practice problems pending
Q1) If (a, b, c) are positive real numbers, prove the inequality ab^3 + bc^3 + ca^3 >= abc(a+b+c). S1. Divide by abc: LHS = b^2/c + c^2/a + a^2/b Use Titu's lemma >= (a+b+c)^2/(a+b+c) = a+b+c H.P. Q2) Assume x,y,z >= 0 S2) Using power mean inequality: [(x^3+y^3+z^3)/3]^(1/3) >= [(x^2+y^2+z^2)/3]^(1/2) Take a cube: = (8/3)^(1/2) = 16.rt(2)/3.rt(3) Then cancel out 3. But power mean inequality requires x,y,z to be non-negative. We have assumed that but the question didn't give that. H.P. Q3) If w^3 + x^3 + y^3 + z^3 = 10, find the minimum value of w^4 + x^4 + y^4 + z^4 S3) Again apply power mean inequality to get 5^(4/3).2^(2/3)