32 2 Algebra99.Letaandbbe real numbers such that9 a^2 + 8 ab+ 7 b^2 ≤ 6.
Prove that 7a+ 5 b+ 12 ab≤9.
100.Leta 1 ,a 2 ,...,anbe real numbers such thata 1 +a 2 +···+an≥n^2 anda 12 +a 22 +
···+an^2 ≤n^3 +1. Prove thatn− 1 ≤ak≤n+1 for allk.
101.Find all pairs(x, y)of real numbers that are solutions to the systemx^4 + 2 x^3 −y=−1
4
+
√
3 ,
y^4 + 2 y^3 −x=−1
4
−
√
3.
102.Letnbe an even positive integer. Prove that for any real numberxthere are at least
2 n/^2 choices of the signs+and−such that±xn±xn−^1 ±···±x<1
2
.
2.1.3 The Cauchy–Schwarz InequalityA direct application of the discussion in the previous section is the proof of the Cauchy–
Schwarz (or Cauchy–Bunyakovski–Schwarz) inequality
∑nk= 1a^2 k∑nk= 1b^2 k≥(n
∑k= 1akbk) 2
,
where the equality holds if and only if theai’s and thebi’s are proportional. The expression∑nk= 1a^2 k∑nk= 1b^2 k−(n
∑k= 1akbk) 2
is a quadratic function in theai’s andbi’s. For it to have only nonnegative values, it
should be a sum of squares. And this is true by the Lagrange identity∑nk= 1ak^2∑nk= 1bk^2 −(n
∑k= 1akbk) 2
=
∑
i<k(aibk−akbi)^2.Sadly, this proof works only in the finite-dimensional case, while the Cauchy–
Schwarz inequality is true in far more generality, such as for square integrable functions.
Its correct framework is that of a real or complex vector space, which could be finite or
infinite dimensional, endowed with an inner product〈·,·〉.
By definition, an inner product is subject to the following conditions: