(1) For any x, y, prove that absolute value xy<= 1/2(x^2+ y^2)

suppose f(x,y)= x^2y^2/ x^2+y^2 . For any E(epsilon)>0 find a d(delta)>

0 such that if 0<(x^2+ y^2)^1/2 < d then absolute f(x,y) < E. Hence

prove tht f approaches a limit as (x,y) go to (0,0)

(2) For the function f(x,y)= {x^2+y^2 for x,y both rational and it's 0

for anything otherwise.

determine wher f is continuous and wher it's discontinuous. Does f have

any partial derivative? Note, every neighbourhood in R^2 always

contains points with rational and points with irrational coordinates)

I'm really sorry for the trouble but i would really appreciate the

help.