Solving AequalsPeSuperscript rt for P, we obtain PequalsAeSuperscript negative rt which is the present value of the amount A due in t years if money earns interest at an annual nominal rate r compounded continuously. For the function Pequals4,000eSuperscript negative 0.08 t, in how many years will the $4,000 be due in order for its present value to be $2,000? In nothing years, the $4,000 will be due in order for its present value to be $2,000.

Question

contestada

Respuesta :

DeniceSandidge DeniceSandidge · Answer 1 · 2019-11-04T08:16:51+01:00

Answer:

in 8.6 year will be $4000 be due in order present value $2000

Step-by-step explanation:

given data

P = 4,000 [tex]e^{-0.08t}[/tex]

amount = $4000

present value = $2000

solution

we consider here present value P and amount A t time at annual nominal year rate r

so

P = A[tex]e^{-0.08t}[/tex] .................1

so put here P is $2000 and is and A is $4000

2000 = 4000 [tex]e^{-0.08t}[/tex] take ln both side

ln [tex]\frac{2000}{4000}[/tex] = ln [tex]e^{-0.08t}[/tex]

ln2 - ln 4 = -0.08 t

t = 8.664

so in 8.6 year will be $4000 be due in order present value $2000