practice problems pending
Q1. Prove that, for a, b, c ∈ ℝ⁺, a/b + b/c + c/a ≥ (a + b + c)² / (ab + bc + ca). S1. We will use Titu's lemma to prove it. First let's prove Titu's using C-S. C-S says for any real numbers: (a1b1 + a2b2 ... anbn)^2 <= (a1^2+ a2^2 .. an^2).(b1^2+b2^2...bn^2) Let's use p1 = a1/sqrt(b1)... with addl. constraint that b1,b2.. are positive reals. q1 = sqrt(b1)... It becomes: (p1 + p2 .. pn)^2 <= (p1^2/q1 ..)(q1+q2...qn) => (p1+p2..pn)^2/(q1+q2..qn) <= p1^2/q1 + p2^2/q2... This is Titu's lemma. Now, for the given question. Make LHS like this: a^2/ab + b^2/bc + c^2/ac In Titu's lemma, let's use: p1 = a, p2 = b, p3 = c q1 = ab, q2 = bc, q3 = ac So it becomes: (a+b+c)^2/(ab+bc+ca)<= a^2/ab + b^2/bc + c^2/ac H.P. Q2. If P1, P2, ..., P2014 be an arbitrary rearrangement of 1, 2, ..., 2014. Prove that 1/(P1 + P2) + 1/(P2 + P3) + ... + 1/(P2013 + P2014) > 2013/2016. S2. We will use Titu's lemma here again. Which is: a1^2/b1 + a2^2/b2 ... a2013^2/b...