Indien je op moment 0 € 1 uitzet aan samengestelde intrest [math]r[/math] (peruun), [math]r>0[/math], en je elk volgend jaar de bekomen rente van deze rekening haalt, bekom je eeuwigdurend het volgende tijdschema: [br] [img 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[/img][br]of equivalent[br]  [img 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[/img][br]wat impliceert dat voor een perpetuïteit de beginwaarde gegeven wordt door[br]      [math]W^{\left(\infty\right)}_0=a\cdot\frac{1}{r}[/math] als [math]r>0[/math][br] [img 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[/img]  [br]   [br][br]Uit deze formule voor een perpetuïteit kan je eenvoudig de formule afleiden voor de aanvangswaarde van een annuïteit met looptijd [math]n[/math] jaar.