已知函数f(x)=[sinxsin(π/3-x)]/[2sin^2 (2π/3) ],设g(x)=6mf(x)+1,x∈(0,π/3),是否存在正实数m,
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f(x)=[sinxsin(π/3-x)]/[2sin^2 (2π/3) ]
2sin^2 (2π/3)=3/2
sinxsin(π/3-x)=4分之根号3*sin2x-(1-cos2x)/4=1/2*sin(2x+π/6)-1/4
f(x)=[1/2*sin(2x+π/6)-1/4]/(3/2)=1/3*sin(2x+π/6)-1/6
g(x)=6mf(x)+1=6m*[1/3*sin(2x+π/6)-1/6]+1=2m*sin(2x+π/6)-m+1
x∈(0,π/3) 2x+π/6∈(π/6,5π/6)
sin(2x+π/6)∈(1/2,1]
g(x)=2m*sin(2x+π/6)-m+1∈(1,m+1]
函数g(x)的值域为(1,5/4]
m+1=5/4, m=1/4
2sin^2 (2π/3)=3/2
sinxsin(π/3-x)=4分之根号3*sin2x-(1-cos2x)/4=1/2*sin(2x+π/6)-1/4
f(x)=[1/2*sin(2x+π/6)-1/4]/(3/2)=1/3*sin(2x+π/6)-1/6
g(x)=6mf(x)+1=6m*[1/3*sin(2x+π/6)-1/6]+1=2m*sin(2x+π/6)-m+1
x∈(0,π/3) 2x+π/6∈(π/6,5π/6)
sin(2x+π/6)∈(1/2,1]
g(x)=2m*sin(2x+π/6)-m+1∈(1,m+1]
函数g(x)的值域为(1,5/4]
m+1=5/4, m=1/4
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