作业帮已知函数f(x)=cosx(sinx-cosx)+1(1)求f(x)最小正周期(2)求f(x)的值域(3)f(x)的单调递减区间
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已知函数f(x)=cosx(sinx-cosx)+1(1)求f(x)最小正周期(2)求f(x)的值域(3)f(x)的单调递减区间
已知函数f(x)=cosx(sinx-cosx)+1
(1)求f(x)最小正周期(2)求f(x)的值域(3)f(x)的单调递减区间
已知函数f(x)=cosx(sinx-cosx)+1(1)求f(x)最小正周期(2)求f(x)的值域(3)f(x)的单调递减区间
1、求最小正周期:
f(x)=cosx(sinx-cosx)+1
f(x)=cosx[sinx+sin(3π/2+x)]+1
f(x)=2cosx[sin[(x+3π/2+x)/2]cos[(x-3π/2-x)/2]+1
f(x)=2cosxsin(x+3π/4)cos(-3π/4)+1
f(x)=2cosxsin(x+3π/4)[-(√2)/2]+1
f(x)=1-(√2)cosxsin(x+3π/4)
f(x)=1-(√2)(1/2)[sin(x+3π/4+x)+sin(x+3π/4-x)]
f(x)=1-[(√2)/2][sin(2x+3π/4)+sin(3π/4)]
f(x)=1-[(√2)/2][sin(2x+3π/4)+(√2)/2]
f(x)=1-[(√2)/2]sin(2x+3π/4)-1/2
f(x)=1/2-[(√2)/2]sin(2x+3π/4)
因为:自变量x的系数不是2,
所以:最小正周期是2π/2=π
2、求值域:
因为:-1≤sin(2x+3π/4)≤1
所以:-(√2)/2≤-[(√2)/2]sin(2x+3π/4)≤(√2)/2
因此:(1-√2)/2≤1/2-[(√2)/2]sin(2x+3π/4))≤(1+√2)/2
即:f(x)的值域是::(1-√2)/2≤f(x)≤(1+√2)/2
3、求单调递减区间:
f(x)=1/2-[(√2)/2]sin(2x+3π/4)
f'(x)=(√2)cos(2x+3π/4)
令:f'(x)<0,即:(√2)cos(2x+3π/4)<0
cos(2x+3π/4)<0
2kπ+π/2<2x+3π/4<2kπ+3π/2,其中:k=0、±1、±2、……,下同
2kπ-π/4<2x<2kπ+3π/4
kπ-π/8<x<kπ+3π/8
即:函数f(x)的单调减区间是:x∈(kπ-π/8,kπ+3π/8),其中:k=0、±1、±2、…….
f(x)=cosx·sinx-cosx·cosx+1=1/2sin2x-1/2cos2x+1/2=1/2sin(2x-四分之一派)+1/2
(1)2 (2)(0,1) (3)单调递减区间是(八分之三派+k派,八分之七派+k派)
(1)f(x)=cosx(sinx-cosx)+1.
=cosxsinx-cos^2x+1
=1/2sin2x-(cos2x+1)/2+1
=1/2sin2x-1/2cos2x+1/2
=1/2(sin2x-cos2x)+1/2
=√2/2sin(2x-π/4)+1/2
所以:f(x)的最...
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(1)f(x)=cosx(sinx-cosx)+1.
=cosxsinx-cos^2x+1
=1/2sin2x-(cos2x+1)/2+1
=1/2sin2x-1/2cos2x+1/2
=1/2(sin2x-cos2x)+1/2
=√2/2sin(2x-π/4)+1/2
所以:f(x)的最小正周期T=2π/2=π
(2)f(x)的值域为【-√2/2,√2/2】
(3)先求递减:令2x-π/4属于【-π/2+2kπ,π/2+2kπ】,解得x属于【-π/8+kπ,3π/8+kπ】
递增区间为:令2x-π/4属于【π/2+2kπ,5π/2+2kπ】,解得x属于【3π/8+kπ,11π/8+kπ】
(计算你再算一遍吧。。)
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f(x)=1/2sin2x-1/2(cos2x+1)+1=√ ̄2/2sin(2x-π/4)+1/2
(1)T=π (2)【-√ ̄2/ 2+ 1/2,√ ̄2/2 + 1/2】
(3)[3/8π,7/8π]