二重积分|cos(x y)|,y=x,y=0
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∫∫[D]cos(x+y)dxdy=∫dx∫cos(x+y)dy=∫[sin(x+π)-sin2x]dx=[cosx+(1/2)cos2x]|=-2
∵A=[0,π]*[0,π]∴0≤x+y≤2π∵当0≤x+y≤π/2时,cos(x+y)≥0当π/2≤x+y≤3π/2时,cos(x+y)≤0当3π/2≤x+y≤2π时,cos(x+y)≥0∴∫∫|c
lim(x,y)→(0,0)[1-cos(xy)]/xy^2=lim(x,y)→(0,0)(x²y²/2)/xy^2..=lim(x,y)→(0,0)x=0再问:[1-cos(xy
如图划分区间后,去除绝对值符号,然后合并区间以利于计算.计算过程如下:
应经求过导了先整体对cos求导,再对xy求导,根据乘法的求导规则就是y+xy'
∫∫_Dcos(x+y)dσ=∫(0→π)dy∫(0→y)cos(x+y)dx=∫(0→π)dy∫(0→y)cos(x+y)d(x+y)=∫(0→π)sin(x+y)|(0→y)dy=∫(0→π)[s
∫∫cos(x+y)dxdy∫dx∫cos(x+y)dy,x的上下限是π和0,y的上下限是π和0∫dx∫dsin(x+y)=∫[sin(π+x)-sinx]dx=∫-2sinxdx=2∫dcosx,x
原式=∫(-π/2,π/2)dθ∫(0,1)[(1+r²sinθcosθ)/(1+r²)]rdr(极坐标变换)=1/2∫(-π/2,π/2)dθ∫(0,1)[(1+rsinθcos
楼上错了z=9-x^2-4y^2与xy平面围成的立体即z=9-x^2-4y^2>=0x^2+4y^2
∫∫xy²dxdy=∫dθ∫(rcosθ)*(rsinθ)²*rdr(应用极坐标变换)=∫(cosθsin²θ)dθ∫r^4dr=∫sin²θd(sinθ)∫r
原式=∫<1,2>dx∫<1/x,x>(x/y²)dy=∫<1,2>x(x-1/x)dx=∫<1,2>(x²-1)dx=2³
x=0时,代入方程得:1+1=y,得:y=2对x求导:(y+xy')e^xy-sin(xy)*(y+xy')=y'将x=0,y=2代入得:2=y'故dy(0)=2dx
作二重积分ʃʃ(xy)dxdy,积分范围d为x+y=1,x=0,y=0所为区域ʃʃ(xy)dxdy=ʃ[积分范围0->1]dxʃ[积分范围0
∫∫√(y²-xy)dxdy=∫dy∫√(y²-xy)dx=∫dy∫√(y²-xy)(-1/y)d(y²-xy)=∫{(-1/y)(2/3)[(y²-
I = ∫∫ (1 + xy)/(1 + x² + y²) dxdy,D&nbs