lim(xy) sin(xy)
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如果是1/xy次方=lim{(1+sin(xy))^(1/sin(xy))}^sin(xy)/xy=e.如果是xy次方,就是1再问:我开始也认为很简单嘛=1,但老师给的答案是e再答:如果是xy次方,就
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
Limsin(xy)/xx→0,y→a=Lim(xy)/xx→0,y→a=Limyx→0,y→a=a
(x,y)->(0,0)=>u=xy->0lim(x,y)->(0,0)xy/[√(xy+1)-1]=limu->0u/[√(u+1)-1]=limu->0u*[√(u+1)+1]/u=limu->0
∂Z/∂x=y*cos(xy)-2cos(xy)*sin(xy)*y=y*cos(xy)-y*sin(2xy)∂Z/∂y=x*cos(xy)-2cos(
Zx=ycos(xy)-2ycos(xy)sin(xy)=ycos(xy)-ysin(2xy)Zy=xcos(xy)-xsin(2xy)
利用幂级数在点 (0,0) 的展开式:e^xy=1+xy+x²y²/2!+x³y³/3!+.略去二次项及更高次项无穷小,得 e^x
令u=xy,lim_{u->0){sin(u)/u}=1.
=lim(x,y)-(0,0)[(xy+9)-9]/[xy·(根号下(xy+9)+3)]=lim(x,y)-(0,0)(xy)/[xy·(根号下(xy+9)+3)]=lim(x,y)-(0,0)1/[
当x趋近2,y趋近0时,xy仍然趋近0,所以sin(xy)和xy是等价无穷小,乘除运算中可以相互代换原式=xy/y=x=2当x趋近2,y趋近0时
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'
lim[2-√(xy+4)]/xy=lim[2-√(xy+4)][2+√(xy+4)]/{xy[2+√(xy+4)]}=lim(x-->0,y---->0)(-xy)/[xy[2+√(xy+4)]]=
x^2+(y^2)/2=1,x^2+[(1/√2)y]^2=1,设x=cosA,y=√2sinA,因x>0,y>0,不妨设0<A<π/2,x√(1+y^2)=cosA√[1+2(sinA)^2]=√{
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(
求极限lim(x,y)→(+∞,+∞)[(xy)/(x²+y²)]^(xy)[(xy)/(x+y)²]^(xy)≦[(xy)/(x²+y²)]^(xy
x/[sec(xy)-y]dx/dy.
答案为0法1用定义!不要忽视教材一开始的推导,引进无穷小量的方法法2:证明一下sin(xy)和xy是等价无穷小,当xy都趋于0时.然后就好说了吧……
分子分母同乘以√(xy+1)+1,则分子变为:xy分母变为:(x+y)[√(xy+1)+1]其中:[√(xy+1)+1]的极限存在下面只需证明limxy/(x+y)极限不存在即可.取两条特殊路线:1、
得0=(-X+X)y=0×y=0