这个三角函数题目求解答 10
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f(x) = sin²x-sin²(x-π/6)
= {sinx+sin(x-π/6)} {sinx-sin(x-π/6)}
= 2sin[(x+x-π/6)/2]cos[(x-x+π/6)/2] * 2cos[(x+x-π/6)/2]sin[(x-x+π/6)/2]
= 2sin(x-π/12)cos(π/12) * 2cos(x-π/12)sin(π/12)
= 2sin(x-π/12)cos(x-π/12)* 2sin(π/12)cos(π/12)
= sin(2x-π/6) * sin(π/6)
= 1/2sin(2x-π/6)
最小正周期 = 2π/2 = π
x∈【-π/3,π/4】
2x∈【-2π/3,π/2】
2x-π/6 ∈【-5π/6,π/3】
2x-π/6=-π/2时,最小值 = -1/2
2x-π/6=π/3时,最大值 = √3/4
= {sinx+sin(x-π/6)} {sinx-sin(x-π/6)}
= 2sin[(x+x-π/6)/2]cos[(x-x+π/6)/2] * 2cos[(x+x-π/6)/2]sin[(x-x+π/6)/2]
= 2sin(x-π/12)cos(π/12) * 2cos(x-π/12)sin(π/12)
= 2sin(x-π/12)cos(x-π/12)* 2sin(π/12)cos(π/12)
= sin(2x-π/6) * sin(π/6)
= 1/2sin(2x-π/6)
最小正周期 = 2π/2 = π
x∈【-π/3,π/4】
2x∈【-2π/3,π/2】
2x-π/6 ∈【-5π/6,π/3】
2x-π/6=-π/2时,最小值 = -1/2
2x-π/6=π/3时,最大值 = √3/4
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(Ⅰ)
化简
f(x)=sin²x﹣sin²(x﹣π/6)
=(1﹣cos2x)/2﹣[1﹣cos(2x﹣π/3)]/2
=(1﹣cos2x﹣1+cos2x/2+√3sin2x/2)/2
=(﹣cos2x/2+√3sin2x/2)/2
=sin(2x﹣π/6)/2
∴f(x)的最小正周期:T=π;
(Ⅱ)
∵x∈[﹣π/3,π/4],
∴2x﹣π/6∈[﹣5π/6,π/3],
∴sin(2x﹣π/6)∈[﹣1,√3/2],∴sin(2x﹣π/6)/2∈[﹣1/2,√3/4],
∴f(x)在区间[﹣π/3,π/4]内的最大值和最小值分别为:√3/4,﹣1/2.
化简
f(x)=sin²x﹣sin²(x﹣π/6)
=(1﹣cos2x)/2﹣[1﹣cos(2x﹣π/3)]/2
=(1﹣cos2x﹣1+cos2x/2+√3sin2x/2)/2
=(﹣cos2x/2+√3sin2x/2)/2
=sin(2x﹣π/6)/2
∴f(x)的最小正周期:T=π;
(Ⅱ)
∵x∈[﹣π/3,π/4],
∴2x﹣π/6∈[﹣5π/6,π/3],
∴sin(2x﹣π/6)∈[﹣1,√3/2],∴sin(2x﹣π/6)/2∈[﹣1/2,√3/4],
∴f(x)在区间[﹣π/3,π/4]内的最大值和最小值分别为:√3/4,﹣1/2.
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