Reelle Zahlen/Reihe/Rechenregeln/Fakt/Beweis/Aufgabe/en

Aus Wikiversity
Zur Navigation springen Zur Suche springen

Let

be convergent series of real numbers with sums and . Prove the following statements.

  1. The series with is convergent with sum equal to .
  2. For the series with is also convergent with sum equal to .