Let πΆ[0,1] denote the set of all real valued continuous functions defined on [0,1] and βπββ = sup{|π(π₯)| βΆ π₯ β [0,1]} for all π β πΆ[0,1]. Let
π = { π β πΆ[0,1] βΆ π(0) = π(1) = 0 }.
Define πΉ βΆ (πΆ[0,1], ββ ββ) β β by πΉ(π) = \(\rm \int_0^1f(t)dt\)Β for all π β πΆ[0,1].
Denote ππ = {π β π βΆ βπββ = 1}.
Then the set {π β π βΆ πΉ(π) = βπΉβ} β© ππ hasΒ
1
NO element
2
exactly one element
3
exactly two elements
4
an infinite number of elements
5
Question Not Attempted