Problems 03
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Problem Solving Set 3 06 July 2012 1. Let f : R 2 → R 2 be given by f (x, y )=(x 2 - y 2 )e -x 2 -y 2 (a) Prove that f attains its minimum and maximum. (b) Determine all points (x, y ) such that ∂f ∂x = ∂f ∂y =0 and determine for which of them f has global or local minimum or maximum. 2. A sequence u(n) satisfies the relation u(n + 2) = [u(n + 1)] 2 - u(n), with u(1) = 13 and u(2) = 45. Prove that 2012 divides infinitely many terms of the sequence.
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Examination sample, of the mentioned university
Transcript of Problems 03
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Problem SolvingSet 3
06 July 2012
1. Let f : R2 R2 be given by f(x, y) = (x2 y2)ex2y2
(a) Prove that f attains its minimum and maximum.
(b) Determine all points (x, y) such that
f
x=
f
y= 0
and determine for which of them f has global or localminimum or maximum.
2. A sequence u(n) satisfies the relation
u(n + 2) = [u(n + 1)]2 u(n),
with u(1) = 13 and u(2) = 45. Prove that 2012 dividesinfinitely many terms of the sequence.