SOLUTION: An investor needs $18000 in 20 years; a finance company is offering 6% compounded monthly. How much should they invest now?
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Question 997954: An investor needs $18000 in 20 years; a finance company is offering 6% compounded monthly. How much should they invest now? Found 3 solutions by lwsshak3, MathTherapy, ikleyn:Answer by lwsshak3(11628) (Show Source):
You can put this solution on YOUR website! An investor needs $18000 in 20 years; a finance company is offering 6% compounded monthly. How much should they invest now?
compound Interest formula: A=P(1+r/n)^nt, P=initial investment r=interest rate, n=number of compounding periods per year, A=amt after t- years
For given problem:
P=?
r=.6%
n=12
t=20
A=8000
8000=P(1+.06/12)^12*20
8000=P(1+.005)^240=P(1.005^240=3.3102
P=8000/3.3102=2416.77
How much should they invest now?$2416.77
You can put this solution on YOUR website!
An investor needs $18000 in 20 years; a finance company is offering 6% compounded monthly. How much should they invest now?
You can put this solution on YOUR website! .
An investor needs $18000 in 20 years; a finance company is offering 6% compounded monthly.
How much should they invest now?
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In his post, @lwsshak3 incorrectly read the problem - so, his numbers in calculations are irrelevant
to the problem and his answer is incorrect.
I came to provide a correct solution.
compound interest formula: A = , where
P = initial investment
r = interest rate,
n = number of compounding periods per year,
A = amount after t years
For given problem:
P = ?
r = 0.06
n = 12
t = 20
A = 18000
18000 =
18000 = = .
P = = 5437.730549
How much should they invest now ? $5437.73 rounded to the closest cent. ANSWER
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