EDB β€” 139

↑ ← β†’ ↓ view in whole PDF view in whole HTML

View

English

Exercises

  1. [139] Let \(f : ℝ β†’ ℝ\) be defined as \(f (x) = 1\) if \(x ∈ ℝ ⧡ β„š\), \(f(0)=0\), and \(f (x) = 1/q\) if \(|x| = p/q\) with \(p, q\) coprime integers, \(q\ge 1\). Show that f is continuous on \(ℝ ⧡ β„š\) and discontinuous in every \(t ∈ β„š\).

    Show that the described function is u.s.c.

    Solution 1

    [13B]

Download PDF
Bibliography
Book index
  • lower semicontinuous
  • upper semicontinuous
Managing blob in: Multiple languages
This content is available in: Italian English