![[integral a to b of f(x)g(x)]^2 <= [integral a to b of f^2(x)] times [integral a to b of g^2(x)]](A6-eqn.gif)
1. Prove that
if f(x) and g(x) are functions which are integrable on [a,b].
![[Solution to problem 1, part 1.]](S6-p1-1.gif)
![[Solution to problem 1, part 2.]](S6-p1-2.gif)
![[Solution to problem 1, part 3.]](S6-p1-3.gif)
2. Consider the polynomial h(x) = x2 - x + 41. Note that h(1) = 41, h(2) = 43, h(3) = 47, h(4) = 53, and h(5) = 61 are all prime numbers. Is h(x) always a prime number if x is a positive integer? Why or why not?
Solution. h(41) = 412 - 41 + 41 = 412.
Bonus. Is there any (other?) polynomial which always gives you prime numbers?
![[Solution to bonus problem.]](S6-bonus.gif)
Department of Mathematics
Trent University