How to Become a Millionaire Upon graduating from col- lege, Donna has no initial capital. However, during each year she makes de

Question

3 years ago

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How to Become a Millionaire Upon graduating from col- lege, Donna has no initial capital. However, during each year she makes de

posits amounting to d = $1000 in a bank that pays interest at an annual rate of 8%, compounded continuously. (a) Find the future value, S(t), of Donna's account at any time. (b) What should be the value of the annual deposit d in order that the balance of Donna's account will be 1 million dollars when she retires in 40 years? (c) If d = $2500, what should be the value of r in order that Donna's account will have a balance of 1 million dollars in 40 years?

Mathematics

1 answer:

lesantik [10] · Answer 1 · 2022-08-12T17:42:15+03:00

Answer:

amount is 1000 × $e^{0.08t}$

$40762.20 balance of Donna's account will be 1 million dollars when she retires in 40 years

rate 14.97 % when Donna's account will have a balance of 1 million dollars in 40 years when principal is $2500

Step-by-step explanation:

principal = $1000

rate = 8 % = 0.08

to find out

the future value, S(t)

principal when Donna's account will be 1 million dollars when she retires in 40 year

at what rate Donna's account will have a balance of 1 million dollars in 40 years

solution

we know compounded continuously formula i.e.

amount = principal × $e^{rt}$ ..................1

put the value principal and rate in equation 1 to find amount any time

amount = principal × $e^{rt}$

amount = 1000 × $e^{0.08t}$

in 2nd part we have time 40 year and amount 1 million so put rate amount and time in equation 1 to find principal

rt = 0.08 × 40 = 3.2

amount = principal × $e^{rt}$

1000000 = principal × $e^{3.2}$

principal = 1000000 / $e^{3.2}$

principal = 1000000 / 24.5325302

principal = 40762.20397

so $40762.20 balance of Donna's account will be 1 million dollars when she retires in 40 years

in 3rd part we have amount 1 million and principal $2500 and time 40 year put all these in equation 1 to find rate

amount = principal × $e^{rt}$

1000000 = 2500 × $e^{40r}$

take ln both side

ln $e^{40r}$ = ln (1000000 / 2500 )

40 r = ln 400

r = ln (400) / 40

r = 0.149787

so rate 14.97 % when Donna's account will have a balance of 1 million dollars in 40 years when principal is $2500