EDB β€” 0SM

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

View

English

E1

[0SM] Prerequisites:[0Q0].Let \(B(x,r){\stackrel{.}{=}}\{ y∈ ℝ^ n : |x-y|{\lt} r\} \) be the ball; let \(D(x,r){\stackrel{.}{=}}\{ y∈ ℝ^ n : |x-y|≀ r\} \) the disc; let \(S(x,r){\stackrel{.}{=}}\{ y∈ ℝ^ n : |x-y|= r\} \) be the sphere. Show that \(\overline{B(x,r)}= D(x,r)\), that \(B(x,r)= {{D(x,r)}^\circ }\), and that \(βˆ‚{B(x,r)}= S(x,r)\). Also show that \(B(x,r)\) is not closed and \(D(x,r)\) is not open.

(This result holds more generally in any normed space: see [106]).

Download PDF
Bibliography
Book index
  • ball
  • sphere
  • disk
  • metric space
Managing blob in: Multiple languages
This content is available in: Italian English