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By considering different paths of approach show that the function f(x,y)=(x^2y)/(x^4+y^2) has no limit as (x,y) (0,0)
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By considering different paths of approach show that the function f(x,y)=(x^2y)/(x^4+y^2) has no limit as (x,y) (0,0)

User Vaibhav Bajpai
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1 Answer

4 votes
Consider a path traced by an arbitrary power function
y=x^n, where
n\in\mathbb Z. Then


\displaystyle\lim_((x,y)\to(0,0))(x^2y)/(x^4+y^2)=\lim_(x\to0)(x^(n+2))/(x^4+x^(2n))=\lim_(x\to0)(x^(n-2))/(1+x^(2(n-2)))

When
n=2, we have


\displaystyle\lim_(x\to0)\frac1{1+1}=\frac12

but for any larger
n, say
n=3, we have


\displaystyle\lim_(x\to0)\frac x{1+x^2}=0

Therefore the limit does not exist/is path-dependent.
User Vitaliy Markitanov
by
7.7k points
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