%9C%80%E5%B0%8F%E5%80%BC%E5%88%86%E5%88%AB%E4%B8%BAM%E5%92%8CN%2C%E5%88%99%E6%9C%89%EF%BC%88+%EF%BC%89A.M-N%3D2B.M%2BN%3D2C.M-N%3D4D.M%2BN%3D4)
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若函数f(x)=[(2sin(x+π/6)+x^4+x)/(x^4+cosx)]+1在[-π/2,π/2]上的最大值与最小值分别为M和N,则有( )A.M-N=2B.M+N=2C.M-N=4D.M+N=4
若函数f(x)=[(2sin(x+π/6)+x^4+x)/(x^4+cosx)]+1在[-π/2,π/2]上的最大值与最小值分别为M和N,则有( )
A.M-N=2
B.M+N=2
C.M-N=4
D.M+N=4
若函数f(x)=[(2sin(x+π/6)+x^4+x)/(x^4+cosx)]+1在[-π/2,π/2]上的最大值与最小值分别为M和N,则有( )A.M-N=2B.M+N=2C.M-N=4D.M+N=4
选D∵2sin(x+π/6)=√3sinx+cosx
∴f(x)=(2sin(x+π/6)+x^4+x)/(x^4+cosx)+1
=(√3sinx+cosx+x^4+x)/(x^4+cosx))+1
=(√3sinx+x)/(x^4+cosx)+2
设g(x)=(√3sinx+x)/(x^4+cosx)
在区间[-π/2,π/2]上,g(-x)=-g(x)
即g(x)在[-π/2,π/2]上奇函数,也就是说函数图像关于原点对称.
设g(x)在[-π/2,π/2]的最大值和最小值分别是T与t
由于g(x)关于原点对称,所以T+t=0
而f(x)=g(x)+2在[-π/2,π/2]的最大值M=T+2,最小值m=t+2
∴M+N=(T+2)+(t+2)=(T+t)+(2+2)=4
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