y=sin(1 3x π 4)
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因为由上式可知y=cos(3x+π\4)=-sin[3(x-π/12)],要将y=-sin[3(x-π/12)]变换到y=sin(-3x),则需要作加法,即:-sin[3(x-π/12+π/12)],
y'=2xsin4x-x²cos4x·4所以dy=(2xsin4x-4x²cos4x)dxy=ln√4+t²=1/2ln(4+t²)y'=1/2·1/(4+t&
sin(x+y)sin(x-y)=-1/2(cos(x+y+x-y)—cos(x+y-x+y))=-1/2(cos2x—cos2y)=-1/2(1-2(sinx)^2-1+2(siny)^2)=(si
y=sin^4x+cos^4x=sin^4x+cos^4x+2sin^2xcos^2x-2sin^2xcos^2x=(sin^2x+cos^2x)^2-2sin^2xcos^2x=1-1/2sin^2
sin(π/4+x/2)sin(π/4-x/2)=sin(π/4+x/2)sin[π/2-(π/4+x/2)]∵π/4=π/2-π/4∴sin(π/4-x/2)=sin(π/2-π/4-x)=sin[
左边=(sinxcosy+cosxsiny)(sinxcosy-cosxsiny)=sin²xcos²y-cos²xsin²y=sin²x(1-sin
先化简,就比较容易看出来了f(x)=sin(x+π/4)+sin(π/4-x)=sinxcos(π/4)+cosxsin(π/4)+sin(π/4)cosx-cos(π/4)sinx=2cosxsin
y'sin(y/x)-y/x*sin(y/x)+1=0令y/x=u,则y'=u+xu'所以(u+xu')sinu-usinu+1=0xu'sinu+1=0-sinudu=dx/x两边积分:cosu=l
∵函数表达式为y=3sin(2x+π4),∴ω=2,可得最小正周期T=|2πω|=|2π2|=π故答案为:π
sinx+siny+sinz-sin(x+y+z)=4sin[(x+y)/2]sin[(x+z)/2]sin[(y+z)/2]sinx+siny+sinz-sin(x+y+z)=2sin[(x+y)/
∵0≤x≤π2,∴π6≤x+π6≤2π3;∴当x+π6=π2时,函数取得最大值是y=sin(x+π6)=1;当x+π6=π6时,函数取得最小值是y=sin(x+π6)=12;∴函数y=sin(x+π6
y'=2cos(2x-π/4)-3sin(3x+π/3)希望可以帮到你,如果解决了问题,请点下面的"选为满意回答"按钮,
f(x)=sin2(x+y/2)由于sin2x对称轴为π/4+kπ/2;故x+y/2=π/4+kπ/2x=π/4+kπ/2-y/2;将x=x=π/8代入,得y=π/4+kπ,根据y的范围可知:y=-3
令2kπ+π2≤3x+π4≤2kπ+3π2,k∈z,求得2kπ3+π12≤x≤2kπ3+7π36,故函数的减区间为[2kπ3+π12,2kπ3+7π36],k∈Z,故答案为:[2kπ3+π12,2kπ
由题意x∈[0,π2],得x+π3∈[π3,5π6],∴sin(x+π3)∈[12,1]∴函数y=sin(x+π3)在区间[0,π2]的最小值为12故答案为12
1、y=(cos^2x+sin^2x)^2-2cos^2xsin^2x=1-1/2(sin2x)^2=1-1/4(1-cos4x)=3/4+1/4cos4x周期T=2pi/4=pi/22、y=(根3/
1y=sinX向左移动π/4,得到y=sin(x+π/4)2y=sin(x+π/4)沿x轴压缩为原来的1/3,得到y=sin(3x+π/4)3y=sin(3x+π/4)沿y轴扩大2倍,得到y=2sin
y=(sinx)^2-cosx=1-(cosx)^2-cosx=-(cosx+1/2)^2+5/4x∈(-π/4,π/4)cosx∈(√2/2,1)令cosx=1,得y=-1令cosx=√2/2,得y