D是x,y轴及2x y-2=0,二重积分
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xy+e^y=y+1(1)求d^2y/dx^2在x=0处的值:(1)两边分别对x求导:y+xy'+e^yy'=y'y/y'+x+e^y=1(2)(2)两边对x再求导一次:(y'y'-yy'')/y'^
3x*+xy-2y*=0(3x-2y)(x+y)=0那么x=2y/3或x=-yy/x=3/2或x/y=-1(x/y)-(y/x)-(x*+y*)/(xy)=(x/y)-(y/x)-(x/y+y/x)=
两个截距分别带入x=0得到y轴截距2y=0x1所以定义域三角形面积为1f(x,y)=1在上述给定区域fX(x)=∫(0~2-2x)1dy=2-2x0
DX=EX^2-(EX)^2DY=EY^2-(EY)^2EXY=EXEYDXY=E(XY)^2-(EXY)^2=(EX^2)(EY^2)-(EXY)(EXY)=DXDY+EX^2(EY)^2+(EX)
y-x-2xy=0y-x=2xyx-y=-2xy(3x+xy-3y)/(y-xy-x)=[3(x-y)+xy]/[(y-x)-xy]=(-6xy+xy)/(2xy-xy)=-5xy/xy=-5
∵X,Y相互独立,∴X^2,Y^2也相互独立(1)D(XY)=E[XY-E(XY)]^2=E(XY-EXEY)^2=E(X^2Y^2)=E(X^2)E(Y^2)=E[(X-EX)^2]E[(Y-EY)
积分区域:0≤x≤1,0≤y≤x∫∫3xy^2dxdy=3∫xdx∫y^2dy=3∫x[y^3/3]dx=3∫x*x^3/3dx=∫x^4dx=x^5/5=1/5
x^2+y^2=(x-y)^2+2xy=(x-y)^2+2原式=(x-y)+2/(x-y)利用基本不等式(因x-y>0)>=2*根号[(x-y)*2/(x-y)]=2根号2当x-y=根号2时取"="解
Fx=e^x-y^2Fy=cosy-2xydy/dx=-Fx/Fy=(y^2-e^x)/(cosy-2xy)
∫∫xy²dxdy=∫dθ∫(rcosθ)*(rsinθ)²*rdr(应用极坐标变换)=∫(cosθsin²θ)dθ∫r^4dr=∫sin²θd(sinθ)∫r
将X2+y2+2xy+x-y=0表示为关于X的方程X2+(2y+1)X+(y2-y)=0关于X的方程有解,则(2y+1)^2-4(y2-y)>=04y^2+4y+1-4y^2+4y>=0y>=-1/8
因为(X^2+Y^2)/(X-Y)=[(X-Y)^2+2XY]/(X-Y),因为XY=1,所以(X^2+Y^2)/(X-Y)=[(X-Y)^2+2]/(X-Y)=(X-Y)+2/(X-Y),因为X>Y
原式=∫<1,2>dx∫<1/x,x>(x/y²)dy=∫<1,2>x(x-1/x)dx=∫<1,2>(x²-1)dx=2³
∫∫Dye^(xy)dσ=∫(1→2)dx∫(1/x→2)ye^(xy)dy=∫(1→2)(2x-1)/x²•e^(2x)dx=[(1/x)•e^(2x)]|(1→2
x+y=5xy(2x-3xy+2y)/(x+2xy+y)=[2(x+y)-3xy]/[(x+y)+2xy]=(2×5xy-3xy)/(5xy+2xy)=7xy/7xy=1再问:若x+1/x=3,求(x
C.xy+1/8两边在区域内再积一次分.
原式=∫[1,2]dx∫[1/x,2]ye^(xy)dy=∫[1,2]dx∫[1/x,2]y/xe^(xy)d(xy)第一个对y的积分中x是常数=∫[1,2]1/xdx∫[1/x,2]yde^(xy)
二重积分∫∫Df(u,v)dudv和∫∫Df(x,y)dxdy实际上是一样的,只是改变了字母显然在这个式子里,二重积分∫∫Df(u,v)dudv进行计算之后得到的是一个常数,不妨设其为a,即f(x,y