∵ y=sin(x+π/6)+sin(x+π/3)
=sinxcos(π/6)+cosxsin(π/6)+sinxcos(π/3)+cosxsin(π/3)
=(1/2+√3/2)sinx+(1/2+√3/2)cosx
=(1/2+√3/2)*√2[sinx*(√2/2)+cosx*(√2/2)]
=(1/2+√3/2)*√2[sinx*cos(π/4)+cosx*sin(π/4)]
=(1/2+√3/2)*√2sin(x+π/4)
∵ y=sinx在（-π/2,π/2）上递增
∴ y=sin(x+π/4)在(-3π/4,π/4)上递增
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