y=sin(-2x pai 6)的单增区间
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sinx的周期是2pai,sin3x的周期是三分之二pai,sin5x的周期是五分之二pai取其最小公倍数,则y的周期是2pai.
x=0:0.01:1;y=0;fori=1:20y=y+sin(i*x);endplot(y);
这个是和差化积公式如没学过,可以这样sin(x+y)-sinx=sin[(x+1/2y)+1/2y]-sin[(x+1/2y)-1/2y]=sin(x+1/2y)cos(1/2y)+cos(x+1/2
你用积化和差公式一套,然后就能看出它的最小正周期来的.应该是1pi
sin(x+y)sin(x-y)=[sinxcosy+sinycosx][sinxcosy-cosxsiny]=(sinxcosy)^2-(cosxsiny)^2=(1-cos^2y)cos^2y-c
(0,(1+根2)/2]
已知得X属于R原等式=1-cos^2(x)-2cosx=-(cos^2(x)+2cos(x))+1=-(cos(x)+1)^2+1+1因为0=所以-4
x=0:pi/200:2*pi;%点间隔是pi/200,不合适的话可以自己修改y=sin(2*x).*sin(10*x);%注意用的是点乘".*"plot(x,y)
左边=(sinxcosy+cosxsiny)(sinxcosy-cosxsiny)=sin²xcos²y-cos²xsin²y=sin²x(1-sin
Y=cos^4x-2sinxcosx-sin^4x=cos^4x-sin^4x-2sinxcosx=(cos^2x-sin^2x)*1-sin2x=cos2x-sin2x=根号2倍的cos(x+4分之
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
2*cos(x^2)*x/sin(x)^2-2*sin(x^2)*cos(x)/sin(x)^3
sinx是周期函数,所以(sinx)^2当然也是.不过如果要基本周期应该用半角公式降次一下:(sinx)^2=(1-cos2x)/2.由cos2x的周期性可知,基本周期是π.
sin^2x+cos^2y=1/2∴sin^2x=1/2-cos^2y3sin^2x+sin^2y=3(1/2-cos^2y)+sin^2y=1.5-3cos^2y)+sin^2y又有sin^2y+c
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)/
y=sin(x+π/3)sin(x+π/2)=sin(x+π/3)cosx=(sinxcosπ/3+cosxsinπ/3)cosx=1/2sinxcosx+√3/2cos^2(x)[cos^2(x)指
因为cos(2x)=1-2sin^2(x),所以sin^2(x)=[1-cos(2x)]/2.y=1/2sin(2x)+sin^2(x)=1/2sin(2x)+[1-cos(2x)]/2=1/2*si
原式=2-3/(1+sinα)1+sinα的范围是[0,2]所以-3/(1+sinα)的范围是[-oo,-3/2]原式值域为[-oo,1/2]
y'=2e^2xcos(e^2x)把y看成复合函数sint,t=e^m,m=2x.复合函数求导,等于三个分别求导的积