∫e^(y-x) (y+x)dxdy
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dy/dx=(1+x+x²)'*e^x+(1+x+x²)*(e^x)'=(1+2x)e^x+(1+x+x²)e^x=(2+3x+x²)e^x
全微分方程通解为(e^x-1)(e^y-1)+c
(dy/dx)=e^(x+y)(dy/dx)=e^x*e^y分离变量dy/e^y=e^xdx两边积分-e^(-y)=e^x+C1则-y=ln(C-e^x)整理得y=-ln(C-e^x)
x=sin(y/x)+e^2求dy/dxd(x)=d(sin(y/x)+e^2)dx=dsin(y/x)+de^2dx=cos(y/x)d(y/x)dx=cos(y/x)(xdy-ydx)/x^2x^
d(e^x+e^y)=dyde^x+de^y=dye^xdx+e^ydy=dy(1-e^y)dy=e^xdxdy/dx=e^x/(1-e^y)
一阶线性常系数,可以有两种方法第一种,设函数u=u(x),与原式子相乘,使得等式左边=d(uy)/dxuy'+2uy=uxe^x由乘法法则可得du/dx=2udu/u=2dx∫du/u=∫2dxu=e
∵ye^xdx+(2y+e^x)dy=0,∴yd(e^x)+2ydy+e^xdy=0,∴[yd(e^x)+e^xdy]+d(y^2)=0,∴d(ye^x)+d(y^2)=0,∴d(y^2+ye^x)=
∵[e^(x+y)-e^x]dx+[e^(x+y)+e^y]dy=0==>(e^y-1)e^xdx+(e^x+1)e^ydy=0==>e^xdx/(e^x+1)+e^ydy/(e^y-1)=0==>d
∫(0.+∞)dx∫(x.2x)e∧(-y^2)dy=∫(0.+∞)dy∫(y/2.y)e∧(-y^2)dx=∫(0.+∞)ye∧(-y^2)/2dy=∫(0.+∞)e∧(-y^2)/4dy^2=-e
利用格林公式:∮cP(x,y)dx+Q(x,y)dy=∫∫D(dQ/dx-dP/dy)dxdy首先需要构造封闭曲线.∫(x沿半圆周y=√2x-x^2从2积到0)(e^xsiny-y)dx+(e^xco
z=x^xlgz=xlgxz'/z=lgx+1z'=(x^x)'=z(lgx+1)=x^x(lgx+1)所以dy/dx=e^(x^x)*d(x^x)/dx=e^(x^x)*x^x(lgx+1)
令u=e^y,则y=lnu,dy/dx=1/u*du/dx所以1/u*du/dx=(u+3x)/x^2x^2u'=u^2+3xuu'=(u/x)^2+3u/x令v=u/x,则u'=v+xv'v+xv'
dy/dx=e^x/x^2-2e^x/x^3+2cos2x
dy/dx=(e^x+x)(1+y^2),dy/(1+y^2)=(e^x+x)dx,arctany=e^x+x^2/2+C通解是y=tan(e^x+x^2/2+C)
对x求导y+x*y'=e^(x+y)*(1+y')y+x*y'=e^(x+y)+e^(x+y)*y'所以dy/dx=[e^(x+y)-y]/[x-e^(x+y)]
dy/dx=-[e^(y^2)*e^x]/y-ye^(-y^2)dy=e^xdx∫-ye^(-y^2)dy=∫e^xdx1/2*∫e^(-y^2)d(-y^2)=∫e^xdxe^(-y^2)=2e^x