已知向量a=(cosx-3,sinx)向量b=(cosx,sinx-3),f(x)=向量a乘以向量b,后附小题
5个回答
(1)∵a=(cosx-3,sinx)b=(cosx,sinx-3),f(x)=a·b,
∴f(x)=(cosx-3)cosx+sinx(sinx-3)
=cos²x-3cosx+sin²x-3sinx
=-3(sinx+cosx)+1
=-3√2sin(x+π/4)+1
∴函数f(x)的单调递增区间为:
π/2+2kπ≤x+π/4≤3π/2+2kπ,k∈z(sin(x+π/4)前面系数<0)
即π/4+2kπ≤x≤5π/4+2kπ,k∈z
∵x∈[2π,3π]
∴函数f(x)的单调递增区间为:[9π/4,3π](当k=1时)
(2)∵f(x)=-1,
∴ -3√2sin(x+π/4)+1=-1
sin(x+π/4)=√2/3,
∵x∈(π/2,3π/4),∴3π/4<x+π/4<π
∴cos(x+π/4)=-√7/3
∴cos2x=sin(2x+π/2)=2sin(x+π/4)cos(x+π/4)=-2√14/9
∵x∈(π/2,3π/4),∴2x∈(π,3π/2)
∴sin2x=-5/9
∴tan2x=sin2x/cos2x=5√14/28
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