(1)m=0,
f(x)=(sinx)^2+sinxcosx
=(1-cos2x)/2+sin2x/2
=根号2/2*(sin(2x-pi/4)+1/2
x=[pi/8,3pi/4],2x-pi/4=[0,5pi/4],sin(2x-pi/4)=[-根号2/2,1]
f(x)=[0,根号2/2+1/2]
(2) tanA=2,
f(x)=3/4*(1-cos2x)-m/2[(cos2x)-cos(pi/2)] (积化和差公式)
tanA=2, cos2A=(1-tanA^2)/(1+tanA^2)=-3/5 (二倍角公式)
f(A)=3/4(1+3/5)-m/2(-3/5-0)=3/5, m=-2
(1)当m=0时,f(x)=(1+1/tanx)(sinx)^2=(sinx)^2+sinxcosx
由三角函数的降次公式与积化和差公式化简整理得f(x)=(1+sin2x-cos2x)/2=1/2+√2[sin2xcos(-π/4)+sin(-π/4)cos2x]=1/2+√2sin(2x-π/4)
所以当x∈[π/8,3π/4],f(x)的取值范围为[-1/2,1/2+√2],
(2)依题意f(a)=3/2(sinx)^2+msin(a+π/4)cos(a-π/4),由tana=2=sina/cosa,和(sinx)^2+(cosx)^2=1可得(sinx)^2=4/5,cosx)^2=1/5
同样由降次公式和积化和差化简整理得f(a)=6/5-m/2×[1-2(sinx)^2]=3/5
所以m=2
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