作业帮sin(xy)=ln(x e) y 1
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方法一(微分法)d(y/x)=d(ln(xy))(xdy-ydx)/x²=1/xy*d(xy)即(xdy-ydx)/x²=(ydx+xdy)/xy∴dy/dx=(xy+y²
这个是非齐次的一阶线性微分方程首先求它对应的齐次线性方程的y'-2xy=0,dy/dx=2xy,dy/y=2xdx,∫dy/y=∫2xdx,lny+C1=x²+C2,y=Ce^(x²
两边求导(y'x-y)/x^2=(y+xy')/xyxy+x^2y'=xyy'+y^2y'=(xy-y^2)/(xy+x^2)
将原方程两边微分得d[xe^y+sin(xy)]=0→e^ydx+xe^ydy+cos(xy)(ydx+xdy)=0→移项[xe^y+xcos(xy)]dy=-[e^y+ycos(xy)]dx整理→d
y+xdy/dx-e^(y^2)-2xe^(y^2)dy/dx-1=0x=1,y=0dy/dx-1-2dy/dx-1=0dy/dx=-2
设Y=y'降阶:Y'=(Y/x)ln(Y/x)这就是一个一阶齐次方程.设Y/x=u,所以Y=ux,Y'=u+x(du/dx),代回原方程,解得:lnu=C1x+1Y=xe^(C1x+1)所以y=[(C
ln(x+2y)=sin(xy)+1对x求导1/(x+2y)*(x+2y)'=cos(xy)*(xy)'+0(1+2y')/(x+2y)=cos(xy)*(y+x*y')x=0则ln(0+2y)=0+
1.先解齐线性方程xy'+(1-x)y=0的通解,得到y=ce^(x-lnx),(c为任意常数)……①其次利用常数变易法求非齐线性方程xy'+(1-x)y=e^2x的通解,把c看成是c(x),微分①后
当secx>0时,即x属于(2kpai-pai/2,2kpai+pai/2)时,y`=cosx*(sinx)/(cosx)^2+6sin(3x)cos(3x)=tanx+3sin(6x);当secx
两边都同时求导就可以做出了的,y=y(x)是指该函数可导!
limsin(xy)/x(x.y)->(0.2)=lim{[sin(xy)/xy]*y}=im[sin(xy)/xy]*(limy)(x.y)->(0.2)=1*2=2这里把(xy)看作一个整体,当(
cos(lnx).1/x+1/sinx.(cosx)
复合求导,先把ln后面的式子看成整体f(x),写成它的倒数,再乘以整体f(X)的导数
两边求导得y'·e^y+(y+xy')/(xy)+e^(-x)=0
y'=cos(ln(x^2))*(ln(x^2))'=cos(ln(x^2))*(1/x^2)*(x^2)'=(2/x)cos(ln(x^2))
xy'+y=-xe^x(xy)'=-xe^x两边积分:xy=-∫xe^xdx=-xe^x+∫e^xdx=-xe^x+e^x+C令x=1:0=-e+e+C,C=0所以xy=-xe^x+e^x显然x≠0所
y'=(a^x)'=a^xlnxy'=(x^a)'=ax^(a-1)y=(sin5x)^(lnx)y'=[(sin5x)^lnx]·ln(lnx)·(1/x)+lnx(sin5x)^(lnx-1)·5
sin(xy)-ln((x+1)/y)+1=0对x求导有:(y+xy')cos(xy)-y/(x+1)·[y-(x+1)y']/y^2-y/(x+1)·(x+1)(-1/y^2)y'=0x=0代入有: